The logarithmic law of random determinant
Abstract
Consider the square random matrix An=(aij)n,n, where \aij:=aij(n),i,j=1,…,n\ is a collection of independent real random variables with means zero and variances one. Under the additional moment condition \[n1≤ i,j≤ nEaij4<∞,\] we prove Girko's logarithmic law of An in the sense that as n→∞ eqnarray*| An|-(1/2)(n-1)!(1/2) nd N(0,1).eqnarray*
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