Editors:
- Highlights applications of enumerative combinatorics to varieties, Young tableaux, partitions, queueing theory, tiling and graph theory
- Presents recent methods in lattice path combinatorics
- Discusses a wide breadth of topics and applications
- Presents stimulating ideas of some of the exciting newcomers to the Lattice Path Combinatorics Conference series
Part of the book series: Developments in Mathematics (DEVM, volume 58)
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Table of contents (17 chapters)
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Front Matter
About this book
The most recent methods in various branches of lattice path and enumerative combinatorics along with relevant applications are nicely grouped together and represented in this research contributed volume. Contributions to this edited volume will be mainly research articles however it will also include several captivating, expository articles (along with pictures) on the life and mathematical work of leading researchers in lattice path combinatorics and beyond. There will be four or five expository articles in memory of Shreeram Shankar Abhyankar and Philippe Flajolet and honoring George Andrews and Lajos Takács. There may be another brief article in memory of Professors Jagdish Narayan Srivastava and Joti Lal Jain.
New research results include the kernel method developed by Flajolet and others for counting different classes of lattice paths continues to produce new results in counting lattice paths. The recent investigation of Fishburn numbers has led to interesting counting interpretations and a family of fascinating congruences. Formulas for new methods to obtain the number of Fq-rational points of Schubert varieties in Grassmannians continues to have research interest and will be presented here. Topics to be included are far reaching and will include lattice path enumeration, tilings, bijections between paths and other combinatoric structures, non-intersecting lattice paths, varieties, Young tableaux, partitions, enumerative combinatorics, discrete distributions, applications to queueing theory and other continuous time models, graph theory and applications. Many leading mathematicians who spoke at the conference from which this volume derives, are expected to send contributions including. This volume also presents the stimulating ideas of some exciting newcomers to the Lattice Path Combinatorics Conference series; “The 8th Conference on Lattice Path Combinatorics and Applications” provided opportunities for new collaborations; some of the products of these collaborations will also appear in this book.
This book will have interest for researchers in lattice path combinatorics and enumerative combinatorics. This will include subsets of researchers in mathematics, statistics, operations research and computer science. The applications of the material covered in this edited volume extends beyond the primary audience to scholars interested queuing theory, graph theory, tiling, partitions, distributions, etc. An attractive bonus within our book is the collection of special articles describing the top recent researchers in this area of study and documenting the interesting history of who, when and how these beautiful combinatorial results were originally discovered.
Editors and Affiliations
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Department of Mathematics, The Pennsylvania State University, University Park, USA
George E. Andrews
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Fakultät für Mathematik, Universität Wien, Vienna, Austria
Christian Krattenthaler
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Department of Mathematics and Statistics, California State Polytechnic University, Pomona, Pomona, USA
Alan Krinik
Bibliographic Information
Book Title: Lattice Path Combinatorics and Applications
Editors: George E. Andrews, Christian Krattenthaler, Alan Krinik
Series Title: Developments in Mathematics
DOI: https://doi.org/10.1007/978-3-030-11102-1
Publisher: Springer Cham
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer Nature Switzerland AG 2019
Hardcover ISBN: 978-3-030-11101-4Published: 15 March 2019
eBook ISBN: 978-3-030-11102-1Published: 02 March 2019
Series ISSN: 1389-2177
Series E-ISSN: 2197-795X
Edition Number: 1
Number of Pages: XXV, 418
Number of Illustrations: 84 b/w illustrations, 44 illustrations in colour
Topics: Combinatorics, Number Theory, Graph Theory, Convex and Discrete Geometry, Probability Theory and Stochastic Processes