Theory of Computing Report

Authors: Pritam Chattopadhyay, Avijit Misra, Tanmoy Pandit, Goutam Paul

According to the Landauer principle, any logically irreversible process accompanies entropy production, which results in heat dissipation in the environment. Erasing of information, one of the primary logically irreversible processes, has a lower bound on heat dissipated into the environment, called the Landauer bound (LB). However, the practical erasure processes dissipate much more heat than the LB. Recently, there have been a few experimental investigations to reach this bound both in the classical and quantum domains. There has also been a spate of activities to enquire about this LB in finite time, with finite-size heat baths, non-Markovian and nonequilibrium environment in the quantum regime where the effects of fluctuations and correlation of the systems with the bath can no longer be ignored. This article provides a comprehensive review of the recent progress on the Landauer bound, which serves as a fundamental principle in the thermodynamics of computation. We also provide a perspective for future endeavors in these directions. Furthermore, we review the recent exploration toward establishing energetic bounds of a computational process. We also review the thermodynamic aspects of error correction, which is an indispensable part of information processing and computations. In doing so, we briefly discuss the basics of these fields to provide a complete picture.

Authors: Pritam Chattopadhyay, Avijit Misra, Tanmoy Pandit, Goutam Paul

According to the Landauer principle, any logically irreversible process accompanies entropy production, which results in heat dissipation in the environment. Erasing of information, one of the primary logically irreversible processes, has a lower bound on heat dissipated into the environment, called the Landauer bound (LB). However, the practical erasure processes dissipate much more heat than the LB. Recently, there have been a few experimental investigations to reach this bound both in the classical and quantum domains. There has also been a spate of activities to enquire about this LB in finite time, with finite-size heat baths, non-Markovian and nonequilibrium environment in the quantum regime where the effects of fluctuations and correlation of the systems with the bath can no longer be ignored. This article provides a comprehensive review of the recent progress on the Landauer bound, which serves as a fundamental principle in the thermodynamics of computation. We also provide a perspective for future endeavors in these directions. Furthermore, we review the recent exploration toward establishing energetic bounds of a computational process. We also review the thermodynamic aspects of error correction, which is an indispensable part of information processing and computations. In doing so, we briefly discuss the basics of these fields to provide a complete picture.

Friday, June 13 2025, 00:00

Computational Complexity of Statistics: New Insights from Low-Degree Polynomials

Authors: Alexander S. Wein

This is a survey on the use of low-degree polynomials to predict and explain the apparent statistical-computational tradeoffs in a variety of average-case computational problems. In a nutshell, this framework measures the complexity of a statistical task by the minimum degree that a polynomial function must have in order to solve it. The main goals of this survey are to (1) describe the types of problems where the low-degree framework can be applied, encompassing questions of detection (hypothesis testing), recovery (estimation), and more; (2) discuss some philosophical questions surrounding the interpretation of low-degree lower bounds, and notably the extent to which they should be treated as evidence for inherent computational hardness; (3) explore the known connections between low-degree polynomials and other related approaches such as the sum-of-squares hierarchy and statistical query model; and (4) give an overview of the mathematical tools used to prove low-degree lower bounds. A list of open problems is also included.

Authors: Alexander S. Wein

This is a survey on the use of low-degree polynomials to predict and explain the apparent statistical-computational tradeoffs in a variety of average-case computational problems. In a nutshell, this framework measures the complexity of a statistical task by the minimum degree that a polynomial function must have in order to solve it. The main goals of this survey are to (1) describe the types of problems where the low-degree framework can be applied, encompassing questions of detection (hypothesis testing), recovery (estimation), and more; (2) discuss some philosophical questions surrounding the interpretation of low-degree lower bounds, and notably the extent to which they should be treated as evidence for inherent computational hardness; (3) explore the known connections between low-degree polynomials and other related approaches such as the sum-of-squares hierarchy and statistical query model; and (4) give an overview of the mathematical tools used to prove low-degree lower bounds. A list of open problems is also included.

Friday, June 13 2025, 00:00

Minimality and computability of languages of G-shifts

Authors: Djamel Eddine Amir, Benjamin Hellouin de Menibus

Motivated by the notion of strong computable type for sets in computable analysis, we define the notion of strong computable type for $G$-shifts, where $G$ is a finitely generated group with decidable word problem. A $G$-shift has strong computable type if one can compute its language from the complement of its language. We obtain a characterization of $G$-shifts with strong computable type in terms of a notion of minimality with respect to properties with a bounded computational complexity. We provide a self-contained direct proof, and also explain how this characterization can be obtained from an existing similar characterization for sets by Amir and Hoyrup, and discuss its connexions with results by Jeandel on closure spaces. We apply this characterization to several classes of shifts that are minimal with respect to specific properties. This provides a unifying approach that not only generalizes many existing results but also has the potential to yield new findings effortlessly. In contrast to the case of sets, we prove that strong computable type for G-shifts is preserved under products. We conclude by discussing some generalizations and future directions.

