Cambridge tracts in mathematics, 73, x, 172

Book

2009, Graduate studies in mathematics, ISBN 9780821849156, Volume 108, x, 244

Book

1978, ISBN 0521216141, Volume 73., x, 172

Book

2003, De Gruyter series in nonlinear analysis and applications, ISBN 3110175509, Volume 8, xix, 361

Book

Croatica Chemica Acta, ISSN 0011-1643, 12/2013, Volume 86, Issue 4, pp. 351 - 361

The degree of a vertex of a molecular graph is the number of first neighbors of this vertex. A large number of molecular-graph-based structure descriptors...

Vertex-degree-based topological index | Topological index | Chemical graph theory | Molecular graph | Molecular structure descriptor | molecular structure descriptor | BENZENOID SYSTEMS | GEOMETRIC-ARITHMETIC INDEX | ABC INDEX | ATOM-BOND CONNECTIVITY | MOLECULAR CONNECTIVITY | CHEMISTRY, MULTIDISCIPLINARY | topological index | COORDINATION-COMPOUNDS | vertex-degree-based topological index | UNIFIED APPROACH | VARIABLE ZAGREB INDEXES | molecular graph | chemical graph theory | GENERAL RANDIC INDEX | UNICYCLIC GRAPHS | Graph theory | Research | Topology | Mathematical research | Algebraic topology | Graphs | Molecular chemistry

Vertex-degree-based topological index | Topological index | Chemical graph theory | Molecular graph | Molecular structure descriptor | molecular structure descriptor | BENZENOID SYSTEMS | GEOMETRIC-ARITHMETIC INDEX | ABC INDEX | ATOM-BOND CONNECTIVITY | MOLECULAR CONNECTIVITY | CHEMISTRY, MULTIDISCIPLINARY | topological index | COORDINATION-COMPOUNDS | vertex-degree-based topological index | UNIFIED APPROACH | VARIABLE ZAGREB INDEXES | molecular graph | chemical graph theory | GENERAL RANDIC INDEX | UNICYCLIC GRAPHS | Graph theory | Research | Topology | Mathematical research | Algebraic topology | Graphs | Molecular chemistry

Journal Article

1992, ISBN 0821825429, Volume no. 481., ix, 179

Book

2006, Series in mathematical analysis and applications, ISBN 158488648X, Volume 10, 221

Book

1997, Progress in nonlinear differential equations and their applications, ISBN 3764338865, Volume 27, vi, 601

Book

1986, ISBN 0821815229, Volume no. 23., vi, 242

Book

1995, Cambridge tracts in mathematics, ISBN 0521444748, Volume 117., x, 240

This book describes many new results and extensions of the theory of generalised topological degree for densely defined A-proper operators and presents...

Topological degree | Boundary value problems

Topological degree | Boundary value problems

Book

1995, Oxford lecture series in mathematics and its applications, ISBN 9780198511960, Volume 2., viii, 211

Book

Linear Algebra and Its Applications, ISSN 0024-3795, 10/2018, Volume 554, pp. 185 - 204

Let be a simple graph of order and size , with vertex set , without isolated vertices and sequence of vertex degrees , . If the vertices and are adjacent, we...

Energy (of graph) | Vertex-degrees | Topological indices | MATHEMATICS, APPLIED | ATOM-BOND CONNECTIVITY | LAPLACIAN ENERGY | EXTENDED ADJACENCY MATRIX | RANDIC ESTRADA INDEX | MATHEMATICS | UPPER-BOUNDS | MOLECULAR-ORBITALS | SPECTRAL-RADIUS | TOPOLOGICAL INDEXES | ALKANES

Energy (of graph) | Vertex-degrees | Topological indices | MATHEMATICS, APPLIED | ATOM-BOND CONNECTIVITY | LAPLACIAN ENERGY | EXTENDED ADJACENCY MATRIX | RANDIC ESTRADA INDEX | MATHEMATICS | UPPER-BOUNDS | MOLECULAR-ORBITALS | SPECTRAL-RADIUS | TOPOLOGICAL INDEXES | ALKANES

Journal Article

Fuzzy Sets and Systems, ISSN 0165-0114, 09/2014, Volume 251, pp. 1 - 22

Based on completely distributive lattices and , we define the degrees of compactness of -fuzzy convergence spaces, -fuzzy topological spaces, -fuzzy...

[formula omitted]-fuzzy pseudo-quasi-metric | [formula omitted]-fuzzy topology | Pointwise [formula omitted]-fuzzy quasi-uniformity | Compactness | [formula omitted]-fuzzy convergence space | (L, M) -fuzzy topology | (L, M) -fuzzy convergence space | Pointwise (L, M) -fuzzy quasi-uniformity | (L, M) -fuzzy pseudo-quasi-metric | Pointwise (L, M)-fuzzy quasi-uniformity | MATHEMATICS, APPLIED | LIMIT SPACES | AXIOMS | (L, M)-fuzzy pseudo-quasi-metric | (L, M)-fuzzy convergence space | FUZZY TOPOLOGICAL-SPACES | STATISTICS & PROBABILITY | COMPUTER SCIENCE, THEORY & METHODS | COMPACTIFICATION | (L, M)-fuzzy topology | Theorems | Fuzzy set theory | Topology | Lattices | Convergence

