AbstractUpper bounds on the maximum number of minimal codewords in a binary code follow from the theory of matroids. Random coding provides lower bounds. In this paper, we compare these bounds with analogous bounds for the cycle code of graphs. This problem (in the graphic case) was considered in 1981 by Entringer and Slater who asked if a connected graph with p vertices and q edges can have only slightly more than 2q−p cycles. The bounds in this note answer this in the affirmative for all graphs except possibly some that have fewer than 2p+3log2(3p) edges. We also conclude that an Eulerian (even and connected) graph has at most 2q−p cycles unless the graph is a subdivision of a 4-regular graph that is the edge-disjoint union of two Hamilto...
AbstractWe show that for all positive ε, an integer N(ε) exists such that if G is any graph of order...
The study of minimal codewords in linear codes was motivated by Massey who described how minimal cod...
AbstractIn an undirected graph G, a subset C⊆V(G) such that C is a dominating set of G, and each ver...
AbstractUpper bounds on the maximum number of minimal codewords in a binary code follow from the the...
Upper bounds on the maximum number of minimal codewords in a binary code follow from the theory of m...
AbstractThe cycle code of a graph is the binary linear span of the characteristic vectors of circuit...
2000 Mathematics Subject Classification: 94B05, 94B15.Cyclic binary codes C of block length n = 2^m ...
AbstractN. Alon [J. Graph Theory 10 (1986), 123–127] proved that if the minimum degree of a graph G ...
AbstractAn identifying code of a graph G is a dominating set C such that every vertex x of G is dist...
AbstractIn [4] Dodunekov and Manev have shown thatn(k, 2k-i) ≥g(k, 2k-i)+2for3≤i≤k-4.In casek≥9,we f...
AbstractFirst, we compute the number of non-minimal codewords of weight 2dmin in the binary Reed–Mul...
In 1975, P. Erd\H{o}s proposed the problem of determining the maximum number $f(n)$ of edges in a gr...
AbstractLet G=(V, E) be a block of order n, different from Kn. Let m=min {d(x)+d(y): [x, y]∉E}. We s...
Minimal codewords were introduced by Massey (Proceedings of the 6th Joint Swedish-Russian Internatio...
M(n, d) denotes a maximal set of n-place binary sequences with entries 0 and 1 such that the Hamming...
AbstractWe show that for all positive ε, an integer N(ε) exists such that if G is any graph of order...
The study of minimal codewords in linear codes was motivated by Massey who described how minimal cod...
AbstractIn an undirected graph G, a subset C⊆V(G) such that C is a dominating set of G, and each ver...
AbstractUpper bounds on the maximum number of minimal codewords in a binary code follow from the the...
Upper bounds on the maximum number of minimal codewords in a binary code follow from the theory of m...
AbstractThe cycle code of a graph is the binary linear span of the characteristic vectors of circuit...
2000 Mathematics Subject Classification: 94B05, 94B15.Cyclic binary codes C of block length n = 2^m ...
AbstractN. Alon [J. Graph Theory 10 (1986), 123–127] proved that if the minimum degree of a graph G ...
AbstractAn identifying code of a graph G is a dominating set C such that every vertex x of G is dist...
AbstractIn [4] Dodunekov and Manev have shown thatn(k, 2k-i) ≥g(k, 2k-i)+2for3≤i≤k-4.In casek≥9,we f...
AbstractFirst, we compute the number of non-minimal codewords of weight 2dmin in the binary Reed–Mul...
In 1975, P. Erd\H{o}s proposed the problem of determining the maximum number $f(n)$ of edges in a gr...
AbstractLet G=(V, E) be a block of order n, different from Kn. Let m=min {d(x)+d(y): [x, y]∉E}. We s...
Minimal codewords were introduced by Massey (Proceedings of the 6th Joint Swedish-Russian Internatio...
M(n, d) denotes a maximal set of n-place binary sequences with entries 0 and 1 such that the Hamming...
AbstractWe show that for all positive ε, an integer N(ε) exists such that if G is any graph of order...
The study of minimal codewords in linear codes was motivated by Massey who described how minimal cod...
AbstractIn an undirected graph G, a subset C⊆V(G) such that C is a dominating set of G, and each ver...