Authors: Djamel Eddine Amir, Benjamin Hellouin de Menibus

Motivated by the notion of strong computable type for sets in computable analysis, we define the notion of strong computable type for $G$-shifts, where $G$ is a finitely generated group with decidable word problem. A $G$-shift has strong computable type if one can compute its language from the complement of its language. We obtain a characterization of $G$-shifts with strong computable type in terms of a notion of minimality with respect to properties with a bounded computational complexity. We provide a self-contained direct proof, and also explain how this characterization can be obtained from an existing similar characterization for sets by Amir and Hoyrup, and discuss its connexions with results by Jeandel on closure spaces. We apply this characterization to several classes of shifts that are minimal with respect to specific properties. This provides a unifying approach that not only generalizes many existing results but also has the potential to yield new findings effortlessly. In contrast to the case of sets, we prove that strong computable type for G-shifts is preserved under products. We conclude by discussing some generalizations and future directions.

Friday, June 13 2025, 00:00

The Alignment Trap: Complexity Barriers

Authors: Jasper Yao

We establish fundamental computational complexity barriers to verifying AI safety as system capabilities scale. Our main results show that for AI systems with expressiveness EXP$(m)$ above a critical threshold $\tau$, safety verification requires exponential time and is coNP-complete. We formalize the Capability-Risk Scaling (CRS) dynamic, which demonstrates how increasing AI capability drives societal safety requirements toward perfection, creating an inescapable tension with verification complexity. Through four core theorems, we prove that (1) verification complexity grows exponentially with system expressiveness, (2) safe policies comprise at most a $2^{-2^m}$ fraction of the policy space, (3) no finite set of alignment techniques can provide universal coverage, and (4) robust safety properties form measure-zero sets for neural networks. These results characterize an "intractability gap" where practical safety requirements fall within the region of computational intractability. We conclude by presenting a strategic trilemma: AI development must either constrain system complexity to maintain verifiable safety, accept unverifiable risks while scaling capabilities, or develop fundamentally new safety paradigms beyond verification. Our work provides the first systematic complexity-theoretic analysis of AI alignment and establishes rigorous bounds that any safety approach must confront. A formal verification of the core theorems in Lean4 is currently in progress.

Authors: Jasper Yao

We establish fundamental computational complexity barriers to verifying AI safety as system capabilities scale. Our main results show that for AI systems with expressiveness EXP$(m)$ above a critical threshold $\tau$, safety verification requires exponential time and is coNP-complete. We formalize the Capability-Risk Scaling (CRS) dynamic, which demonstrates how increasing AI capability drives societal safety requirements toward perfection, creating an inescapable tension with verification complexity. Through four core theorems, we prove that (1) verification complexity grows exponentially with system expressiveness, (2) safe policies comprise at most a $2^{-2^m}$ fraction of the policy space, (3) no finite set of alignment techniques can provide universal coverage, and (4) robust safety properties form measure-zero sets for neural networks. These results characterize an "intractability gap" where practical safety requirements fall within the region of computational intractability. We conclude by presenting a strategic trilemma: AI development must either constrain system complexity to maintain verifiable safety, accept unverifiable risks while scaling capabilities, or develop fundamentally new safety paradigms beyond verification. Our work provides the first systematic complexity-theoretic analysis of AI alignment and establishes rigorous bounds that any safety approach must confront. A formal verification of the core theorems in Lean4 is currently in progress.

Friday, June 13 2025, 00:00

Faster CONGEST Approximation Algorithms for Maximum Weighted Independent Set in Sparse Graphs

Authors: Salwa Faour, Fabian Kuhn

The maximum independent set problem is a classic optimization problem that has also been studied quite intensively in the distributed setting. While the problem is hard to approximate in general, there are good approximation algorithms known for several sparse graph families. In this paper, we consider deterministic distributed CONGEST algorithms for the weighted version of the problem in trees and graphs of bounded arboricity. For trees, we prove that the task of deterministically computing a $(1-\epsilon)$-approximate solution to the maximum weight independent set (MWIS) problem has a tight $\Theta(\log^*(n) / \epsilon)$ complexity. The lower bound already holds on unweighted oriented paths. On the upper bound side, we show that the bound can be achieved even in unrooted trees. For graphs $G=(V,E)$ of arboricity $\beta>1$, we give two algorithms. If the sum of all node weights is $w(V)$, we show that for any $\epsilon>0$, an independent set of weight at least $(1-\epsilon)\cdot \frac{w(V)}{4\beta}$ can be computed in $O(\log^2(\beta/\epsilon)/\epsilon + \log^* n)$ rounds. This result is obtained by a direct application of the local rounding framework of Faour, Ghaffari, Grunau, Kuhn, and Rozho\v{n} [SODA '23]. We further show that for any $\epsilon>0$, an independent set of weight at least $(1-\epsilon)\cdot\frac{w(V)}{2\beta+1}$ can be computed in $O(\log^3(\beta)\cdot\log(1/\epsilon)/\epsilon^2 \cdot\log n)$ rounds. This improves on a recent result of Gil [OPODIS '23], who showed that a $1/\lfloor(2+\epsilon)\beta\rfloor$-approximation to the MWIS problem can be computed in $O(\beta\cdot\log n)$ rounds. As an intermediate step, we design an algorithm to compute an independent set of total weight at least $(1-\epsilon)\cdot\sum_{v\in V}\frac{w(v)}{deg(v)+1}$ in time $O(\log^3(\Delta)\cdot\log(1/\epsilon)/\epsilon + \log^* n)$, where $\Delta$ is the maximum degree of the graph.

