On the number of monic admissible polynomials in the ring Z[x]

Abstract

In this paper we study admissible polynomials. We establish an estimate for the number of admissible polynomials of degree n with coeffients ai satisfying 0≤ ai≤ H for a fixed H, for i=0,1,2, …, n-1. In particular, letting N(H) denotes the number of monic admissible polynomials of degree n≥ 3 with coefficients satisfying the inequality 0≤ ai≤ H, we show that alignHn-1(n-1)!+O(Hn-2)≤ N(H) ≤ nn-1Hn-1(n-1)!+O(Hn-2). align Also letting A(H) denotes the number of monic irreducible admissible polynomials, with coefficients satisfying the same condition , we show that alignA(H)≥ Hn-1(n-1)!+O( Hn-4/3( H)2/3). align