A Characterization of Some Minihypers in a Finite Projective Geometry PG(t, 4)
- 1 November 1990
- journal article
- Published by Elsevier in European Journal of Combinatorics
- Vol. 11 (6) , 541-548
- https://doi.org/10.1016/s0195-6698(13)80039-x
Abstract
No abstract availableKeywords
This publication has 12 references indexed in Scilit:
- Characterization of {(q + 1) + 2, 1;t, q}-min · hypers and {2(q + 1) + 2, 2; 2,q}-min · hypers in a Finite projective geometryGraphs and Combinatorics, 1989
- A characterization of {νμ + 1 + ε, νμ; t, q}-min.hypers and its applications to error-correcting codes and factorial designsJournal of Statistical Planning and Inference, 1989
- Characterization of {2(q+1)+2,2;t,q}- min·hypers in PG(t, q) (t⩾3,q⩾5) and its applications to error-correcting codesDiscrete Mathematics, 1988
- Arcs and Blocking Sets IIEuropean Journal of Combinatorics, 1987
- Construction of Optimal Linear Codes Using Flats and Spreads in a Finite Projective GeometryEuropean Journal of Combinatorics, 1982
- A characterization of codes meeting the Griesmer boundInformation and Control, 1981
- A note on the construction of optimal linear codesJournal of Statistical Planning and Inference, 1981
- On a geometrical method of construction of maximal t-linearly independent setsJournal of Combinatorial Theory, Series A, 1978
- Algebraically punctured cyclic codesInformation and Control, 1965
- A Bound for Error-Correcting CodesIBM Journal of Research and Development, 1960