New Topological Invariants for Real- And Angle-Valued Maps


An Alternative to Morse-Novikov Theory

This book is about new topological invariants of real- and angle-valued maps inspired by Morse–Novikov theory, a chapter of topology, which has recently raised interest outside of mathematics; for example, in data analysis, shape recognition, computer science and physics. They are the backbone of what the author proposes as a computational alternative to Morse–Novikov theory, referred to in this book as AMN-theory.

These invariants are on one side analogues of rest points, instantons and closed trajectories of vector fields and on the other side, refine basic topological invariants like homology and monodromy. They are associated to tame maps, considerably more general than Morse maps, that are defined on spaces which are considerably more general than manifolds. They are computable by computer implementable algorithms and have strong robustness properties. They relate the dynamics of flows that admit the map as "Lyapunov map" to the topology of the underlying space, in a similar manner as Morse–Novikov theory does.

Sample Chapter(s)
Chapter 1: Preview (1,034 KB)

  • Preview
  • Preparatory Material
  • Graph Representations
  • Barcodes and Jordan Blocks via Graph Representations
  • Configurations \delta_r^f and \hat{\delta}_r^f (Alternative Approach)
  • Configurations \gamma_r^f
  • Monodromy and Jordan Cells
  • Applications
  • Comments

Readership: Graduate students and researchers in geometry and topology, topologists, geometers, experts in dynamics, computer scientists and data analysts.


ISBN: 9789814618243
Cover Type: Hardcover
Page Count: 260
Year Published: 2017
Language: English

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