arXiv:1703.07058 Abstract | arXiv Analytics

arXiv:1703.07058 [math.CO]Abstract References Reviews Resources

On Jacobian group and complexity of I-graph I(n,k,l) through Chebyshev polynomials

Published 2017-03-21Version 1

We consider a family of I-graphs I(n,k,l), which is a generalization of the class of generalized Petersen graphs. In the present paper, we provide a new method for counting Jacobian group of the I-graph I(n,k,l). We show that the minimum number of generators of Jac(I(n,k,l)) is at least two and at most 2k + 2l - 1. Also, we obtain a closed formula for the number of spanning trees of I(n,k,l) in terms of Chebyshev polynomials. We investigate some arithmetical properties of this number and its asymptotic behaviour.

Comments: 17. arXiv admin note: substantial text overlap with arXiv:1612.03372

Categories: math.CO

Subjects: 05C30, 39A10

Keywords: chebyshev polynomials, complexity, counting jacobian group, minimum number, generalized petersen graphs

Related articles: Most relevant | Search more

arXiv:1612.03372 [math.CO] (Published 2016-12-11)

On Jacobian group and complexity of the generalized Petersen graph GP(n,k) through Chebyshev polynomials

Y. S. Kwon, A. D. Mednykh, I. A. Mednykh

arXiv:1902.05681 [math.CO] (Published 2019-02-15)

Complexity of the circulant foliation over a graph

Young Soo Kwon, Alexander Mednykh, Ilya Mednykh

arXiv:2312.16447 [math.CO] (Published 2023-12-27)