Authors: Salwa Faour, Fabian Kuhn

The maximum independent set problem is a classic optimization problem that has also been studied quite intensively in the distributed setting. While the problem is hard to approximate in general, there are good approximation algorithms known for several sparse graph families. In this paper, we consider deterministic distributed CONGEST algorithms for the weighted version of the problem in trees and graphs of bounded arboricity. For trees, we prove that the task of deterministically computing a $(1-\epsilon)$-approximate solution to the maximum weight independent set (MWIS) problem has a tight $\Theta(\log^*(n) / \epsilon)$ complexity. The lower bound already holds on unweighted oriented paths. On the upper bound side, we show that the bound can be achieved even in unrooted trees. For graphs $G=(V,E)$ of arboricity $\beta>1$, we give two algorithms. If the sum of all node weights is $w(V)$, we show that for any $\epsilon>0$, an independent set of weight at least $(1-\epsilon)\cdot \frac{w(V)}{4\beta}$ can be computed in $O(\log^2(\beta/\epsilon)/\epsilon + \log^* n)$ rounds. This result is obtained by a direct application of the local rounding framework of Faour, Ghaffari, Grunau, Kuhn, and Rozho\v{n} [SODA '23]. We further show that for any $\epsilon>0$, an independent set of weight at least $(1-\epsilon)\cdot\frac{w(V)}{2\beta+1}$ can be computed in $O(\log^3(\beta)\cdot\log(1/\epsilon)/\epsilon^2 \cdot\log n)$ rounds. This improves on a recent result of Gil [OPODIS '23], who showed that a $1/\lfloor(2+\epsilon)\beta\rfloor$-approximation to the MWIS problem can be computed in $O(\beta\cdot\log n)$ rounds. As an intermediate step, we design an algorithm to compute an independent set of total weight at least $(1-\epsilon)\cdot\sum_{v\in V}\frac{w(v)}{deg(v)+1}$ in time $O(\log^3(\Delta)\cdot\log(1/\epsilon)/\epsilon + \log^* n)$, where $\Delta$ is the maximum degree of the graph.

Friday, June 13 2025, 00:00

Circulant TSP: Vertices of the Edge-Length Polytope and Superpolynomial Lower Bounds

Authors: Samuel C. Gutekunst

We study the edge-length polytope, motivated both by algorithmic research on the Circulant Traveling Salesman Problem (Circulant TSP) and number-theoretic research related to the Buratti-Horak-Rosa conjecture. Circulant TSP is a special case of TSP whose overall complexity is a significant still-open question, and where on an input with vertices $\{1, 2, ..., n\}$, the cost of an edge $\{i, j\}$ depends only on its length $\min\{|i-j|, n-|i-j|\}$. The edge-length polytope provides one path to solving circulant TSP instances, and we show that it is intimately connected to the factorization of $n$: the number of vertices scales with $n$ whenever $n$ is prime and with $n^{3/2}$ whenever $n$ is a prime-squared, but there are a superpolynomial number of vertices whenever $n$ is a power of 2. In contrast, the more-standard Symmetric TSP Polytope has roughly $n!$ vertices. Hence, for Circulant TSP, a brute-force algorithm checking every vertex is actually efficient in some cases, based on the factorization of $n$. As an intermediate step, we give superpolynomial lower-bounds on two combinatorial sequences related to the Buratti-Horak-Rosa conjecture, which asks what combinations of edge lengths can comprise a Hamiltonian path.

Authors: Samuel C. Gutekunst

We study the edge-length polytope, motivated both by algorithmic research on the Circulant Traveling Salesman Problem (Circulant TSP) and number-theoretic research related to the Buratti-Horak-Rosa conjecture. Circulant TSP is a special case of TSP whose overall complexity is a significant still-open question, and where on an input with vertices $\{1, 2, ..., n\}$, the cost of an edge $\{i, j\}$ depends only on its length $\min\{|i-j|, n-|i-j|\}$. The edge-length polytope provides one path to solving circulant TSP instances, and we show that it is intimately connected to the factorization of $n$: the number of vertices scales with $n$ whenever $n$ is prime and with $n^{3/2}$ whenever $n$ is a prime-squared, but there are a superpolynomial number of vertices whenever $n$ is a power of 2. In contrast, the more-standard Symmetric TSP Polytope has roughly $n!$ vertices. Hence, for Circulant TSP, a brute-force algorithm checking every vertex is actually efficient in some cases, based on the factorization of $n$. As an intermediate step, we give superpolynomial lower-bounds on two combinatorial sequences related to the Buratti-Horak-Rosa conjecture, which asks what combinations of edge lengths can comprise a Hamiltonian path.

Friday, June 13 2025, 00:00

Structural Parameterizations of $k$-Planarity

Authors: Tatsuya Gima, Yasuaki Kobayashi, Yuto Okada

The concept of $k$-planarity is extensively studied in the context of Beyond Planarity. A graph is $k$-planar if it admits a drawing in the plane in which each edge is crossed at most $k$ times. The local crossing number of a graph is the minimum integer $k$ such that it is $k$-planar. The problem of determining whether an input graph is $1$-planar is known to be NP-complete even for near-planar graphs [Cabello and Mohar, SIAM J. Comput. 2013], that is, the graphs obtained from planar graphs by adding a single edge. Moreover, the local crossing number is hard to approximate within a factor $2 - \varepsilon$ for any $\varepsilon > 0$ [Urschel and Wellens, IPL 2021]. To address this computational intractability, Bannister, Cabello, and Eppstein [JGAA 2018] investigated the parameterized complexity of the case of $k = 1$, particularly focusing on structural parameterizations on input graphs, such as treedepth, vertex cover number, and feedback edge number. In this paper, we extend their approach by considering the general case $k \ge 1$ and give (tight) parameterized upper and lower bound results. In particular, we strengthen the aforementioned lower bound results to subclasses of constant-treewidth graphs: we show that testing $1$-planarity is NP-complete even for near-planar graphs with feedback vertex set number at most $3$ and pathwidth at most $4$, and the local crossing number is hard to approximate within any constant factor for graphs with feedback vertex set number at most $2$.

