on the number of cliques and cycles in graphs
We give a new recursive method to compute the number of cliques and cycles of a graph. This method is related, respectively to the number of disjoint cliques in the complement graph and to the sum of permanent function over all principal minors of the adjacency matrix of the graph. In particular, le...
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| Format: | Article |
| Language: | English |
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University of Isfahan
2013-06-01
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| Series: | Transactions on Combinatorics |
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| Online Access: | http://www.combinatorics.ir/?_action=showPDF&article=2872&_ob=183b76bba4970596525b994ca1ef4997&fileName=full_text.pdf. |
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Article |
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doaj-a18aa4c91ff241ffb8ec2e1b80517c712020-11-24T22:15:10ZengUniversity of IsfahanTransactions on Combinatorics2251-86572251-86652013-06-01222733on the number of cliques and cycles in graphsMojgan EmamiMasoud AriannejadWe give a new recursive method to compute the number of cliques and cycles of a graph. This method is related, respectively to the number of disjoint cliques in the complement graph and to the sum of permanent function over all principal minors of the adjacency matrix of the graph. In particular, let $G$ be a graph and let $overline {G}$ be its complement, then given the chromatic polynomial of $overline {G}$, we give a recursive method to compute the number of cliques of $G$. Also given the adjacency matrix $A$ of $G$ we give a recursive method to compute the number of cycles by computing the sum of permanent function of the principal minors of $A$. In both cases we confront to a new computable parameter which is defined as the number of disjoint cliques in $G$.http://www.combinatorics.ir/?_action=showPDF&article=2872&_ob=183b76bba4970596525b994ca1ef4997&fileName=full_text.pdf.GraphCycleClique |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Mojgan Emami Masoud Ariannejad |
| spellingShingle |
Mojgan Emami Masoud Ariannejad on the number of cliques and cycles in graphs Transactions on Combinatorics Graph Cycle Clique |
| author_facet |
Mojgan Emami Masoud Ariannejad |
| author_sort |
Mojgan Emami |
| title |
on the number of cliques and cycles in graphs |
| title_short |
on the number of cliques and cycles in graphs |
| title_full |
on the number of cliques and cycles in graphs |
| title_fullStr |
on the number of cliques and cycles in graphs |
| title_full_unstemmed |
on the number of cliques and cycles in graphs |
| title_sort |
on the number of cliques and cycles in graphs |
| publisher |
University of Isfahan |
| series |
Transactions on Combinatorics |
| issn |
2251-8657 2251-8665 |
| publishDate |
2013-06-01 |
| description |
We give a new recursive method to compute the number of cliques and cycles of a graph. This method is related, respectively to the number of disjoint cliques in the complement graph and to the sum of permanent function over all principal minors of the adjacency matrix of the graph. In particular, let $G$ be a graph and let $overline {G}$ be its complement, then given the chromatic polynomial of $overline {G}$, we give a recursive method to compute the number of cliques of $G$. Also given the adjacency matrix $A$ of $G$ we give a recursive method to compute the number of cycles by computing the sum of permanent function of the principal minors of $A$. In both cases we confront to a new computable parameter which is defined as the number of disjoint cliques in $G$. |
| topic |
Graph Cycle Clique |
| url |
http://www.combinatorics.ir/?_action=showPDF&article=2872&_ob=183b76bba4970596525b994ca1ef4997&fileName=full_text.pdf. |
| work_keys_str_mv |
AT mojganemami onthenumberofcliquesandcyclesingraphs AT masoudariannejad onthenumberofcliquesandcyclesingraphs |
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1725795702778363904 |