Guilherme C. M. Gomes, Bruno P. Masquio, Paulo E. D. Pinto, Dieter Rautenbach, Vinicius F. dos Santos, Jayme L. Szwarcfiter, Florian Werner
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引用次数: 0
Abstract
A matching is said to be disconnected if the saturated vertices induce a
disconnected subgraph and induced if the saturated vertices induce a 1-regular
graph. The disconnected and induced matching numbers are defined as the maximum
cardinality of such matchings, respectively, and are known to be NP-hard to
compute. In this paper, we study the relationship between these two parameters
and the matching number. In particular, we discuss the complexity of two
decision problems; first: deciding if the matching number and disconnected
matching number are equal; second: deciding if the disconnected matching number
and induced matching number are equal. We show that given a bipartite graph
with diameter four, deciding if the matching number and disconnected matching
number are equal is NP-complete; the same holds for bipartite graphs with
maximum degree three. We characterize diameter three graphs with equal matching
number and disconnected matching number, which yields a polynomial time
recognition algorithm. Afterwards, we show that deciding if the induced and
disconnected matching numbers are equal is co-NP-complete for bipartite graphs
of diameter 3. When the induced matching number is large enough compared to the
maximum degree, we characterize graphs where these parameters are equal, which
results in a polynomial time algorithm for bounded degree graphs.
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