CENTROIDAL DIMENSION
Let B = (Rumus) be a set of vertices, and x be any vertex in G. We denote r(x) as an ordered partition of B, that is a list of subsets of B in nondecreasing order by their distance from x. Vertex set B is called a centroidal locating set of G if r(x) 6= r(y) for every pair x;y of distinct vertice...
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id-itb.:324672018-12-20T11:21:00ZCENTROIDAL DIMENSION Tamaro Nadeak, Christyan Probabilitas & matematika terapan Indonesia Theses metric dimension, centroidal dimension, circulant graph, join graph, corona graph, tensor product, cartesius product INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/32467 Let B = (Rumus) be a set of vertices, and x be any vertex in G. We denote r(x) as an ordered partition of B, that is a list of subsets of B in nondecreasing order by their distance from x. Vertex set B is called a centroidal locating set of G if r(x) 6= r(y) for every pair x;y of distinct vertices. A centroidal basis of G is a centroidal locating set of minimum cardinality. The centroidal dimension of G, denoted by CD(G), is the cardinality of centroidal basis of G. In this thesis, we give results about the centroidal dimension of some families of graphs and the centroidal dimension of circulant graph. We also study the centroidal dimension of join and corona of two graphs. In particular, we give results about the centroidal dimension of tensor product and cartesius product of complete graph and path with order 2. We also study the algorithm to determine the centroidal dimension of graph by its adjacency matrix. text |
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Probabilitas & matematika terapan |
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Probabilitas & matematika terapan Tamaro Nadeak, Christyan CENTROIDAL DIMENSION |
| description |
Let B = (Rumus) be a set of vertices, and x be any vertex in G.
We denote r(x) as an ordered partition of B, that is a list of subsets of B in nondecreasing
order by their distance from x. Vertex set B is called a centroidal locating
set of G if r(x) 6= r(y) for every pair x;y of distinct vertices. A centroidal basis of
G is a centroidal locating set of minimum cardinality. The centroidal dimension
of G, denoted by CD(G), is the cardinality of centroidal basis of G. In this thesis,
we give results about the centroidal dimension of some families of graphs and the
centroidal dimension of circulant graph. We also study the centroidal dimension of
join and corona of two graphs. In particular, we give results about the centroidal
dimension of tensor product and cartesius product of complete graph and path with
order 2. We also study the algorithm to determine the centroidal dimension of graph
by its adjacency matrix. |
| format |
Theses |
| author |
Tamaro Nadeak, Christyan |
| author_facet |
Tamaro Nadeak, Christyan |
| author_sort |
Tamaro Nadeak, Christyan |
| title |
CENTROIDAL DIMENSION |
| title_short |
CENTROIDAL DIMENSION |
| title_full |
CENTROIDAL DIMENSION |
| title_fullStr |
CENTROIDAL DIMENSION |
| title_full_unstemmed |
CENTROIDAL DIMENSION |
| title_sort |
centroidal dimension |
| url |
https://digilib.itb.ac.id/gdl/view/32467 |
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1822923874544648192 |