On cyclically covering subspaces of Fnq

Abstract

For a prime power \( q \) and a positive integer \( n \), a subspace \( U ⊂eq Fqn \) is called cyclically covering if the union of all its cyclic shifts covers the whole space \( Fqn \). Let \( hq(n) \) denote the maximum possible codimension of such a subspace. This paper focuses on the case \( hq(n) = 0 \). We provide necessary and sufficient conditions under which \( hq(n) = 0 \) holds. As an application, we show that \( hq(t) = 0 \) whenever \( q \) is a primitive root modulo \( t \). Moreover, we prove that if \( n \) is odd and \( hq(n) = 0 \), then also \( hq(2n) = 0 \). As an example, we show that \( h3(11) =h3(16) = 1 \). Furthermore, we investigate the relationship between the coverings of \(Fqmn\) and \(Fqmn\), and obtain several sufficient conditions for \(hqm(n) = 0\). Specifically, we derive that if \(n = 3\) or \(n = 2d\) (where \(d\) is a nonnegative integer), then \(h4(n) = 0\).