On Vertex-Robust Identifying Codes of Level Three
Honkala Iiro; Laihonen Tero
On Vertex-Robust Identifying Codes of Level Three
Honkala Iiro
Laihonen Tero
CHARLES BABBAGE RES CTR
Julkaisun pysyvä osoite on:
https://urn.fi/URN:NBN:fi-fe2021042714424
https://urn.fi/URN:NBN:fi-fe2021042714424
Tiivistelmä
Assume that G = (V, E) is an undirected and connected graph, and consider C subset of V. For every v is an element of V, let I(r)(v) = {u is an element of C : d(u, v) <= r}, where d(u, v) denotes the number of edges on any shortest path between u to v in G. If all the sets I(r)(v) for v is an element of V are pairwise different, and none of them is the empty set, C is called an r-identifying code. In this paper, we consider t-vertex-robust r-identifying codes of level s, that is, r-identifying codes such that they cover every vertex at least s times and the code is vertex-robust in the sense that vertical bar I(r)(u) Delta I(r)(v)vertical bar >= 2t+1 for any two different vertices u and v. Vertex-robust identifying codes of different levels are examined, in particular, of level 3. We give bounds (sometimes exact values) on the density or cardinality of the codes in binary hypercubes and in some infinite grids.
Kokoelmat
- Rinnakkaistallenteet [19207]