Arithmetical structures on graphs

Corrales, Hugo; Valencia, Carlos E.

doi:10.1016/j.laa.2017.09.018

Cited by 20 publications

(29 citation statements)

References 12 publications

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“…Lorenzini proved in [6] that if G is a simple connected graph, then there are a finite number of arithmetical structures. In [4] this result was generalized to strongly connected multidigraphs. On the other hand, given an arithmetical structure (d, r) on G, letbe its critical group, which generalizes the concept of the critical group of G introduced in [1].…”

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confidence: 93%

“…In [2] there was described in detail the combinatorics of the arithmetical structures on the path and cycle graphs. Also, in [4] there was introduced and studied the arithmetical structures in the general setting of M -matrices and in particular the arithmetical structures on complete graphs, paths, and cycles were studied. Moreover, there was described a subset of the arithmetical structures on the cliquestar transformation of a graph G in dependence on the arithmetical structures on G. Apart from the arithmetical structures on the path and cycle, in general the description of the arithmetical structures on a graph is a very difficult problem.…”

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confidence: 99%

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Arithmetical structures on graphs with connectivity one

Corrales¹,

Valencia

2018

J. Algebra Appl.

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Abstract. Given a graph G, an arithmetical structure on G is a pair of positive integer vectors (d, r) such that gcd(rv | v ∈ V (G)) = 1 and (diag(d) − A)r = 0, where A is the adjacency matrix of G. We describe the arithmetical structures on graph G with a cut vertex v in terms of the arithmetical structures on their blocks. More precisely, if G1, . . . , Gs are the induced subgraphs of G obtained from each of the connected components of G − v by adding the vertex v and their incident edges, then the arithmetical structures on G are in one to one correspondence with the v-rational arithmetical structures on the Gi's. We introduce the concept of rational arithmetical structure, which corresponds to an arithmetical structure where some of the integrality conditions are relaxed.

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confidence: 93%

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confidence: 99%

Arithmetical structures on graphs with connectivity one

Corrales¹,

Valencia

2018

J. Algebra Appl.

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“…In brief, the path P n and the cycle C n on n vertices satisfy | Arith(P n )| = C n−1 = 1 n 2n − 2 n − 1 , | Arith(C n )| = 2n − 1 n − 1 = (2n − 1)C n−1 (Theorems 3 and 30, respectively). These results were announced in [CV18].…”

Section: Introductionmentioning

confidence: 90%

Counting arithmetical structures on paths and cycles

Braun

Corrales

Corry

et al. 2018

Discrete Mathematics

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Let G be a finite, connected graph. An arithmetical structure on G is a pair of positive integer vectors d, r such that (diag(d) − A)r = 0, where A is the adjacency matrix of G. We investigate the combinatorics of arithmetical structures on path and cycle graphs, as well as the associated critical groups (the torsion part of the cokernels of the matrices (diag(d)−A)). For paths, we prove that arithmetical structures are enumerated by the Catalan numbers, and we obtain refined enumeration results related to ballot sequences. For cycles, we prove that arithmetical structures are enumerated by the binomial coefficients 2n−1 n−1 , and we obtain refined enumeration results related to multisets. In addition, we determine the critical groups for all arithmetical structures on paths and cycles.

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“…Moreover, L is an ICB matrix if and only if G L is strongly connected (see [8], for a recent related work). Indeed, first remark that a permutation of L is just a re-enumeration of the vertex set of G and a corresponding relabelling of the directed arcs.…”

Section: 4mentioning

confidence: 99%