Expected number of real roots for random linear combinations of orthogonal polynomials associated with radial weights
Abstract
In this note, we obtain asymptotic expected number of real zeros for random polynomials of the form fn(z)=Σj=0nanjcnjzj where anj are independent and identically distributed real random variables with bounded (2+δ)th absolute moment and the deterministic numbers cnj are normalizing constants for the monomials zj within a weighted L2-space induced by a radial weight function satisfying suitable smoothness and growth conditions.
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