Add to ORKGIt is conjectured by Golomb and Welch around half a century ago that there is no perfect Lee codes $C$ of packing radius $r$ in $\mathbb{Z}^{n}$ for $r\geq2$ and $n\geq 3$. Recently, Leung and the second author proved this conjecture for linear Lee codes with $r=2$. A natural question is whether it is possible to classify the second best, i.e., almost perfect linear Lee codes of packing radius $2$. We show that if such codes exist in $\mathbb{Z}^n$, then $n$ must be $1,2, 11, 29, 47, 56, 67, 79, 104, 121, 134$ or $191$
Abstract—Codes and associated lattices are studied in the lp metric, particularly in the l1 (Lee) an...
The Golomb-Welch conjecture states that there is no perfect r-error correcting Lee code of word leng...
Perfect codes and minimal distance of a code have great importance in the study of theoryof codes. T...
More than 50 years ago, Golomb and Welch conjectured that there is no perfect Lee codes $C$ of packi...
We investigate perfect codes in Zn in the ℓp metric. Upper bounds for the packing radius r of a line...
AbstractIn this paper we survey recent results on the Golomb–Welch conjecture and its generalization...
Perfect codes in the Lee metric are proved to be impossible for (3⩽n⩽5;e⩾n−1;q⩾2e+1) and (n⩾6;e⩾12n2...
AbstractGravier et al. proved [S. Gravier, M. Mollard, Ch. Payan, On the existence of three-dimensio...
AbstractLee-codes, correcting e-errors, over an alphabet with q = 2m letters are considered. It is p...
The Golomb-Welch conjecture states that there is no perfect r-error correcting Lee code of word leng...
In this paper we survey recent results on the Golomb–Welch conjecture and its generalizations and va...
AbstractIn this paper we survey recent results on the Golomb–Welch conjecture and its generalization...
The Elias-bound in the Lee-metric is modified to improve the known bounds for the code parameters in...
AbstractIn this paper, we obtain bounds on the number of parity check digits for Lee weight codes co...
AbstractIt is proved that there are no perfect Lee-error-correcting (PL(n, e, q))-codes over large (...
Abstract—Codes and associated lattices are studied in the lp metric, particularly in the l1 (Lee) an...
The Golomb-Welch conjecture states that there is no perfect r-error correcting Lee code of word leng...
Perfect codes and minimal distance of a code have great importance in the study of theoryof codes. T...
More than 50 years ago, Golomb and Welch conjectured that there is no perfect Lee codes $C$ of packi...
We investigate perfect codes in Zn in the ℓp metric. Upper bounds for the packing radius r of a line...
AbstractIn this paper we survey recent results on the Golomb–Welch conjecture and its generalization...
Perfect codes in the Lee metric are proved to be impossible for (3⩽n⩽5;e⩾n−1;q⩾2e+1) and (n⩾6;e⩾12n2...
AbstractGravier et al. proved [S. Gravier, M. Mollard, Ch. Payan, On the existence of three-dimensio...
AbstractLee-codes, correcting e-errors, over an alphabet with q = 2m letters are considered. It is p...
The Golomb-Welch conjecture states that there is no perfect r-error correcting Lee code of word leng...
In this paper we survey recent results on the Golomb–Welch conjecture and its generalizations and va...
AbstractIn this paper we survey recent results on the Golomb–Welch conjecture and its generalization...
The Elias-bound in the Lee-metric is modified to improve the known bounds for the code parameters in...
AbstractIn this paper, we obtain bounds on the number of parity check digits for Lee weight codes co...
AbstractIt is proved that there are no perfect Lee-error-correcting (PL(n, e, q))-codes over large (...
Abstract—Codes and associated lattices are studied in the lp metric, particularly in the l1 (Lee) an...
The Golomb-Welch conjecture states that there is no perfect r-error correcting Lee code of word leng...
Perfect codes and minimal distance of a code have great importance in the study of theoryof codes. T...