source: Contemporary Mathematics and Applications (ConMathA)
Abstract
The zero-divisor graph of a commutative ring is a graph where the vertices represent the zero-divisors of the ring, and two distinct vertices are connected if their product equals zero. This study focuses on determining general formulas for the Szeged index and the Padmakar-Ivan index of the zero-divisor graph for specific commutative rings. The results show that for the first case of ring, the Szeged index is exactly half of the Padmakar-Ivan index. For the second case, the Szeged index is consistently greater than the Padmakar-Ivan index. These findings enhance the understanding of how the algebraic structure of rings influences the topological properties of their associated graphs.
Concepts :
Graph theory and applications
Rings, Modules, and Algebras
Commutative Algebra and Its Applications
article
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Year 2025
source Contemporary Mathematics and Applications (ConMathA)
Citations by Year
| Year | Count |
|---|---|
| 2025 | 0 |