On Cayley Graphs with Constant Ricci Curvature-Reference-Cited by-同舟云学术

On Cayley Graphs with Constant Ricci Curvature

Published:2024-06-30 Issue:1 Volume:16 Page:255-260
ISSN:2148-1830
Container-title:Turkish Journal of Mathematics and Computer Science
language:
Short-container-title:

Author:

Dağlı Mehmet¹^ORCID,Ünver Yonca²^ORCID

Affiliation:

1. AMASYA ÜNİVERSİTESİ, FEN-EDEBİYAT FAKÜLTESİ, MATEMATİK BÖLÜMÜ

2. AMASYA ÜNİVERSİTESİ, FEN BİLİMLERİ ENSTİTÜSÜ

Abstract

Understanding the geometry of graphs has become increasingly important. One approach utilizes the Ricci curvature introduced by Lin, Lu, and Yau, which offers a valuable isomorphism invariant for locally finite graphs. One of the key tools used in calculating curvatures is the matching condition. This paper exploits the matching condition to construct families of Cayley graphs exhibiting constant Ricci curvature.

Publisher

Turkish Journal of Mathematics and Computer Science, Association of Mathematicians

Reference15 articles.

1. Bauer, F., Jost, J., Liu, L., Ollivier-Ricci curvature and the spectrum of the normalized graph Laplace operator, Math. Res. Lett., 19(6)(2012), 1185–1205.

2. Bhattacharya, B.B., Mukherjee, S., Exact and asymptotic results on coarse Ricci curvature of graphs, Discrete Math., 338(1)(2015), 23–42.

3. Cushing, D., Kamtue, S., Kangaslampi, R., Liu, S., Münch, F. et al., Bakry-E´mery and Ollivier Ricci curvature of Cayley graphs, arXiv:2310.15953, (2023).

4. Dağlı, M., Olmez, O., Smith, J.D.H., Ricci curvature, circulants, and extended matching conditions, B. Korean Math. Soc., 56(1)(2019), 201–217.

5. Eidi, M., Jost, J., Ollivier Ricci curvature of directed hypergraphs, Scientific Reports, 10(2020).