Inversion and subspaces of a finite field

Abstract

Let A and B two Fq-subspaces of a finite field, of the same size, and let A-1 denote the set of inverses of the nonzero elements of A. Mattarei proved that A-1 can only be contained in A if either A is a subfield, or A is the set of trace zero elements in a quadratic extension of a field. Csajb\'ok refined this to the following quantitative statement: if A-1⊂eq B, then the bound |A-1 B| 2|B|/q-2 holds. He also gave examples showing that his bound is sharp for |B| q3. Our main result is a proof of the stronger bound |A-1 B| |B|/q·(1+Od(q-1/2)), for |B|=qd with d>3. We also classify all examples with |B| q3 which attain equality in Csajb\'ok's bound.