at Google ScholarTitle data
Kurz, Sascha:
Nodal surfaces in P^3 and coding theory.
Bayreuth
,
2025
. - 11 p.
DOI: https://doi.org/10.15495/EPub_UBT_00008468
Official URL: 
Abstract in another language
To each nodal hypersurface one can associate a binary linear code. Here we show that the binary linear code associated to sextics in P^3 with the maximum number of 65 nodes, as e.g. the Barth sextic, is unique. We also state possible candidates for codes that might be associated with a hypothetical septic attaining the currently best known upper bound for the maximum number of nodes.
Further data
| Item Type: | Preprint, postprint |
|---|---|
| Keywords: | nodal hypersurface; linear code; Barth sextic; coding theory |
| Subject classification: | Mathematics Subject Classification Code: 14J70 (94B05) |
| Institutions of the University: | Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics > Chair Mathematical Economics Faculties Faculties > Faculty of Mathematics, Physics und Computer Science |
| Result of work at the UBT: | Yes |
| DDC Subjects: | 000 Computer Science, information, general works > 004 Computer science 500 Science > 510 Mathematics |
| Date Deposited: | 24 May 2025 21:00 |
| Last Modified: | 06 Oct 2025 12:07 |
| URI: | https://eref.uni-bayreuth.de/id/eprint/93640 |