Quantum Codes Obtained from Some Constacyclic Codes Over a Family of Finite Rings $$F_{p}+uF_{p}+vF_{p}$$

Abstract

In this paper, we study the quantum codes over $$F_{p}$$, p is an odd prime, obtained from some constacyclic codes over the finite ring $$F_{p}+uF_{p}+vF_{p}$$, where $$ u^{2}=u,v^{2}=v,uv=vu=0$$. A constacyclic code over the finite ring $$F_{p}+uF_{p}+vF_{p}$$ is decomposed into three codes over $$F_{p}$$ in order to determine the parameters of the corresponding quantum codes. Finally, we have constructed some examples of quantum error-correcting codes.