On friendly index sets and product-cordial index sets of gear graphs
Let G = (V,E) be a simple connected graph. A vertex labeling of f:V→{0,1} of G induces two edge labelings f+, f*:E→{0,1} defined by f+(xy)x =x f(x)+f(y)(mod2) and f*(xy)x =x f(x)f(y) for each edge xy ε E. For iε{0,1}, let vf(i)x =x |{vεV:f(v)x =x i}|, ef+(i)x =x |{eεE:f+(e)x =x i}| and ef*(i)x =x |e...
| Published in: | AIP Conference Proceedings |
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| Format: | Conference paper |
| Language: | English |
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American Institute of Physics Inc.
2014
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| Online Access: | https://www.scopus.com/inward/record.uri?eid=2-s2.0-84904704438&doi=10.1063%2f1.4887666&partnerID=40&md5=31d04e95c078dbc1ae4cc20ec7809bd5 |
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2-s2.0-84904704438 Lau G.-C.; Lee S.-M.; Ng H.-K. On friendly index sets and product-cordial index sets of gear graphs 2014 AIP Conference Proceedings 1605 10.1063/1.4887666 https://www.scopus.com/inward/record.uri?eid=2-s2.0-84904704438&doi=10.1063%2f1.4887666&partnerID=40&md5=31d04e95c078dbc1ae4cc20ec7809bd5 Let G = (V,E) be a simple connected graph. A vertex labeling of f:V→{0,1} of G induces two edge labelings f+, f*:E→{0,1} defined by f+(xy)x =x f(x)+f(y)(mod2) and f*(xy)x =x f(x)f(y) for each edge xy ε E. For iε{0,1}, let vf(i)x =x |{vεV:f(v)x =x i}|, ef+(i)x =x |{eεE:f+(e)x =x i}| and ef*(i)x =x |eεE:f*(e)x =x i}|. A labeling f is called friendly if |vf(1)-vf(0)|≤1. The friendly index set and the product-cordial index set of G are defined as the sets {|ef+(0)-ef+(1)|:f is friendly} and {|ef*(0)-ef*(1)|:f is friendly}. In this paper, we completely determine the friendly index sets and product-cordial index sets of gear graphs. We also show that the product-cordial indices of a graph can be obtained from its adjacency matrix. © 2014 AIP Publishing LLC. American Institute of Physics Inc. 0094243X English Conference paper All Open Access; Bronze Open Access |
| author |
Lau G.-C.; Lee S.-M.; Ng H.-K. |
| spellingShingle |
Lau G.-C.; Lee S.-M.; Ng H.-K. On friendly index sets and product-cordial index sets of gear graphs |
| author_facet |
Lau G.-C.; Lee S.-M.; Ng H.-K. |
| author_sort |
Lau G.-C.; Lee S.-M.; Ng H.-K. |
| title |
On friendly index sets and product-cordial index sets of gear graphs |
| title_short |
On friendly index sets and product-cordial index sets of gear graphs |
| title_full |
On friendly index sets and product-cordial index sets of gear graphs |
| title_fullStr |
On friendly index sets and product-cordial index sets of gear graphs |
| title_full_unstemmed |
On friendly index sets and product-cordial index sets of gear graphs |
| title_sort |
On friendly index sets and product-cordial index sets of gear graphs |
| publishDate |
2014 |
| container_title |
AIP Conference Proceedings |
| container_volume |
1605 |
| container_issue |
|
| doi_str_mv |
10.1063/1.4887666 |
| url |
https://www.scopus.com/inward/record.uri?eid=2-s2.0-84904704438&doi=10.1063%2f1.4887666&partnerID=40&md5=31d04e95c078dbc1ae4cc20ec7809bd5 |
| description |
Let G = (V,E) be a simple connected graph. A vertex labeling of f:V→{0,1} of G induces two edge labelings f+, f*:E→{0,1} defined by f+(xy)x =x f(x)+f(y)(mod2) and f*(xy)x =x f(x)f(y) for each edge xy ε E. For iε{0,1}, let vf(i)x =x |{vεV:f(v)x =x i}|, ef+(i)x =x |{eεE:f+(e)x =x i}| and ef*(i)x =x |eεE:f*(e)x =x i}|. A labeling f is called friendly if |vf(1)-vf(0)|≤1. The friendly index set and the product-cordial index set of G are defined as the sets {|ef+(0)-ef+(1)|:f is friendly} and {|ef*(0)-ef*(1)|:f is friendly}. In this paper, we completely determine the friendly index sets and product-cordial index sets of gear graphs. We also show that the product-cordial indices of a graph can be obtained from its adjacency matrix. © 2014 AIP Publishing LLC. |
| publisher |
American Institute of Physics Inc. |
| issn |
0094243X |
| language |
English |
| format |
Conference paper |
| accesstype |
All Open Access; Bronze Open Access |
| record_format |
scopus |
| collection |
Scopus |
| _version_ |
1809677610790158336 |