Real roots of Random Polynomials: Universality close to accumulation points
Abstract
We identify the scaling region of a width O(n-1) in the vicinity of the accumulation points t= 1 of the real roots of a random Kac-like polynomial of large degree n. We argue that the density of the real roots in this region tends to a universal form shared by all polynomials with independent, identically distributed coefficients ci, as long as the second moment σ=E(ci2) is finite. In particular, we reveal a gradual (in contrast to the previously reported abrupt) and quite nontrivial suppression of the number of real roots for coefficients with a nonzero mean value μn = E(ci) scaled as μn n-1/2.
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