[formula omitted]-fuzzy pseudo-quasi-metric | [formula omitted]-fuzzy topology | Pointwise [formula omitted]-fuzzy quasi-uniformity | Compactness | [formula omitted]-fuzzy convergence space | (L, M) -fuzzy topology | (L, M) -fuzzy convergence space | Pointwise (L, M) -fuzzy quasi-uniformity | (L, M) -fuzzy pseudo-quasi-metric | Pointwise (L, M)-fuzzy quasi-uniformity | MATHEMATICS, APPLIED | LIMIT SPACES | AXIOMS | (L, M)-fuzzy pseudo-quasi-metric | (L, M)-fuzzy convergence space | FUZZY TOPOLOGICAL-SPACES | STATISTICS & PROBABILITY | COMPUTER SCIENCE, THEORY & METHODS | COMPACTIFICATION | (L, M)-fuzzy topology | Theorems | Fuzzy set theory | Topology | Lattices | Convergence

Journal Article

Linear Algebra and its Applications, ISSN 0024-3795, 10/2018, Volume 554, p. 185

Let G=(V,E) be a simple graph of order n and size m, with vertex set V(G)={v1,v2,…,vn}, without isolated vertices and sequence of vertex degrees...

Topological manifolds | Upper bounds | Eigenvalues | Graphs | Mathematical functions | Graph theory | Eigen values

Topological manifolds | Upper bounds | Eigenvalues | Graphs | Mathematical functions | Graph theory | Eigen values

Journal Article

Applied Mathematics and Computation, ISSN 0096-3003, 05/2013, Volume 219, Issue 17, pp. 8973 - 8978

One of the general requirements for any topological index is that similar molecules have near-lying -values, which is referred to as “smoothness”. Curiously,...

Graphs | Topological indices | Structural graph analysis | MATHEMATICS, APPLIED | 1ST | BOUNDS | ATOM-BOND CONNECTIVITY | DESCRIPTORS | AUGMENTED ZAGREB INDEX | ALKANES

Graphs | Topological indices | Structural graph analysis | MATHEMATICS, APPLIED | 1ST | BOUNDS | ATOM-BOND CONNECTIVITY | DESCRIPTORS | AUGMENTED ZAGREB INDEX | ALKANES

Journal Article

Discrete Applied Mathematics, ISSN 0166-218X, 04/2016, Volume 203, pp. 217 - 225

A graph is called a cactus if each block of is either an edge or a cycle. Denote by the set of connected cacti possessing vertices and cycles. In a recent...

Degree resistance distance | Kirchhoff index | Resistance distance | Cactus | MATHEMATICS, APPLIED | ENERGY | DEGREE-KIRCHHOFF INDEX | REGULAR GRAPHS | FORMULA | MINIMUM | LOWER BOUNDS | RANDOM-WALKS | LATTICES | SUBDIVISIONS | TOPOLOGICAL INDEXES | Errors | Mathematical analysis | Cacti | Blocking | Paper | Graphs | Graph theory

Degree resistance distance | Kirchhoff index | Resistance distance | Cactus | MATHEMATICS, APPLIED | ENERGY | DEGREE-KIRCHHOFF INDEX | REGULAR GRAPHS | FORMULA | MINIMUM | LOWER BOUNDS | RANDOM-WALKS | LATTICES | SUBDIVISIONS | TOPOLOGICAL INDEXES | Errors | Mathematical analysis | Cacti | Blocking | Paper | Graphs | Graph theory

Journal Article

Bulletin of the Australian Mathematical Society, ISSN 0004-9727, 04/2013, Volume 87, Issue 2, pp. 255 - 271

Let G be a finite connected graph of order n, minimum degree delta and diameter d. The degree distance D'(G) of G is defined as Sigma({u,v}subset of V(G))(deg...

diameter | minimum degree | degree distance | GRAPH | MATHEMATICS | MOLECULAR TOPOLOGICAL INDEX | WIENER INDEX

diameter | minimum degree | degree distance | GRAPH | MATHEMATICS | MOLECULAR TOPOLOGICAL INDEX | WIENER INDEX

Journal Article

1979, ISBN 9780821816905, Volume no. 40., v, 122

Book

Applied Mathematics and Computation, ISSN 0096-3003, 06/2016, Volume 283, pp. 163 - 167

Let be a connected graph, and its vertices. By is denoted the degree of the vertex , by ( ) the (ordinary) distance of the vertices and , and by ( ) the...

Distance (in graph) | Wiener index | Degree distance | Steiner distance | MATHEMATICS, APPLIED | MOLECULAR TOPOLOGICAL INDEX | NUMBER | WIENER POLARITY INDEX | GRAPHS | UPPER-BOUNDS | RESPECT | SYSTEMS | VERTICES | Trees | Graphs | Mathematical models | Graph theory | Computation | Images

Distance (in graph) | Wiener index | Degree distance | Steiner distance | MATHEMATICS, APPLIED | MOLECULAR TOPOLOGICAL INDEX | NUMBER | WIENER POLARITY INDEX | GRAPHS | UPPER-BOUNDS | RESPECT | SYSTEMS | VERTICES | Trees | Graphs | Mathematical models | Graph theory | Computation | Images

Journal Article

Journal of Fluid Mechanics, ISSN 0022-1120, 10/2017, Volume 830, pp. 821 - 822

Considering first the flow structure at a small distance [formula omitted, refer to PDF] from the vortex axis [formula omitted, refer to PDF], although the...

Mathematical Foundations | Topological fluid dynamics | Vortex dynamics | Vortex Flows | Dynamical systems | Vortices

Mathematical Foundations | Topological fluid dynamics | Vortex dynamics | Vortex Flows | Dynamical systems | Vortices

Journal Article

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