EXISTENCE OF REGULAR NUT GRAPHS AND THE FOWLER CONSTRUCTION
In this paper the problem of the existence of regular nut graphs is addressed. A generalization of Fowler’s Construction which is a local enlargement applied to a vertex in a graph is introduced to generate nut graphs of higher order. Let N(ρ) denote the set of integers n such that there exists a re...
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| Published in | Applicable analysis and discrete mathematics Vol. 17; no. 2; pp. 321 - 333 |
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| Main Authors | , , |
| Format | Journal Article |
| Language | English |
| Published |
University of Belgrade, Serbia
2023
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| Online Access | Get full text |
| ISSN | 1452-8630 2406-100X 2406-100X |
| DOI | 10.2298/AADM190517028G |
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| Summary: | In this paper the problem of the existence of regular nut graphs is addressed. A generalization of Fowler’s Construction which is a local enlargement applied to a vertex in a graph is introduced to generate nut graphs of higher order. Let N(ρ) denote the set of integers n such that there exists a regular nut graph of degree ρ and order n. It is proven that N(3) = {12} ∪ {2k : k ≥ 9} and that N(4) = {8, 10, 12} ∪ {n : n ≥ 14}. The problem of determining N(ρ) for ρ > 4 remains completely open. |
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| ISSN: | 1452-8630 2406-100X 2406-100X |
| DOI: | 10.2298/AADM190517028G |