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Title:
Association Schemes, Non-Commutative Polynomials and Lasserre Lower Bounds for Planted Clique

Speaker:
Raghu Meka

Abstract:
Finding cliques in random graphs and the closely related "planted" clique variant, where a clique of size k is planted in a random G(n,1/2) graph, have been the focus of substantial study in algorithm design. Despite much effort, the best known polynomial-time algorithms only solve the problem for k ~ sqrt(n). Here we show that beating sqrt(n) would require substantially new algorithmic ideas, by proving a lower bound for the problem in the Lasserre hierarchy, the most powerful class of semi-de finite programming algorithms we know of. Our (average case) lower bound uses tools from the classical theory of association schemes and some new large deviation bounds for matrix-valued polynomials which could be of independent interest. Joint work with Avi Wigderson

Link:
https://www.ias.edu/video/csdm/1213/0513-RaghuMeka