On C-Perfection of Modular Product of Graphs
- Title
- On C-Perfection of Modular Product of Graphs
- Creator
- Jayakumar, Gokul S.; Sangeetha, V.
- Description
- A graph G is said to be C-perfect if, for all induced subgraphs H of G, the induced cycle independence number is equal to its corresponding induce cycle covering number, where every vertex in H belongs to at least one cycle in H. This article deals with the study on C-perfection of modular product of graphs. Through this article, we study various structural properties of C-perfect modular product of graphs and also characterize them. The Author(s), under exclusive license to Springer Nature Singapore Pte Ltd. 2025.
- Source
- Springer Proceedings in Mathematics and Statistics;Volume;484;pp.107-115
- Date
- 01-01-2025
- Publisher
- Springer
- Subject
- C-perfect graphs; Modular product
- Coverage
- Jayakumar G.S., CHRIST (Deemed to be University), Karnataka, Bangalore, India; Sangeetha V., CHRIST (Deemed to be University), Karnataka, Bangalore, India
- Rights
- Restricted Access; Hardcopy may be available in the library
- Relation
- ISSN: 21941009; ISBN: 978-981961504-9;
- Format
- online
- Language
- English
- Type
- Conference paper
Collection
Citation
Jayakumar, Gokul S.; Sangeetha, V., “On C-Perfection of Modular Product of Graphs,” CHRIST (Deemed To Be University) Institutional Repository, accessed June 18, 2026, https://archives.christuniversity.in/items/show/25468.