Authors: Tatsuya Gima, Yasuaki Kobayashi, Yuto Okada

The concept of $k$-planarity is extensively studied in the context of Beyond Planarity. A graph is $k$-planar if it admits a drawing in the plane in which each edge is crossed at most $k$ times. The local crossing number of a graph is the minimum integer $k$ such that it is $k$-planar. The problem of determining whether an input graph is $1$-planar is known to be NP-complete even for near-planar graphs [Cabello and Mohar, SIAM J. Comput. 2013], that is, the graphs obtained from planar graphs by adding a single edge. Moreover, the local crossing number is hard to approximate within a factor $2 - \varepsilon$ for any $\varepsilon > 0$ [Urschel and Wellens, IPL 2021]. To address this computational intractability, Bannister, Cabello, and Eppstein [JGAA 2018] investigated the parameterized complexity of the case of $k = 1$, particularly focusing on structural parameterizations on input graphs, such as treedepth, vertex cover number, and feedback edge number. In this paper, we extend their approach by considering the general case $k \ge 1$ and give (tight) parameterized upper and lower bound results. In particular, we strengthen the aforementioned lower bound results to subclasses of constant-treewidth graphs: we show that testing $1$-planarity is NP-complete even for near-planar graphs with feedback vertex set number at most $3$ and pathwidth at most $4$, and the local crossing number is hard to approximate within any constant factor for graphs with feedback vertex set number at most $2$.

Friday, June 13 2025, 00:00

New Approximation Guarantees for The Inventory Staggering Problem

Authors: Noga Alon, Danny Segev

Since its inception in the mid-60s, the inventory staggering problem has been explored and exploited in a wide range of application domains, such as production planning, stock control systems, warehousing, and aerospace/defense logistics. However, even with a rich history of academic focus, we are still very much in the dark when it comes to cornerstone computational questions around inventory staggering and to related structural characterizations, with our methodological toolbox being severely under-stocked. The central contribution of this paper consists in devising a host of algorithmic techniques and analytical ideas -- some being entirely novel and some leveraging well-studied concepts in combinatorics and number theory -- for surpassing essentially all known approximation guarantees for the inventory staggering problem. In particular, our work demonstrates that numerous structural properties open the door for designing polynomial-time approximation schemes, including polynomially-bounded cycle lengths, constantly-many distinct time intervals, so-called nested instances, and pairwise coprime settings. These findings offer substantial improvements over currently available constant-factor approximations and resolve outstanding open questions in their respective contexts. In parallel, we develop new theory around a number of yet-uncharted questions, related to the sampling complexity of peak inventory estimation as well as to the plausibility of groupwise synchronization. Interestingly, we establish the global nature of inventory staggering, proving that there are $n$-item instances where, for every subset of roughly $\sqrt{n}$ items, no policy improves on the worst-possible one by a factor greater than $1+\epsilon$, whereas for the entire instance, there exists a policy that outperforms the worst-possible one by a factor of nearly $2$, which is optimal.

Authors: Noga Alon, Danny Segev

Since its inception in the mid-60s, the inventory staggering problem has been explored and exploited in a wide range of application domains, such as production planning, stock control systems, warehousing, and aerospace/defense logistics. However, even with a rich history of academic focus, we are still very much in the dark when it comes to cornerstone computational questions around inventory staggering and to related structural characterizations, with our methodological toolbox being severely under-stocked. The central contribution of this paper consists in devising a host of algorithmic techniques and analytical ideas -- some being entirely novel and some leveraging well-studied concepts in combinatorics and number theory -- for surpassing essentially all known approximation guarantees for the inventory staggering problem. In particular, our work demonstrates that numerous structural properties open the door for designing polynomial-time approximation schemes, including polynomially-bounded cycle lengths, constantly-many distinct time intervals, so-called nested instances, and pairwise coprime settings. These findings offer substantial improvements over currently available constant-factor approximations and resolve outstanding open questions in their respective contexts. In parallel, we develop new theory around a number of yet-uncharted questions, related to the sampling complexity of peak inventory estimation as well as to the plausibility of groupwise synchronization. Interestingly, we establish the global nature of inventory staggering, proving that there are $n$-item instances where, for every subset of roughly $\sqrt{n}$ items, no policy improves on the worst-possible one by a factor greater than $1+\epsilon$, whereas for the entire instance, there exists a policy that outperforms the worst-possible one by a factor of nearly $2$, which is optimal.

