Concentration of permanent estimators for certain large matrices

Abstract

Let An=(aij)i,j=1n be an n× n positive matrix with entries in [a,b], 0<a b. Let Xn=(ijxij)i,j=1n be a random matrix, where xij are i.i.d. N(0,1) random variables. We show that for large n, (XnTXn) concentrates sharply at the permanent of An, in the sense that n-1 ((XnTXn)/perAn)n∞0 in probability.

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