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Extensions of Richardson’s theorem for infinite digraphs and (𝒜, ℬ)-kernels
- Source :
- AKCE International Journal of Graphs and Combinatorics, Vol 17, Iss 3, Pp 1014-1020 (2020)
- Publication Year :
- 2020
- Publisher :
- Informa UK Limited, 2020.
-
Abstract
- Let D be a digraph and and two subsets of where = {P: P is a non trivial finite path in D}. A subset N of V(D) is said to be an ()-kernel of D if: (1) for every {u,v} N there exists no uv-path P such that P (N is -independent), (2) for every vertex x in V(D) there exist y in N and P in such that P is an xy-path (N is -absorbent). As a particular case, the concept of ()-kernel generalizes the concept of kernel when = = A(D). A classical result in kernel theory is Richardson’s theorem which establishes that if D is a finite digraph without odd cycles, then D has a kernel. In this paper, the original results are sufficient conditions for the existence of ()-kernels in possibly infinite digraphs, in particular we will present some generalizations of Richardson’s theorem for infinite digraphs. Also we will deduce some conditions for the existence of kernels by monochromatic paths, H-kernels and (k,l)-kernels in possibly infinite digraphs.
- Subjects :
- Path (topology)
Richardson's theorem
Mathematics::Combinatorics
kernel
lcsh:Mathematics
Existential quantification
010102 general mathematics
()-kernel
Digraph
0102 computer and information sciences
lcsh:QA1-939
01 natural sciences
Combinatorics
Kernel (algebra)
h-kernel
010201 computation theory & mathematics
Discrete Mathematics and Combinatorics
0101 mathematics
kernel by monochromatic paths
Mathematics
Subjects
Details
- ISSN :
- 25433474 and 09728600
- Volume :
- 17
- Database :
- OpenAIRE
- Journal :
- AKCE International Journal of Graphs and Combinatorics
- Accession number :
- edsair.doi.dedup.....97c2dc710645b0eb72f151b3b50a3eb3