On Trivial Cyclically Covering Subspaces of Fqn in Non-Coprime Characteristic
Abstract
A subspace U of Fqn is called cyclically covering if the whole space Fqn is the union of the cyclic shifts of U. The case Fqn itself is the only covering subspace, is of particular interest. Recently, Huang solved this problem completely under the condition (n, q)=1 using primitive idempotents and trace functions, and explicitly posed the non-coprime case as an open question. This paper provides a complete answer to Huang's question. We prove that if n = pk m where p = char(Fq) and (m, p)=1, then hq(pk m) = 0 if and only if hq(m) = 0. This result fully reduces the non-coprime case to the coprime case settled by Huang. Our proof employs the structure theory of cyclic group algebras in modular characteristic.
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