Friday, June 13 2025, 00:00

I beat sifu, and more on minimalistic combat

from Emanuele Viola

I just beat Sifu. The last boss was hard. I got there with about my actual age, so it was sort of personal that I could still beat Yang. (In Sifu your character ages when you lose, and it’s game over at 70, I hope this is one of the more unrealistic aspects of the […]

I just beat Sifu. The last boss was hard. I got there with about my actual age, so it was sort of personal that I could still beat Yang. (In Sifu your character ages when you lose, and it’s game over at 70, I hope this is one of the more unrealistic aspects of the game; I enjoyed this mechanism). It took many trials, and I had to carefully study his timings and moves. But in the end, the experience has confirmed my thoughts in the previous post, that we need to rethink combat systems to make them much more fun and engaging. Strong as he was, Yang was stupid. He should have noticed that after a specific combo, I was almost always able to land a few hits. This made the fight quite dull, in the end.

So I am planning to update my scratch game to better illustrate, and the next step would be to put some AI in it, for which I guess I need to port it to C++ or something, I suspect it’s not easy to do that in Scratch.

By Manu

Thursday, June 12 2025, 14:58

Trevisan prize (guest post by Alon Rosen)

from Windows on Theory

The Trevisan Prize for outstanding work in the Theory of Computing is sponsored by the Department of Computing Sciences at Bocconi University and the Italian Academy of Sciences. The prize is named in honor of Luca Trevisan in recognition of his major contributions to the Theory of Computing. It aims to recognize outstanding work in the field, and to broaden the reach … Continue reading Trevisan prize (guest post by Alon Rosen)

The Trevisan Prize for outstanding work in the Theory of Computing is sponsored by the Department of Computing Sciences at Bocconi University and the Italian Academy of Sciences.

The prize is named in honor of Luca Trevisan in recognition of his major contributions to the Theory of Computing. It aims to recognize outstanding work in the field, and to broaden the reach of awards both in terms of research areas and recognition of individuals.

The prize is biennial (given once every two years) and consists of two prizes, given to:

A mid-career scientist whose work has had a significant and lasting impact
An early-career scientist whose work has demonstrated exceptional promise

In addition to the one-time monetary prize, the Italian Academy of Sciences will contribute a commemorative statue, presented to the winners as a symbol of their excellence.

The prize ceremony will take place at Bocconi University, where the winners will be asked to give public lectures (three in total):

Mid-career awardee: one scientific lecture and one lecture aimed at a general audience
Early-career awardee: one scientific lecture

The call for nominations can be found here: https://cs.unibocconi.eu/trevisan-prize

By Boaz Barak

Thursday, June 12 2025, 14:36

2024 Award Winners announced by Computer Science Canada | Informatique Canada

from Luca Aceto

Computer Science Canada | Informatique Canada has announced the list of recipients of its awards for 2024.

Members of the TCS community will be pleased to see that Faith Ellen (University of Toronto) is one of the recipients of the Lifetime Achievement Award 2024. Congratulations Faith!

On a personal note, I am also delighted to see that Nicola Cotumaccio was selected for the Canadian Computer Science Distinguished Dissertation Award 2024 . Nicola's PhD thesis, entitled Data compression meets automata theory, was supervised by Travis Gagie (Dalhousie University), Nicola Prezza (Ca' Foscari University of Venice) and Catia Trubiani (Gran Sasso Science Institute), as part of a joint Gran Sasso Science Institute-Dalhousie University degree, and was supported by a scholarship from Dante Labs.

Nicola was also a co-recipient of the Best PhD thesis award of the Italian Chapter of the EATCS.

To my mind, the best way to get a glimpse of the work Nicola presented in his award-winning doctoral dissertation is to read the short summary he published in the Bulletin of the EATCS. However, I strongly encourage anyone interested in TCS to have a look at the full dissertation or at the articles on which it is based, including one that was published in the JACM.

Since February 2024, Nicola has been a postdoctoral researcher at the University of Helsinki. I look forward to seeing the developments in his academic career.

By Luca Aceto

Computer Science Canada | Informatique Canada has announced the list of recipients of its awards for 2024.

Members of the TCS community will be pleased to see that Faith Ellen (University of Toronto) is one of the recipients of the Lifetime Achievement Award 2024. Congratulations Faith!

On a personal note, I am also delighted to see that Nicola Cotumaccio was selected for the Canadian Computer Science Distinguished Dissertation Award 2024 . Nicola's PhD thesis, entitled Data compression meets automata theory, was supervised by Travis Gagie (Dalhousie University), Nicola Prezza (Ca' Foscari University of Venice) and Catia Trubiani (Gran Sasso Science Institute), as part of a joint Gran Sasso Science Institute-Dalhousie University degree, and was supported by a scholarship from Dante Labs.

Nicola was also a co-recipient of the Best PhD thesis award of the Italian Chapter of the EATCS.

To my mind, the best way to get a glimpse of the work Nicola presented in his award-winning doctoral dissertation is to read the short summary he published in the Bulletin of the EATCS. However, I strongly encourage anyone interested in TCS to have a look at the full dissertation or at the articles on which it is based, including one that was published in the JACM.

Since February 2024, Nicola has been a postdoctoral researcher at the University of Helsinki. I look forward to seeing the developments in his academic career.

By Luca Aceto

Thursday, June 12 2025, 07:47

AI and the Erosion of Knowing

from Nisheeth Vishnoi

“The obstacle was always the path.” Adapted from a Zen proverb In the Renaissance, apprentices learned to paint by grinding pigments, mixing oils, stretching canvas, and copying masterworks line by line. In architecture, students spent years sketching by hand before they touched a computer. In math, the best way to understand a theorem is to […]

“The obstacle was always the path.” Adapted from a Zen proverb

In the Renaissance, apprentices learned to paint by grinding pigments, mixing oils, stretching canvas, and copying masterworks line by line. In architecture, students spent years sketching by hand before they touched a computer. In math, the best way to understand a theorem is to try to prove it yourself—and fail.

