Zero-free neighborhood around the unit circle for Kac polynomials

Abstract

In this paper, we study how the roots of the so-called Kac polynomial Wn(z) = Σk=0n-1 k zk are concentrating to the unit circle when its coefficients of Wn are independent and identically distributed non-degenerate real random variables. It is well-known that the roots of a Kac polynomial are concentrating around the unit circle as n∞ if and only if E[( 1+ |0|)]<∞. Under the condition of E[20]<∞, we show that there exists an annulus of width O(n-2( n)-3) around the unit circle which is free of roots with probability 1-O(( n)-1/2). The proof relies on the so-called small ball probability inequalities and the least common denominator.