Estimation of expected value of function of i.i.d. Bernoulli random variables
Abstract
We estimate the expected value of certain function f:\-1,1\n. For example, with computer assistance, we show that if is the Laplacian of the Cayley graph of (Z/15Z)×(Z/15Z) and D is a diagonal 225× 225 matrix with entries chosen independently and uniformly from \-1,1\, then the expected value of the normalized trace of (2I+D-)-1 is between 0.2006 and 0.2030.
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