Today, that slow accumulation of competence is being replaced by a faster rhythm.

Ask an AI to write a proof, generate a building, produce an image, or answer a math question—and it will. But something essential gets skipped. And what gets skipped doesn’t just disappear. It quietly erodes.

AI gives us output without process. The result: polished answers with no foundation.

The Eroding Scaffold

Learning isn’t just about information. It’s about structure and the path you took to get there. You don’t truly understand a concept until you’ve built the scaffold it rests on—step by step, skill by skill.

Mira’s Derivative

Take Mira, a student learning calculus. She’s supposed to learn how to compute derivatives. The teacher explains the chain rule: when one function is nested inside another, you must differentiate both, in the right order. It’s abstract, so Mira does what students do—she turns to an AI tutor.

She types:

“Find the derivative of sin(x² + 3x).”

The AI answers instantly:

cos(x² + 3x) · (2x + 3)

It even offers a short explanation. Mira copies it down and moves on.

What she didn’t do:

– Simplify the inner expression.

– Apply the rule mechanically.

– Make a mistake and figure it out.

– Internalize the rhythm of composition and change.

Now fast-forward two months. Mira sees a problem she’s never encountered:

“Differentiate xᵡ.”

She freezes. No familiar template. No AI available. No internal scaffold to fall back on.

She reached the destination — but never built the path.

The skipped struggle was what encoded the concept.

Leo’s Essay

Now consider Leo, a college student writing an essay on political philosophy. He’s supposed to take a position on Hobbes’s Leviathan and argue whether absolute sovereignty is justified today.

Traditionally, Leo would:

– Clarify Hobbes’s argument,

– Develop a counterposition,

– Find textual evidence,

– Draft and revise a logical structure.

Instead, he types:

“Write a 5-paragraph essay arguing against Hobbes’ justification of sovereign power.”

The AI delivers—fluent, plausible, even citing sources. Leo pastes it in, tweaks a few lines, and submits.

A week later, he’s asked:

“How would Hobbes respond to modern surveillance capitalism?”

He flounders. The structure was never his. The reasoning was never practiced. The scaffolding was never built.

He didn’t outsource writing. He outsourced thinking.

Teachers aren’t grading the prose. They’re grading the reasoning it reveals.

Art Without Sketching, Architecture Without Lines

In design and architecture, we’re seeing the same thing. AI can generate facades, floor plans, and renders in minutes. But without grounding in scale, structure, or constraint, designs become fragile—beautiful but unbuildable. The result is a facade that ignores sun direction, a floor plan that fails fire code, and a portrait with six fingers.

In art, tools like Midjourney let users create stunning illustrations from a few words. But if you can’t draw, can you see? Can you revise? Can you critique? Can you tell what’s off?

Drawing is not just a means of production—it’s a way of learning to notice. Line by line, it teaches scale, proportion, balance, rhythm. Without that training, feedback becomes guesswork. Revision becomes roulette.

When the tool does the shaping, the human stops developing the eye.

And when the AI makes a mistake—one that’s subtle, structural, or compositional—there’s no foundation to catch it. You don’t just lose the sketch. You lose the ability to tell when something is wrong.

Oversight Collapse

AI doesn’t reason — it samples.

When a model like GPT writes a paragraph or answers a question, it isn’t deriving a conclusion from first principles. It’s drawing from a probability distribution — choosing what sounds most plausible based on past data.

The result? Output that feels fluent — but isn’t guaranteed to be correct.

That’s what makes AI mistakes dangerous. They’re not just wrong. They’re plausibly wrong — errors with the gloss of insight. And if we’ve skipped the scaffolding, we can’t tell the difference between coherence and truth.

This is the tipping point: when we’re still “in the loop,” but can no longer verify what we see. We’ve become fluent — but not competent. You look like you’re in control. But you’re just along for the ride.

And the risk isn’t limited to math or logic. In “wicked” domains — ethics, design, law, writing — there may be no single right answer. What matters is the ability to justify, adapt, revise, and notice what doesn’t quite fit.

That capacity comes from friction — from having built the internal scaffold of reasoning.

AI gives us output. But it skips the reasoning. It removes the friction — and with it, the growth.

From Work to Erosion

In a recent post, I argued that AI is reshaping work not by replacing entire jobs, but by separating judgment/decision from execution/action. Tools like GPT, Copilot, and dashboards take over action-level tasks. But what remains human is the ability to frame problems, make judgments, and verify outcomes.

In that example, Ada, a software engineer, wasn’t made obsolete. Her job changed. Execution was automated. Judgment was not.

But here’s the deeper risk: what if using AI to execute also erodes our ability to decide?

That’s the dynamic explored here. When AI lets us skip foundational steps—whether in calculus, writing, or design—it removes the very scaffolding that enables judgment to form.

At first, it feels like acceleration. But over time, it becomes erosion.

The erosion of action-level skill becomes the erosion of decision-level agency.

What Can Be Done

The goal isn’t to abandon AI. It’s to use it without losing ourselves.

