Advances in applied combinatorics / edited by Stefano Spezia. - Oakville, Ontario : Arcler Press, c2020. - xvi, 473 pages ; illustrations

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Includes references and index.

Chapter 1 : Fractional Sums and Differences with Binomial Coefficients
Chapter 2 : The Identical Estimates of Spectral Norms for Circulant Matrices with Binomial Coefficients Combined with Fibonacci Numbers and Lucas Numbers Entries
Chapter 3 : Harmonic Numbers and Cubed Binomial Coefficients
Chapter 4 : A Generalization of a Combinatorial Identity by Chang and Xu
Chapter 5 : Total Dominator Chromatic Number of Paths, Cycles and Ladder Graphs
Chapter 6 : Modular Leech Trees of Orders at Most 8
Chapter 7 : Recursive Algorithms for Phylogenetic Tree Counting
Chapter 8 : A Note on Some Identities of Derangement Polynomials
Chapter 9 : A Rademacher Type Formula for Partitions and Overpartitions
Chapter 10 : On the Exponential Generating Function for Non-Backtracking Walks
Chapter 11 : On Sequences of Numbers and Polynomials Defined by Linear Recurrence Relations of Order 2
Chapter 12 : On the Partial Finite Sums of the Reciprocals of the Fibonacci
Chapter 13 : Shortest Augmenting Path for Online Matchings on Trees
Chapter 14 : Subgraph-augmented Path Embedding for semantic User search on Heterogeneous Social Network
Chapter 15 : A Hyrid Optimized Weighted Minimum Spanning tree for the Shortest Intrapath Selection in Wireless sensor Network
Chapter 16 : The Commuting Graph of the Symmetric Group S,,
Chapter 17 : Modeling Quantum Behavior in the Framework of Permulation Groups

Advances in Applied Combinatorics talks about the subject of binomial coefficients, permutations, the combinational proofs, the graph theory, derangements, partitions, linear recurrences, graph algorithms and permutation groups, to give a far-fetched insight on applied combinatorics. This book also discusses about the fractional sums and the differences, harmonic numbers and the cubed binomial coefficients, the recursive algorithms, linear recurrences and the fibonacci numbers. The generating functions and the sequence of numbers and polynomials.


In English text.




Engineering--Mathematical models.
Combinatorial.

EBOP QA 164 / A38 2020

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