TY  - JOUR 
AU  - Martínez Moro, Edgar
AU  - Piñera Nicolás, Alejandro
AU  - Fernández Rúa, Ignacio
PY  - 2018
SN  - 0022-4049
UR  - http://uvadoc.uva.es/handle/10324/35923
AB  - In this work, we study the structure of multivariable modular codes over finite chain rings when the ambient space is a principal ideal ring. We also provide some applications to additive modular codes over the finite field F4
LA  - eng
PB  - Elsevier
KW  - Anillos (Álgebra)
TI  - Multivariable codes in principal ideal polynomial quotient rings with applications to additive modular bivariate codes over F4
DO  - https://doi.org/10.1016/j.jpaa.2017.04.007
ER  -