That means:

– Choosing tools that show their work, not just their output.

– Practicing skills we no longer “need,” because they still underpin everything else.

– Teaching not just what to do, but how to decide, how to verify, and how to notice what’s missing.

What’s at stake isn’t just productivity. It’s agency.

Final Thought: The Skills We Skip Are Still Ours to Build

When we let AI do the scaffolding for us, we don’t just skip steps—we weaken the very structures that make thinking, reasoning, and creating possible.

The skills we skip don’t vanish. They decay. Quietly. Until we need them—and find we’ve forgotten how they worked.

So yes, use AI. But build the scaffold anyway.
Because the point isn’t just getting it right — it’s still knowing what right looks like.

That’s the kind of knowing worth protecting.

Originally published in this Substack post.

By nisheethvishnoi

Thursday, June 12 2025, 04:20

Crossing numbers of dense graphs on surfaces

Authors: Alfredo Hubard, Arnaud de Mesmay, Hugo Parlier

In this paper, we provide upper and lower bounds on the crossing numbers of dense graphs on surfaces, which match up to constant factors. First, we prove that if $G$ is a dense enough graph with $m$ edges and $\Sigma$ is a surface of genus $g$, then any drawing of $G$ on $\Sigma$ incurs at least $\Omega \left(\frac{m^2}{g} \log ^2 g\right)$ crossings. The poly-logarithmic factor in this lower bound is new even in the case of complete graphs and disproves a conjecture of Shahrokhi, Sz\'ekely and Vrt'o from 1996. Then we prove a geometric converse to this lower bound: we provide an explicit family of hyperbolic surfaces such that for any graph $G$, sampling the vertices uniformly at random on this surface and connecting them with shortest paths yields $O\left(\frac{m^2}{g} \log ^2 g\right)$ crossings in expectation.

Authors: Alfredo Hubard, Arnaud de Mesmay, Hugo Parlier

In this paper, we provide upper and lower bounds on the crossing numbers of dense graphs on surfaces, which match up to constant factors. First, we prove that if $G$ is a dense enough graph with $m$ edges and $\Sigma$ is a surface of genus $g$, then any drawing of $G$ on $\Sigma$ incurs at least $\Omega \left(\frac{m^2}{g} \log ^2 g\right)$ crossings. The poly-logarithmic factor in this lower bound is new even in the case of complete graphs and disproves a conjecture of Shahrokhi, Sz\'ekely and Vrt'o from 1996. Then we prove a geometric converse to this lower bound: we provide an explicit family of hyperbolic surfaces such that for any graph $G$, sampling the vertices uniformly at random on this surface and connecting them with shortest paths yields $O\left(\frac{m^2}{g} \log ^2 g\right)$ crossings in expectation.

Thursday, June 12 2025, 00:00

Don't be Afraid of Cell Complexes! An Introduction from an Applied Perspective

Authors: Josef Hoppe, Vincent P. Grande, Michael T. Schaub

Cell complexes (CCs) are a higher-order network model deeply rooted in algebraic topology that has gained interest in signal processing and network science recently. However, while the processing of signals supported on CCs can be described in terms of easily-accessible algebraic or combinatorial notions, the commonly presented definition of CCs is grounded in abstract concepts from topology and remains disconnected from the signal processing methods developed for CCs. In this paper, we aim to bridge this gap by providing a simplified definition of CCs that is accessible to a wider audience and can be used in practical applications. Specifically, we first introduce a simplified notion of abstract regular cell complexes (ARCCs). These ARCCs only rely on notions from algebra and can be shown to be equivalent to regular cell complexes for most practical applications. Second, using this new definition we provide an accessible introduction to (abstract) cell complexes from a perspective of network science and signal processing. Furthermore, as many practical applications work with CCs of dimension 2 and below, we provide an even simpler definition for this case that significantly simplifies understanding and working with CCs in practice.

Authors: Josef Hoppe, Vincent P. Grande, Michael T. Schaub

Cell complexes (CCs) are a higher-order network model deeply rooted in algebraic topology that has gained interest in signal processing and network science recently. However, while the processing of signals supported on CCs can be described in terms of easily-accessible algebraic or combinatorial notions, the commonly presented definition of CCs is grounded in abstract concepts from topology and remains disconnected from the signal processing methods developed for CCs. In this paper, we aim to bridge this gap by providing a simplified definition of CCs that is accessible to a wider audience and can be used in practical applications. Specifically, we first introduce a simplified notion of abstract regular cell complexes (ARCCs). These ARCCs only rely on notions from algebra and can be shown to be equivalent to regular cell complexes for most practical applications. Second, using this new definition we provide an accessible introduction to (abstract) cell complexes from a perspective of network science and signal processing. Furthermore, as many practical applications work with CCs of dimension 2 and below, we provide an even simpler definition for this case that significantly simplifies understanding and working with CCs in practice.

