UOPŠTENJA ŠATENOVIH NORMI GRAFOVA I KOMBINATORNE PRIMENE

eLibrary

 
 

UOPŠTENJA ŠATENOVIH NORMI GRAFOVA I KOMBINATORNE PRIMENE

Show simple item record

dc.contributor.advisor Božin, Vladimir
dc.contributor.author Lazarević, Ivan
dc.date.accessioned 2022-05-11T13:08:14Z
dc.date.available 2022-05-11T13:08:14Z
dc.date.issued 2022-04
dc.identifier.uri http://hdl.handle.net/123456789/5371
dc.description.abstract In this doctoral thesis we obtained some results in graph theory and its applica tions. In the rst chapter, we give the review of basic notions and theorems of combinatorial theory of graphs, spectral theory of graphs, random graphs and distribution of their eigenvalues. The most detailed consideration is given to adjacency matrix and properties of its spectrum. In particular, in this dissertation we study Energy of graphs and generalizations of it. Energy of graph is the sum of absolute values of eigenvalues of a graph. Schatten norms of graphs represent p-th degree norm of singular values of graph, and the special cases of this norm for p = 1 corresponds to the Energy of graph. In chapter three of this dissertation we are given the most original scienti c contribution. We prove the conjecture of Nikiforov about Schatten norms of graphs when p > 2. First we prove that conjecture is true for some special classes of graph (for trees and strongly regular graph with maximal energy). After that, we prove the conjecture in the general case. Auxiliary theorem obtained in the proof of this conjecture is also an original result which gives a sharp upper bound of sum of quadratic of the largest k singular values of graph. A corollary of this theorem which gives an upper bound for sum of squares of the biggest two singular values of graph can be useful in further research. In the subsection 3.3 we give an original theorem about asymptotic properties of spectrum and thus energy of complement graph for a large values of n. In the subsection 3.4 we calculate a mean of p-th degree of singular values and upper bound of geometric mean of almost all graphs. The last chapter shows relation between combinatorial theory of graphs with universal universal algebra and mathematical logic. The central part of this chapter is original and shorter proof of an important theorem which solves a dichotomy conjecture for CSP problem on undirected graphs. en_US
dc.description.provenance Submitted by Slavisha Milisavljevic (slavisha) on 2022-05-11T13:08:14Z No. of bitstreams: 1 Ivan_teza20042022.pdf: 1428762 bytes, checksum: a3e042dba2e0d3ebb7c5deea780814e9 (MD5) en
dc.description.provenance Made available in DSpace on 2022-05-11T13:08:14Z (GMT). No. of bitstreams: 1 Ivan_teza20042022.pdf: 1428762 bytes, checksum: a3e042dba2e0d3ebb7c5deea780814e9 (MD5) Previous issue date: 2022-04 en
dc.language.iso sr en_US
dc.publisher Beograd en_US
dc.title UOPŠTENJA ŠATENOVIH NORMI GRAFOVA I KOMBINATORNE PRIMENE en_US
mf.author.birth-date 1988-02-29
mf.author.birth-place Beograd en_US
mf.author.birth-country Srbija en_US
mf.author.residence-state Srbija en_US
mf.author.citizenship Srpsko en_US
mf.author.nationality Srbin en_US
mf.subject.area Mathematics en_US
mf.subject.keywords Energy of graph, eigenvalues, singular values, Schatten norms, random graph, CSP problem. en_US
mf.subject.subarea Applied mathematics en_US
mf.contributor.committee Mateljević, Miodrag
mf.contributor.committee Jocić, Danko
mf.contributor.committee Stanić, Zoran
mf.contributor.committee Erić, Aleksandra
mf.university.faculty Mathematical faculty en_US
mf.document.references 65 en_US
mf.document.pages 92 en_US
mf.document.location Beograd en_US
mf.document.genealogy-project No en_US
mf.university Belgrade University en_US

Files in this item

Files Size Format View
Ivan_teza20042022.pdf 1.428Mb PDF View/Open

This item appears in the following Collection(s)

Show simple item record