Your search keyword '"Chin, Byron"' showing total 8 results

1. Exact threshold and lognormal limit for non-linear Hamilton cycles

Author

Chin, Byron

Subjects

Mathematics - Combinatorics, Mathematics - Probability

Abstract

For positive integers $r > \ell \geq 1$, an $\ell$-cycle in an $r$-uniform hypergraph is a cycle where each edge consists of $r$ vertices and each pair of consecutive edges intersect in $\ell$ vertices. We show that for $\ell \geq 2$, a random $r$-uniform hypergraph contains a Hamilton $\ell$-cycle with high probability whenever the expected number of such cycles tends to infinity. Moreover, for $\ell = 2$, we show that the normalized number of Hamilton $2$-cycles converges to a lognormal distribution. This determines the exact threshold for the appearance of non-linear Hamilton cycles in random hypergraphs, confirming a conjecture of Narayanan and Schacht., Comment: 15 pages

Published

2024

2. Matching Algorithms in the Sparse Stochastic Block Model

Author

Brandenberger, Anna, Chin, Byron, Sheffield, Nathan S., and Shyamal, Divya

Subjects

Computer Science - Data Structures and Algorithms, Computer Science - Discrete Mathematics

Abstract

The stochastic block model (SBM) is a generalization of the Erd\H{o}s--R\'enyi model of random graphs that describes the interaction of a finite number of distinct communities. In sparse Erd\H{o}s--R\'enyi graphs, it is known that a linear-time algorithm of Karp and Sipser achieves near-optimal matching sizes asymptotically almost surely, giving a law-of-large numbers for the matching sizes of such graphs in terms of solutions to an ODE. We provide an extension of this analysis, identifying broad ranges of stochastic block model parameters for which the Karp--Sipser algorithm achieves near-optimal matching sizes, but demonstrating that it cannot perform optimally on general SBM instances. We also consider the problem of constructing a matching online, in which the vertices of one half of a bipartite stochastic block model arrive one-at-a-time, and must be matched as they arrive. We show that the competitive ratio lower bound of 0.837 found by Mastin and Jaillet for the Erd\H{o}s--R\'enyi case is tight whenever the expected degrees in all communities are equal. We propose several linear-time algorithms for online matching in the general stochastic block model, but prove that despite very good experimental performance, none of these achieve online asymptotic optimality., Comment: 28 pages

Published

2024

3. Structure of lower tails in sparse random graphs

Author

Chin, Byron

Subjects

Mathematics - Combinatorics, Mathematics - Probability

Abstract

We study the typical structure of a sparse Erd\H{o}s--R\'enyi random graph conditioned on the lower tail subgraph count event. We show that in certain regimes, a typical graph sampled from the conditional distribution resembles the entropy minimizer of the mean field approximation in the sense of both subgraph counts and cut norm. The main ingredients are an adaptation of an entropy increment scheme of Kozma and Samotij, and a new stability for the solution of the associated entropy variational problem. Our proof suggests a more general framework for establishing typical behavior statements when the objects of interest can be encoded in a hypergraph satisfying mild degree conditions., Comment: 13 pages, comments welcome!

Published

2023

4. The Power of an Adversary in Glauber Dynamics

Author

Chin, Byron, Moitra, Ankur, Mossel, Elchanan, and Sandon, Colin

Subjects

Mathematics - Probability, 82C20, 60K35, 91D30

Abstract

Glauber dynamics are a natural model of dynamics of dependent systems. While originally introduced in statistical physics, they have found important applications in the study of social networks, computer vision and other domains. In this work, we introduce a model of corrupted Glauber dynamics whereby instead of updating according to the prescribed conditional probabilities, some of the vertices and their updates are controlled by an adversary. We study the effect of such corruptions on global features of the system. Among the questions we study are: How many nodes need to be controlled in order to change the average statistics of the system in polynomial time? And how many nodes are needed to obstruct approximate convergence of the dynamics? Our results can be viewed as studying the robustness of classical sampling methods and are thus related to robust inference. The proofs connect to classical theory of Glauber dynamics from statistical physics., Comment: 12 pages, added section about the optimization perspective

Published

2023

5. When will (game) wars end?

Author

Bhatia, Manan, Chin, Byron, Mani, Nitya, and Mossel, Elchanan

Subjects

Mathematics - Combinatorics, 60C05

Abstract

We study several variants of the classical card game war. As anyone who played this game knows, the game can take some time to terminate, but it usually does. Here, we analyze a number of asymptotic variants of the game, where the number of cards is $n$, and show that all have expected termination time of order $n^2$. This is the same expected termination time as in the game where at each turn a fair coin toss decides which player wins a card, known as Gambler's Ruin and studied by Pascal, Fermat and others in the seventeenth century., Comment: 10 pages, improved presentation, added background and examples

Published

2023

6. Optimal reconstruction of general sparse stochastic block models

Author

Chin, Byron and Sly, Allan

Subjects

Mathematics - Probability, 62H30

Abstract

This paper is motivated by the reconstruction problem on the sparse stochastic block model. Mossel, et. al. proved that a reconstruction algorithm that recovers an optimal fraction of the communities in the symmetric, 2-community case. The main contribution of their proof is to show that when the signal to noise ratio is sufficiently large, in particular $\lambda^2d > C$, the reconstruction accuracy for a broadcast process on a tree with or without noise on the leaves is asymptotically the same. This paper will generalize their results, including the main step, to a general class of the sparse stochastic block model with any number of communities that are not necessarily symmetric, proving that an algorithm closely related to Belief Propagation recovers an optimal fraction of community labels., Comment: 34 pages, improved presentation

Published

2021

7. Optimal Recovery of Block Models with $q$ Communities

Author

Chin, Byron and Sly, Allan

Subjects

Mathematics - Probability, Computer Science - Social and Information Networks

Abstract

This paper is motivated by the reconstruction problem on the sparse stochastic block model. The paper "Belief Propagation, robust reconstruction and optimal recovery of block models" by Mossel, Neeman, and Sly provided and proved a reconstruction algorithm that recovers an optimal fraction of the communities in the 2 community case. The main step in their proof was to show that when the signal to noise ratio is sufficiently large, in particular $\theta^2d > C$, the reconstruction accuracy on a regular tree with or without noise on the leaves is the same. This paper will generalize their results, including the main step, to any number of communities, providing an algorithm related to Belief Propagation that recovers a provably optimal fraction of community labels., Comment: 49 pages

Published

2020

8. One last chance: Abigail Alliance v. von Eschenbach and the right to access experimental drugs.

Author

Chin, Byron R.

Subjects

Clinical trials -- Laws, regulations and rules, Drug approval -- Laws, regulations and rules, Pharmaceutical research -- Laws, regulations and rules, Terminally ill persons -- Laws, regulations and rules, Abigail Alliance for Better Access to Developmental Drugs v. von Eschenbach (445 F.3d 470 (D.C. Cir. 2006)), Government regulation

Published

2008