Prime Power Residues and Blocking Sets
Abstract
Let q be a fixed odd prime. We show that a finite subset B of integers, not containing any perfect qth power, contains a qth power modulo almost every prime if and only if B corresponds to a blocking set (with respect to hyperplanes) in PG(Fqk). Here, k is the number of distinct prime divisors of q-free parts of elements of B. As a consequence, the property of a subset B to contain qth power modulo almost every prime p is invariant under geometric q-equivalence defined by an element of the projective general linear group PGL(Fqk). Employing this connection between two disparate branches of mathematics, Galois geometry and number theory, we classify, and provide bounds on the sizes of, minimal such sets B.
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