On König–Egerváry corona graphs

Vadim E. Levit; Eugen Mandrescu

doi:10.1007/s40590-025-00796-8

On König–Egerváry corona graphs

Vadim E. Levit
, Eugen Mandrescu

Ariel University
Holon Institute of Technology

Research output: Contribution to journal › Article › peer-review

Abstract

Let α(G) denote the cardinality of a maximum independent set and μ(G) be the size of a maximum matching of a graph G=VG,EG. If α(G)+μ(G)=VG-k, then G is a k -König–Egerváry graph. In particular, if k=0, then G is a König–Egerváry graph. The coronaH∘X of a graph H and a family of graphs X=Xi:1≤i≤V(H) is obtained by joining each vertex vi of H to all the vertices of the corresponding graph Xi,i=1,2,..,V(H). In this paper we completely characterize graphs whose coronas are k-König–Egerváry graphs, where k∈0,1.

Original language	English
Article number	110
Journal	Boletin de la Sociedad Matematica Mexicana
Volume	31
Issue number	3
DOIs	https://doi.org/10.1007/s40590-025-00796-8
State	Published - Nov 2025
Externally published	Yes

Bibliographical note

Publisher Copyright:
© The Author(s) 2025.

Keywords

1-König–Egerváry graph
Corona of graphs
König–Egerváry graph
Maximum independent set
Maximum matching

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10.1007/s40590-025-00796-8

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title = "On K{\"o}nig–Egerv{\'a}ry corona graphs",

abstract = "Let α(G) denote the cardinality of a maximum independent set and μ(G) be the size of a maximum matching of a graph G=VG,EG. If α(G)+μ(G)=VG-k, then G is a k -K{\"o}nig–Egerv{\'a}ry graph. In particular, if k=0, then G is a K{\"o}nig–Egerv{\'a}ry graph. The coronaH∘X of a graph H and a family of graphs X=Xi:1≤i≤V(H) is obtained by joining each vertex vi of H to all the vertices of the corresponding graph Xi,i=1,2,..,V(H). In this paper we completely characterize graphs whose coronas are k-K{\"o}nig–Egerv{\'a}ry graphs, where k∈0,1.",

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doi = "10.1007/s40590-025-00796-8",

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AU - Levit, Vadim E.

AU - Mandrescu, Eugen

N1 - Publisher Copyright: © The Author(s) 2025.

PY - 2025/11

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N2 - Let α(G) denote the cardinality of a maximum independent set and μ(G) be the size of a maximum matching of a graph G=VG,EG. If α(G)+μ(G)=VG-k, then G is a k -König–Egerváry graph. In particular, if k=0, then G is a König–Egerváry graph. The coronaH∘X of a graph H and a family of graphs X=Xi:1≤i≤V(H) is obtained by joining each vertex vi of H to all the vertices of the corresponding graph Xi,i=1,2,..,V(H). In this paper we completely characterize graphs whose coronas are k-König–Egerváry graphs, where k∈0,1.

AB - Let α(G) denote the cardinality of a maximum independent set and μ(G) be the size of a maximum matching of a graph G=VG,EG. If α(G)+μ(G)=VG-k, then G is a k -König–Egerváry graph. In particular, if k=0, then G is a König–Egerváry graph. The coronaH∘X of a graph H and a family of graphs X=Xi:1≤i≤V(H) is obtained by joining each vertex vi of H to all the vertices of the corresponding graph Xi,i=1,2,..,V(H). In this paper we completely characterize graphs whose coronas are k-König–Egerváry graphs, where k∈0,1.

KW - 1-König–Egerváry graph

KW - Corona of graphs

KW - König–Egerváry graph

KW - Maximum independent set

KW - Maximum matching

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ER -

On König–Egerváry corona graphs

Abstract

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Keywords

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