On the powerful values of polynomials over number fields

Abstract

Let B=\bi \i=1∞ be a fixed sequence of pairwise distinct elements of a number field k. Given the integers 2≤ s ≤ r, assuming a quantitative version of Vojta's conjecture on the bounded degree algebraic numbers on a number field k, we provide lower and upper bounds for the cardinal number of Gr,s BM the set of polynomials f∈ k[x] of degree r≥ 2 whose irreducible factors have multiplicity strictly less than s and f(b1),·s, f(bM) are nonzero s-powerful elements in k, where M=2r2+6r +1 if r=s, and 2sr2+ s r+1 otherwise. Moreover, considering certain conditions on B, we show the existence of an integer M0> M such that no polynomial in Gr,s BM takes s-powerful values at all of b1, ·s, bn for n≥ M0.