EMS Tracts in Mathematics (ETM)

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This series includes advanced texts and monographs covering all fields in pure and applied mathematics. The Tracts will give a reliable introduction and reference to special fields of current research. The books in the series will in most cases be authored monographs, although edited volumes may be published if appropriate. They are addressed to graduate students seeking access to research topics as well as to the experts in the field working at the frontier of research.

Edited by: Michael Farber (Queen Mary University of London, UK), Michael Röckner (Universität Bielefeld, Germany, and Purdue University, USA) and Alexander Varchenko (University of North Carolina at Chapel Hill, USA)

Published in this series:

  1. Daskalopoulos, Kenig: Degenerate Diffusions.
  2. Hofmann, Morris: The Lie Theory of Connected Pro-Lie Groups.
  3. Meyer: Local and Analytic Cyclic Homology.
  4. Harutyunyan, Schulze: Elliptic Mixed, Transmission and Singular Crack Problems.
  5. Feldman: Functional Equations and Characterization Problems on Locally Compact Abelian Groups.
  6. Novak, Woźniakowski: Tractability of Multivariate Problems.
  7. Triebel: Function Spaces and Wavelets on Domains.
  8. Albeverio et al.: The Statistical Mechanics of Quantum Lattice Systems.
  9. Böckle, Pink: Cohomological Theory of Crystals over Function Fields.
  10. Turaev: Homotopy Quantum Field Theory.
  11. Triebel: Bases in Function Spaces, Sampling, Discrepancy, Numerical integration.
  12. Novak, Woźniakowski: Tractability of Multivariate Problems.
  13. Bessières et al.: Geometrisation of 3-Manifolds.
  14. Börm: Efficient Numerical Methods for Non-local Operators.
  15. Brown, Higgins, Sivera: Nonabelian Algebraic Topology.
  16. Jarnicki, Pflug: Separately Analytic Functions.
  17. Björn, Björn: Nonlinear Potential Theory on Metric Spaces.
  18. Novak, Woźniakowski: Tractability of Multivariate Problems.
  19. Bojarski et al.: Infinitesimal Geometry of Quasiconformal and Bi-Lipschitz Mappings in the Plane.
  20. Triebel: Local Function Spaces, Heat and Navier–Stokes Equations.
  21. Nipp, Stoffer: Invariant Manifolds in Discrete and Continuous Dynamical Systems.
  22. Dehornoy et al.: Foundations of Garside Theory.
  23. Ponce: Elliptic PDEs, Measures and Capacities.
  24. Triebel: Hybrid Function Spaces, Heat and Navier-Stokes Equations.
  25. Cornulier, de la Harpe: Metric Geometry of Locally Compact Groups.
  26. Guedj, Zeriahi: Degenerate Complex Monge–Ampère Equations.
  27. Raymond: Bound States of the Magnetic Schrödinger Operator.
  28. Henrot, Pierre: Shape Variation and Optimization.
  29. Kosyak: Regular, Quasi-regular and Induced Representations of Infinite-dimensional Groups.
  30. Maz'ya: Boundary Behavior of Solutions to Elliptic Equations in General Domains.
  31. Gel'man, Maz'ya: Estimates for Differential Operators in Half-space.
  32. Kondō: $K3$ Surfaces.
  33. Repin, Sauter: Accuracy of Mathematical Models.