A p-adic criterion for Lehmer's conjecture

Abstract

For a non-zero algebraic number α of degree d, let h(α) denote its logarithmic Weil height. It is known that when h(α) is small, and d is large, the conjugates of α are clustered near the unit circle and have angular equidistribution in the complex plane about the origin. In this paper, we establish a p-adic analogue of this result by obtaining lower bounds for h(α) in terms of the number of its conjugates that lie in a finite extension of Qp, for some prime p. As a consequence, we prove Lehmer's conjecture for all α such that d d many of its conjugates lie in a finite extension of Qp.