Zero-one laws for graphs with edge probabilities decaying with distance.   Part II

Saharon Shelah

arXiv:math/0404239·math.LO·May 23, 2007·3 cites

Zero-one laws for graphs with edge probabilities decaying with distance. Part II

Saharon Shelah

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TL;DR

This paper investigates zero-one laws in random graphs where the probability of edges decreases with distance, extending previous work to broader conditions and providing new theoretical insights.

Contribution

It introduces new zero-one law results for graphs with distance-dependent edge probabilities, expanding the understanding of asymptotic properties in such models.

Findings

01

Established zero-one laws under new decay conditions

02

Extended previous results to more general graph models

03

Provided theoretical criteria for graph properties in sparse regimes

Abstract

This is the second part of math.LO/9606226.

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Taxonomy

TopicsAdvanced Graph Theory Research · Limits and Structures in Graph Theory · Graph theory and applications