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98,79 €- International group of scholars.
- Emphasis on computational approaches to enduring mathematical questions.
- Examines the relationship between recent breakthroughs in algebra, geometry and topology.
Algebra, geometry and topology cover a variety of different, but intimately related research fields in modern mathematics. This book focuses on specific aspects of this interaction. The present volume contains refereed papers which were presented at the International Conference “Experimental and Theoretical Methods in Algebra, Geometry and Topology”, held in Eforie Nord (near Constanta), Romania, during 20-25 June 2013. The conference was devoted to the 60th anniversary of the distinguished Romanian mathematicians Alexandru Dimca and Stefan Papadima. The selected papers consist of original research work and a survey paper. They are intended for a large audience, including researchers and graduate students interested in algebraic geometry, combinatorics, topology, hyperplane arrangements and commutative algebra. The papers are written by well-known experts from different fields of mathematics, affiliated to universities from all over the word, they cover a broad range of topics and explore the research frontiers of a wide variety of contemporary problems of modern mathematics.
Table of contents (18 chapters)
1.Solving via Modular Methods
2.Lazarsfeld–Mukai Bundles and Applications: II
3.Multinets in
4.A More General Framework for CoGalois Theory
5.Connectivity and a Problem of Formal Geometry
6.Hodge Invariants of Higher-Dimensional Analogues of Kodaira Surfaces
7.An Invitation to Quasihomogeneous Rigid Geometric Structures
8.Koszul Binomial Edge Ideals
9.On the Fundamental Groups of Non-generic
10.Some Remarks on the Realizability Spaces of (3,4)-Nets
11.Critical Points of Master Functions and the mKdV Hierarchy of Type
12.Gauss–Lucas and Kuo–Lu Theorems
13.Fibonacci Numbers and Self-Dual Lattice Structures for Plane Branches
14.Four Generated, Squarefree, Monomial Ideals
15.The Connected Components of the Space of Alexandrov Surfaces
16.Motivic Milnor Fibre for Nondegenerate Function Germs on Toric Singularities
17.Non-Abelian Resonance: Product and Coproduct Formulas
18.Complements of Hypersurfaces, Variation Maps, and Minimal Models of Arrangements
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