The Transfer Ideal under the Action of a Nonmetacyclic Group in the Modular Case

Authors

Panpan Jia School of Mathematics, Dalian University of Technology, Dalian, Liaoning, 116024
Jizhu Nan School of Mathematics, Dalian University of Technology, Dalian, Liaoning, 116024

DOI:

https://doi.org/10.13447/j.1674-5647.2019.03.08

Keywords:

invariant, $p$-group, coinvariant, transfer ideal, principal ideal

Abstract

Let $F_q$ be a finite field of characteristic $p$ $(p\neq2)$ and $V_4$ a four-dimensional $F_q$-vector space. In this paper, we mainly determine the structure of the transfer ideal for the ring of polynomials $F_q[V_4]$ under the action of a nonmetacyclic $p$-group $P$ in the modular case. We prove that the height of the transfer ideal is 1 using the fixed point sets of the elements of order $p$ in $P$ and that the transfer ideal is a principal ideal.

Downloads

Preview
Requires Subscription Full PDF

Published

2019-12-16

Issue

Vol. 35 No. 3 (2019)

Section

Articles