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Geometric Methods in Physics XXXVII

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Cover of 'Geometric Methods in Physics XXXVII'

Table of Contents

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    Book Overview
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    Chapter 1 On canonical parametrization of phase spaces of Isomonodromic Deformation Equations
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    Chapter 2 On some deformations of the Poisson structure associated with the algebroid bracket of differential forms
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    Chapter 3 Generation of Painlevé V transcendents
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    Chapter 4 Hamiltonian Dynamics for the Kepler Problem in a Deformed Phase Space
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    Chapter 5 Notes on integrable motion of two interacting curves and two-layer generalized Heisenberg ferromagnet equations
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    Chapter 6 About the solutions to the Witten—Dijkgraaf— Verlinde—Verlinde associativity equations and their Lie-algebraic and geometric properties
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    Chapter 7 2+2-Moulton Configuration – rigid and flexible
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    Chapter 8 Melnikov functions in the rigid body dynamics
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    Chapter 9 E(2)-covariant integral quantization of the motion on the circle and its classical limit
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    Chapter 10 On Deformation Quantization using Super Twistorial Double Fibration
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    Chapter 11 Deformation Quantization of Commutative Families and Vector Fields
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    Chapter 12 Co-Toeplitz Quantization: A Simple Case
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    Chapter 13 On the quantum flag manifold $${{SU}_{q}} (3)/{\mathbb{T}^2}$$
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    Chapter 14 A Hopf algebra without a modular pair in involution
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    Chapter 15 Hopf–Rinow theorem in Grassmann manifolds of C ∗ -algebras
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    Chapter 16 Short geodesics for Ad invariant metrics in locally exponential Lie groups
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    Chapter 17 On Conjugacy of Subalgebras of Graph C ∗ -Algebras
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    Chapter 18 A Direct Proof for an Eigenvalue Problem by Counting Lagrangian Submanifolds
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    Chapter 19 Applications of the Fundamental Theorems of Projective and Affine Geometry in Physics
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    Chapter 20 Modeling the dynamics of a charged drop of a viscous liquid
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    Chapter 21 The orthogonal systems of functions on lattices of SU(n + 1), n < ∞
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    Chapter 22 The Super Orbit Challenge
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    Chapter 23 Weighted generalization of the Szegö kernel and how it can be used to prove general theorems of complex analysis
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    Chapter 24 Amenability, flatness and measure algebras
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    Chapter 25 Functional Analysis techniques in Optimization and Metrization problems
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    Chapter 26 Twistor Geometry and Gauge Fields
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    Chapter 27 Quantum Dirichlet forms and their recent applications
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    Chapter 28 Lagrangian approach to Geometric Quantization
Attention for Chapter 23: Weighted generalization of the Szegö kernel and how it can be used to prove general theorems of complex analysis
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Chapter title
Weighted generalization of the Szegö kernel and how it can be used to prove general theorems of complex analysis
Chapter number 23
Book title
Geometric Methods in Physics XXXVII
Published by
Birkhäuser, Cham, January 2019
DOI 10.1007/978-3-030-34072-8_23
Book ISBNs
978-3-03-034071-1, 978-3-03-034072-8
Authors

Piotr Kielanowski, Anatol Odzijewicz, Emma Previato