What is he best known for?
The fields of study he is best known for:
- Graph theory
- Combinatorics
- Algorithm
His main research concerns Combinatorics, Discrete mathematics, Line graph, Indifference graph and Split graph.
Dragoš Cvetković studies Graph theory which is a part of Combinatorics.
His work on Pathwidth, 1-planar graph and Laplacian matrix as part of general Discrete mathematics research is frequently linked to Minimum rank of a graph, thereby connecting diverse disciplines of science.
He mostly deals with Symmetric graph in his studies of Line graph.
His Symmetric graph research incorporates themes from Comparability graph and Block graph.
His Indifference graph research includes elements of Global optimization and Chordal graph.
His most cited work include:
- Spectra of graphs : theory and application (1823 citations)
- An Introduction to the Theory of Graph Spectra (677 citations)
- Eigenspaces of graphs (442 citations)
What are the main themes of his work throughout his whole career to date?
Dragoš Cvetković mainly focuses on Combinatorics, Discrete mathematics, Line graph, Indifference graph and Pathwidth.
His Combinatorics study typically links adjacent topics like Eigenvalues and eigenvectors.
His studies examine the connections between Eigenvalues and eigenvectors and genetics, as well as such issues in Graph, with regards to Multiplicity.
Within one scientific family, he focuses on topics pertaining to Graph theory under Discrete mathematics, and may sometimes address concerns connected to Molecular orbital.
His Indifference graph study frequently draws connections between related disciplines such as Chordal graph.
Dragoš Cvetković interconnects Adjacency matrix and Algebraic connectivity in the investigation of issues within Voltage graph.
He most often published in these fields:
- Combinatorics (61.29%)
- Discrete mathematics (57.26%)
- Line graph (26.61%)
What were the highlights of his more recent work (between 2008-2021)?
- Discrete mathematics (57.26%)
- Combinatorics (61.29%)
- Graph spectra (9.68%)
In recent papers he was focusing on the following fields of study:
Dragoš Cvetković mostly deals with Discrete mathematics, Combinatorics, Graph spectra, Indifference graph and Chordal graph.
His study in Discrete mathematics is interdisciplinary in nature, drawing from both Spectral line and Laplace operator.
As part of his studies on Combinatorics, Dragoš Cvetković frequently links adjacent subjects like Spectrum.
His Graph spectra study also includes fields such as
- Theoretical computer science, which have a strong connection to Graph operations and Cubic graph,
- Graph and related Distance matrix, Hadamard product, Limit point and Independence number.
His studies deal with areas such as Modular decomposition and Pathwidth as well as Indifference graph.
Specifically, his work in Line graph is concerned with the study of Block graph.
Between 2008 and 2021, his most popular works were:
- An Introduction to the Theory of Graph Spectra (677 citations)
- Towards a spectral theory of graphs based on the signless Laplacian, I (218 citations)
- Towards a spectral theory of graphs based on the signless Laplacian, II (146 citations)
In his most recent research, the most cited papers focused on:
- Graph theory
- Combinatorics
- Algorithm
His primary scientific interests are in Discrete mathematics, Graph spectra, Theoretical computer science, Adjacency matrix and Combinatorics.
His study looks at the intersection of Graph spectra and topics like Cubic graph with Eigenvalues and eigenvectors.
His studies in Adjacency matrix integrate themes in fields like Graph theory and Graph energy.
His Graph theory research integrates issues from Structure, Linear algebra and Algebra.
His is involved in several facets of Combinatorics study, as is seen by his studies on Laplacian matrix, 1-planar graph, Modular decomposition and Pathwidth.
The concepts of his Laplacian matrix study are interwoven with issues in Strongly regular graph, Topological graph theory and Line graph.
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