Finding large deletion correcting codes is an important issue in coding theory. Many researchers have studied this topic over the years. Varshamov and Tenegolts constructed the Varshamov-Tenengolts codes (VT codes) and Levenshtein showed the Varshamov-Tenengolts codes are perfect binary one-deletion correcting codes in 1992. Tenegolts constructed T codes to handle the non-binary cases. However the T codes are neither optimal nor perfect, which means some progress can be established. Latterly, Bours showed that perfect deletion-correcting codes have a close relationship with design theory. By this approach, Wang and Yin constructed perfect 5-deletion correcting codes of length 7 for large alphabet size. For our research, we focus on how to e...
The construction of the largest codebook capable of correcting multiple number of deletions and inse...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
We investigate deletion correcting codes and constant composition codes in particular. We use graph ...
In 1965 Levenshtein introduced the deletion correcting codes and found an asymptotically optimal fam...
We consider the problem of designing low-redundancy codes in settings where one must correct deletio...
Systematic deletion correcting codes play an important role in applications of document exchange. Ye...
Construction of capacity achieving deletion correcting codes has been a baffling challenge for decad...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
The deletion distance between two binary words $u,v \in \{0,1\}^n$ is the smallest $k$ such that $u$...
Abstract—Explicit non-asymptotic upper bounds on the sizes of multiple-deletion correcting codes are...
Explicit nonasymptotic upper bounds on the sizes of multiple-deletion correcting codes are presented...
Codes are presented that can correct the deletion or the insertion of a predetermined number of adja...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
This paper studies the cardinality of codes correcting insertions and deletions. We give improved up...
Abstract: We propose the construction of a non-binary multiple insertion/deletion correcting code ba...
The construction of the largest codebook capable of correcting multiple number of deletions and inse...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
We investigate deletion correcting codes and constant composition codes in particular. We use graph ...
In 1965 Levenshtein introduced the deletion correcting codes and found an asymptotically optimal fam...
We consider the problem of designing low-redundancy codes in settings where one must correct deletio...
Systematic deletion correcting codes play an important role in applications of document exchange. Ye...
Construction of capacity achieving deletion correcting codes has been a baffling challenge for decad...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
The deletion distance between two binary words $u,v \in \{0,1\}^n$ is the smallest $k$ such that $u$...
Abstract—Explicit non-asymptotic upper bounds on the sizes of multiple-deletion correcting codes are...
Explicit nonasymptotic upper bounds on the sizes of multiple-deletion correcting codes are presented...
Codes are presented that can correct the deletion or the insertion of a predetermined number of adja...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
This paper studies the cardinality of codes correcting insertions and deletions. We give improved up...
Abstract: We propose the construction of a non-binary multiple insertion/deletion correcting code ba...
The construction of the largest codebook capable of correcting multiple number of deletions and inse...
Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that ...
We investigate deletion correcting codes and constant composition codes in particular. We use graph ...