## Title data

Körner, Theresa ; Kurz, Sascha:

**Lengths of divisible codes with restricted column multiplicities.**

2023

*Event:* Research Seminar - Foundations of Computation University of St. Gallen
, 15.03.2023
, St. Gallen, Schweiz.

(Conference item: Other
Event type,
Speech
)

## Abstract in another language

A linear code C over GF(q) is called Delta-divisible if the Hamming weights wt(c) of all codewords c are divisible by Delta. The study of divisible codes was initiated by Harold Ward.

The possible effective lengths of q^r-divisible codes

have been completely characterized for each prime power q and each nonnegative integer r. An implication of these results are upper bound for partial spreads.

More and more applications of divisible codes emerged in the last years, e.g. upper bounds for so-called subspace codes. Noting that the known characterization result for the possible (effective) lengths of q^r-divisible codes involves quite large point multiplicities on the constructive side, there is quite some need for more refined results taking other parameters like the maximum possible point multiplicities or the dimension. Also the restriction

that the exponent r in the divisibility constant Delta = q^r has to be an integer is not always met in the applications. In this talk I present some partial results on the possible effective lengths of divisible codes with extra constraints.

## Further data

Item Type: | Conference item (Speech) |
---|---|

Refereed: | No |

Additional notes: | Speaker: Theresa Körner |

Keywords: | divisible codes; linear codes; multisets of points; finite geometry; packing problems |

Institutions of the University: | Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics > Chair Mathematical Economics |

Result of work at the UBT: | Yes |

DDC Subjects: | 000 Computer Science, information, general works > 004 Computer science 500 Science > 510 Mathematics |

Date Deposited: | 03 Mar 2023 07:28 |

Last Modified: | 03 Mar 2023 07:28 |

URI: | https://eref.uni-bayreuth.de/id/eprint/74080 |