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Caltech

Combinatorics Seminar

Wednesday, April 8, 2015
4:00pm to 5:00pm
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Structure and Pseudo-Randomness in Coding Theory
Shachar Lovett, Assistant Professor, CSE, UCSD,

The theory of structure and pseudo-randomness has been very influential in several areas of mathematics, such as number theory, graph theory and harmonic analysis. It is also been influential in theoretical computer science, with applications in complexity theory, cryptography and property testing. At a high level, it allows to analyze arbitrary objects by decomposing them to a "structural" component and a "pseudo-random" component. The pseudo-random component behaves in many senses like random noise, while the structural component has a concise representation which makes it amenable to analysis and algorithmic manipulation. In the talk, I will describe applications of this paradigm to coding theory. Specifically, I will describe a new general approach to analyze the list decoding capacity of codes, which follows by decomposing an arbitrary received word to a structural received word and pseudo-random noise. I will show how this approach leads to a resolution of a conjecture by Gopalan, Klivans and Zuckerman [STOC 2008], that the list decoding radius of Reed-Muller codes (in certain regimes) is equal to the minimal distance of the code. The latter part is based also on recent advances in higher order Fourier analysis. Based on joint works with Abhishek Bhowmick.

For more information, please contact Adam Sheffer by email at [email protected] or visit http://www.its.caltech.edu/~adamsh/CombSeminar.html.