Arithmetic completely regular codes

3 years 19 days ago
Arithmetic completely regular codes
In this paper, we explore completely regular codes in the Hamming graphs and related graphs. Experimental evidence suggests that many completely regular codes have the property that the eigenvalues of the code are in arithmetic progression. In order to better understand these “arithmetic completely regular codes”, we focus on cartesian products of completely regular codes and products of their corresponding coset graphs in the additive case. Employing earlier results, we are then able to prove a theorem which nearly classifies these codes in the case where the graph admits a completely regular partition into such codes (e.g, the cosets of some additive completely regular code). Connections to the theory of distance-regular graphs are explored and several open questions are posed.
Jacobus H. Koolen, Woo-Sun Lee, William J. Martin,
Added 02 Apr 2016
Updated 02 Apr 2016
Type Journal
Year 2016
Authors Jacobus H. Koolen, Woo-Sun Lee, William J. Martin, Hajime Tanaka
Comments (0)