28 pagesWe give new combinatorial proofs of known almost-periodicity results for sumsets of sets with small doubling in the spirit of Croot and Sisask, whose almost-periodicity lemma has had far-reaching implications in additive combinatorics. We provide an alternative (and L^p-norm free) point of view, which allows for proofs to easily be converted to probabilistic algorithms that decide membership in almost-periodic sumsets of dense subsets of F_2^n. As an application, we give a new algorithmic version of the quasipolynomial Bogolyubov-Ruzsa lemma recently proved by Sanders. Together with the results by the last two authors, this implies an algorithmic version of the quadratic Goldreich-Levin theorem in which the number of terms in the qu...
AbstractThis paper studies properties of almost periodic sequences (also known as uniformly recursiv...
The SUBSET SUM problem asks whether a given set of n positive integers contains a subset of elements...
This dissertation involves the interplay between structure, randomness, and pseudorandomness in theo...
28 pagesWe give new combinatorial proofs of known almost-periodicity results for sumsets of sets wit...
Logarithmic bounds for Roth's theorem via almost-periodicity, Discrete Analysis 2019:4, 20pp. A cen...
We consider certain finite sets of circle-valued functions defined on intervals of real numbers and ...
We show that a set is almost periodic if and only if the associated exponential sum is concentrated ...
We give a new proof of a sumset conjecture of Furstenberg that was rst proved by Hochman and Shmerki...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2015.Cataloged fro...
summary:We present a method for constructing almost periodic sequences and functions with values in ...
Szemeredi's regularity lemma can be viewed as a rough structure theorem for arbitrary dense graphs, ...
A general problem in Extremal Combinatorics asks about the maximum size of a collection of finite ob...
International audienceNilsequences arose in the study of the multiple ergodic averages associated to...
We study the complexity and the efficient approximability of graph and satisfiability problems when ...
Sumsets as unions of sumsets of subsets, Discrete Analysis 2017:14, 5 pp. In May 2016 there was a r...
AbstractThis paper studies properties of almost periodic sequences (also known as uniformly recursiv...
The SUBSET SUM problem asks whether a given set of n positive integers contains a subset of elements...
This dissertation involves the interplay between structure, randomness, and pseudorandomness in theo...
28 pagesWe give new combinatorial proofs of known almost-periodicity results for sumsets of sets wit...
Logarithmic bounds for Roth's theorem via almost-periodicity, Discrete Analysis 2019:4, 20pp. A cen...
We consider certain finite sets of circle-valued functions defined on intervals of real numbers and ...
We show that a set is almost periodic if and only if the associated exponential sum is concentrated ...
We give a new proof of a sumset conjecture of Furstenberg that was rst proved by Hochman and Shmerki...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2015.Cataloged fro...
summary:We present a method for constructing almost periodic sequences and functions with values in ...
Szemeredi's regularity lemma can be viewed as a rough structure theorem for arbitrary dense graphs, ...
A general problem in Extremal Combinatorics asks about the maximum size of a collection of finite ob...
International audienceNilsequences arose in the study of the multiple ergodic averages associated to...
We study the complexity and the efficient approximability of graph and satisfiability problems when ...
Sumsets as unions of sumsets of subsets, Discrete Analysis 2017:14, 5 pp. In May 2016 there was a r...
AbstractThis paper studies properties of almost periodic sequences (also known as uniformly recursiv...
The SUBSET SUM problem asks whether a given set of n positive integers contains a subset of elements...
This dissertation involves the interplay between structure, randomness, and pseudorandomness in theo...