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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
1

Energia laplaciana sem sinal de grafos

Pinheiro, Lucélia Kowalski January 2018 (has links)
Neste trabalho, estudamos o problema de encontrar grafos extremais com rela c~ao a energia laplaciana sem sinal. Mais especi camente, procuramos grafos com a maior energia laplaciana sem sinal em determinadas classes. Nesse sentido, conjecturamos que o grafo unic clico conexo com a maior energia laplaciana sem sinal e o grafo formado por um tri^angulo com v ertices pendentes distribu dos balanceadamente e provamos parcialmente essa conjectura. Tal resultado foi provado tamb em para a energia laplaciana. Al em disso, conjecturamos que o grafo com a maior energia laplaciana sem sinal dentre todos os grafos com n v ertices e o grafo split completo com uma clique de [n+1/ 3] v ertices e provamos tal conjectura para algumas classes de grafos, em particular, para arvores, grafos unic clicos e bic clicos. / In this work, we study the problem of nding extremal graphs with relation to the signless Laplacian energy. More speci cally, we look for graphs with the largest signless Laplacian energy inside certains classes. In this sense, we conjecture that the connected unicyclic graph with the largest signless Laplacian energy is the graph consisting of a triangle with balanced distributed pendent vertices and we partially prove this conjecture. This result was also proved for the Laplacian energy. Moreover we conjecture that the graph with the largest signless Laplacian energy among all graphs with n vertices is the complete split graph with a clique of [n+1/ 3] vertices and we prove this conjecture for some classes of graphs, in particular, for trees, for unicyclic and bicyclic graphs.
2

Energia laplaciana sem sinal de grafos

Pinheiro, Lucélia Kowalski January 2018 (has links)
Neste trabalho, estudamos o problema de encontrar grafos extremais com rela c~ao a energia laplaciana sem sinal. Mais especi camente, procuramos grafos com a maior energia laplaciana sem sinal em determinadas classes. Nesse sentido, conjecturamos que o grafo unic clico conexo com a maior energia laplaciana sem sinal e o grafo formado por um tri^angulo com v ertices pendentes distribu dos balanceadamente e provamos parcialmente essa conjectura. Tal resultado foi provado tamb em para a energia laplaciana. Al em disso, conjecturamos que o grafo com a maior energia laplaciana sem sinal dentre todos os grafos com n v ertices e o grafo split completo com uma clique de [n+1/ 3] v ertices e provamos tal conjectura para algumas classes de grafos, em particular, para arvores, grafos unic clicos e bic clicos. / In this work, we study the problem of nding extremal graphs with relation to the signless Laplacian energy. More speci cally, we look for graphs with the largest signless Laplacian energy inside certains classes. In this sense, we conjecture that the connected unicyclic graph with the largest signless Laplacian energy is the graph consisting of a triangle with balanced distributed pendent vertices and we partially prove this conjecture. This result was also proved for the Laplacian energy. Moreover we conjecture that the graph with the largest signless Laplacian energy among all graphs with n vertices is the complete split graph with a clique of [n+1/ 3] vertices and we prove this conjecture for some classes of graphs, in particular, for trees, for unicyclic and bicyclic graphs.
3

Energia laplaciana sem sinal de grafos

Pinheiro, Lucélia Kowalski January 2018 (has links)
Neste trabalho, estudamos o problema de encontrar grafos extremais com rela c~ao a energia laplaciana sem sinal. Mais especi camente, procuramos grafos com a maior energia laplaciana sem sinal em determinadas classes. Nesse sentido, conjecturamos que o grafo unic clico conexo com a maior energia laplaciana sem sinal e o grafo formado por um tri^angulo com v ertices pendentes distribu dos balanceadamente e provamos parcialmente essa conjectura. Tal resultado foi provado tamb em para a energia laplaciana. Al em disso, conjecturamos que o grafo com a maior energia laplaciana sem sinal dentre todos os grafos com n v ertices e o grafo split completo com uma clique de [n+1/ 3] v ertices e provamos tal conjectura para algumas classes de grafos, em particular, para arvores, grafos unic clicos e bic clicos. / In this work, we study the problem of nding extremal graphs with relation to the signless Laplacian energy. More speci cally, we look for graphs with the largest signless Laplacian energy inside certains classes. In this sense, we conjecture that the connected unicyclic graph with the largest signless Laplacian energy is the graph consisting of a triangle with balanced distributed pendent vertices and we partially prove this conjecture. This result was also proved for the Laplacian energy. Moreover we conjecture that the graph with the largest signless Laplacian energy among all graphs with n vertices is the complete split graph with a clique of [n+1/ 3] vertices and we prove this conjecture for some classes of graphs, in particular, for trees, for unicyclic and bicyclic graphs.

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