Add to ORKGA code over a group ring is defined to be a submodule of that group ring. For a code $C$ over a group ring $RG$, $C$ is said to be checkable if there is $v\in RG$ such that {$C=\{x\in RG: xv=0\}$}. In \cite{r2}, Jitman et al. introduced the notion of code-checkable group ring. We say that a group ring $RG$ is code-checkable if every ideal in $RG$ is a checkable code. In their paper, Jitman et al. gave a necessary and sufficient condition for the group ring $\mathbb{F}G$, when $\mathbb{F}$ is a finite field and $G$ is a finite abelian group, to be code-checkable. In this paper, we give some characterizations for code-checkable group rings for more general alphabet. For instance, a finite commutative group ring $RG$, with $R$ is semisimple, i...
It is very well known that algebraic structures have valuable applications in the theory of error-co...
AbstractFor any finite commutative ring B with an identity there is a strict inclusion B[X;Z0]⊂B[X;1...
In this paper, we extend the work done on $G$-codes over formal power series rings and finite chain ...
A code over a group ring is defined to be a submodule of that group ring. For a code $C$ over a grou...
In a previous paper (Codes over certain rings, Inform. Contr. 20, 396–404) Blake defined codes over ...
The final publication is available at Springer via http://dx.doi.org/10.1007/s10623-017-0440-7We des...
This work is focused on linear error-correcting codes in group rings. The basic introduc- tion to gr...
This work is focused on linear error-correcting codes in group rings. The basic introduc- tion to gr...
Given an integer m which is a product of distinct primes pi, a method is given for constructing code...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
For any finite commutative ring B with an identity there is a strict inclusion B[X; Z(0)] subset of ...
We obtain structural results about group ring codes over F[G], where F is a finite field of characte...
AbstractFor any finite commutative ring B with an identity there is a strict inclusion B[X;Z0]⊂B[X;1...
It is very well known that algebraic structures have valuable applications in the theory of error-co...
AbstractFor any finite commutative ring B with an identity there is a strict inclusion B[X;Z0]⊂B[X;1...
In this paper, we extend the work done on $G$-codes over formal power series rings and finite chain ...
A code over a group ring is defined to be a submodule of that group ring. For a code $C$ over a grou...
In a previous paper (Codes over certain rings, Inform. Contr. 20, 396–404) Blake defined codes over ...
The final publication is available at Springer via http://dx.doi.org/10.1007/s10623-017-0440-7We des...
This work is focused on linear error-correcting codes in group rings. The basic introduc- tion to gr...
This work is focused on linear error-correcting codes in group rings. The basic introduc- tion to gr...
Given an integer m which is a product of distinct primes pi, a method is given for constructing code...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
In this work, we define $G$-codes over the infinite ring $R_\infty$ as ideals in the group ring $R_\...
For any finite commutative ring B with an identity there is a strict inclusion B[X; Z(0)] subset of ...
We obtain structural results about group ring codes over F[G], where F is a finite field of characte...
AbstractFor any finite commutative ring B with an identity there is a strict inclusion B[X;Z0]⊂B[X;1...
It is very well known that algebraic structures have valuable applications in the theory of error-co...
AbstractFor any finite commutative ring B with an identity there is a strict inclusion B[X;Z0]⊂B[X;1...
In this paper, we extend the work done on $G$-codes over formal power series rings and finite chain ...