Thursday, June 12 2025, 00:00

Power Diagram Enhanced Adaptive Isosurface Extraction from Signed Distance Fields

Authors: Pengfei Wang, Ziyang Zhang, Wensong Wang, Shuangmin Chen, Lin Lu, Shiqing Xin, Changhe Tu

Extracting high-fidelity mesh surfaces from Signed Distance Fields has become a fundamental operation in geometry processing. Despite significant progress over the past decades, key challenges remain namely, how to automatically capture the intricate geometric and topological structures encoded in the zero level set of SDFs. In this paper, we present a novel isosurface extraction algorithm that introduces two key innovations: 1. An incrementally constructed power diagram through the addition of sample points, which enables repeated updates to the extracted surface via its dual regular Delaunay tetrahedralization; and 2. An adaptive point insertion strategy that identifies regions exhibiting the greatest discrepancy between the current mesh and the underlying continuous surface. As the teaser figure shows, our framework progressively refines the extracted mesh with minimal computational cost until it sufficiently approximates the underlying surface. Experimental results demonstrate that our approach outperforms sofa methods, particularly for models with intricate geometric variations and complex topologies.

Authors: Pengfei Wang, Ziyang Zhang, Wensong Wang, Shuangmin Chen, Lin Lu, Shiqing Xin, Changhe Tu

Extracting high-fidelity mesh surfaces from Signed Distance Fields has become a fundamental operation in geometry processing. Despite significant progress over the past decades, key challenges remain namely, how to automatically capture the intricate geometric and topological structures encoded in the zero level set of SDFs. In this paper, we present a novel isosurface extraction algorithm that introduces two key innovations: 1. An incrementally constructed power diagram through the addition of sample points, which enables repeated updates to the extracted surface via its dual regular Delaunay tetrahedralization; and 2. An adaptive point insertion strategy that identifies regions exhibiting the greatest discrepancy between the current mesh and the underlying continuous surface. As the teaser figure shows, our framework progressively refines the extracted mesh with minimal computational cost until it sufficiently approximates the underlying surface. Experimental results demonstrate that our approach outperforms sofa methods, particularly for models with intricate geometric variations and complex topologies.

Thursday, June 12 2025, 00:00

Straight-line Orthogonal Drawing of Complete Ternary Tree Requires $O(n^{1.032})$ Area

Authors: Hong Duc Bui

We resolve a conjecture posed by Covella, Frati and Patrignani by proving the straight-line orthogonal drawing of the complete ternary tree with $n$ nodes satisfying the subtree separation property with smallest area has area $\Omega(n^{1.031})$. We also improve the upper bound of this area to $O(n^{1.032})$.

Authors: Hong Duc Bui

We resolve a conjecture posed by Covella, Frati and Patrignani by proving the straight-line orthogonal drawing of the complete ternary tree with $n$ nodes satisfying the subtree separation property with smallest area has area $\Omega(n^{1.031})$. We also improve the upper bound of this area to $O(n^{1.032})$.

Thursday, June 12 2025, 00:00

Complexity of Contextuality

Authors: Theodoros Yianni, Farid Shahandeh

Generalized contextuality is a hallmark of nonclassical theories like quantum mechanics. Yet, three fundamental computational problems concerning its decidability and complexity remain open. First, determining the complexity of deciding if a theory admits a noncontextual ontological model; Second, determining the complexity of deciding if such a model is possible for a specific dimension $k$; Third, efficiently computing the smallest such model when it exists, given that finding the smallest ontological model is NP-hard. We address the second problem by presenting an algorithm derived from a geometric formulation and its reduction to the intermediate simplex problem in computational geometry. We find that the complexity of deciding the existence of a noncontextual ontological model of dimension $k$ is at least exponential in the dimension of the theory and at most exponential in $k$. This, in turn, implies that computing the smallest noncontextual ontological model is inefficient in general. Finally, we demonstrate the fundamental difference between finding the smallest noncontextual ontological model and the smallest ontological model using an explicit example wherein the respective minimum ontic sizes are five and four.

Authors: Theodoros Yianni, Farid Shahandeh

Generalized contextuality is a hallmark of nonclassical theories like quantum mechanics. Yet, three fundamental computational problems concerning its decidability and complexity remain open. First, determining the complexity of deciding if a theory admits a noncontextual ontological model; Second, determining the complexity of deciding if such a model is possible for a specific dimension $k$; Third, efficiently computing the smallest such model when it exists, given that finding the smallest ontological model is NP-hard. We address the second problem by presenting an algorithm derived from a geometric formulation and its reduction to the intermediate simplex problem in computational geometry. We find that the complexity of deciding the existence of a noncontextual ontological model of dimension $k$ is at least exponential in the dimension of the theory and at most exponential in $k$. This, in turn, implies that computing the smallest noncontextual ontological model is inefficient in general. Finally, we demonstrate the fundamental difference between finding the smallest noncontextual ontological model and the smallest ontological model using an explicit example wherein the respective minimum ontic sizes are five and four.

Thursday, June 12 2025, 00:00

Tight Paths and Tight Pairs in Weighted Directed Graphs

Authors: José Luis Balcázar

We state the graph-theoretic computational problem of finding tight paths in a directed, edge-weighted graph, as well as its simplification of finding tight pairs. These problems are motivated by the need of algorithms that find so-called basic antecedents in closure spaces, in one specific approach to data analysis. We discuss and compare several algorithms to approach these problems.

Authors: José Luis Balcázar

We state the graph-theoretic computational problem of finding tight paths in a directed, edge-weighted graph, as well as its simplification of finding tight pairs. These problems are motivated by the need of algorithms that find so-called basic antecedents in closure spaces, in one specific approach to data analysis. We discuss and compare several algorithms to approach these problems.

Thursday, June 12 2025, 00:00

Almost-Optimal Local-Search Methods for Sparse Tensor PCA