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Active HORIZON European Commission

Effective Random Methods in Discrete Mathematics

€2.02M EUR

Funder European Commission
Recipient Organization Hun-Ren Renyi Alfred Matematikai Kutatointezet
Country Hungary
Start Date Jan 01, 2023
End Date Dec 31, 2027
Duration 1,825 days
Number of Grantees 1
Roles Coordinator
Data Source European Commission
Grant ID 101054936
Grant Description

The probabilistic method, pioneered by Paul Erds, can show the existence of combinatorial objects without hinting how to construct them effectively.

Recent developments concerning the constructive version of Lovsz Local Lemma (LLL) showed how to modify the probabilistic method to make it effective.

This proposal lists four research directions in analysis, combinatorics, and cryptography, where this method opened new possibilities to go beyond our present knowledge.1. The measurable version of LLL is the question whether the object, guaranteed by LLL, can additionally be measurable? In some special cases the answer is in the affirmative.

What are the constraints which guarantee measurability, and when is it impossible to achieve this? Results are relevant for classical problems of measure group theory.2. A novel approach improving the celebrated sunflower lemma also uses effective probabilistic tools.

We will use a similar approach to improve the best estimates for multicolor Ramsey numbers, Schur numbers, and to explore a number of other classical problems.3. Several new phenomena arise in extremal graphs when either the vertices or the edges are linearly ordered. To investigate them we use methods from effective probabilistic sampling.

The answers would be relevant in discrete geometry, algorithm design, etc.4.

An emerging phenomenon in certain cryptographic primitives including secret sharing will be addressed: relaxing the strict requirements of correctness by allowing negligible errors can lead to significant improvement in efficiency. It is a direct consequence of the mostly unknown structure of the boundary of the entropy region.

Using tools and results from the other parts of the project we will explore this boundary giving hints for why, and tools for where and when such efficiency gaps might occur.

All Grantees

Hun-Ren Renyi Alfred Matematikai Kutatointezet

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