From Fourier Analysis and Number Theory to Radon Transforms and Geometry

Table of Contents

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   Book Overview
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   Chapter 1 Differences of Partition Functions: The Anti-telescoping Method
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   Chapter 2 The Extremal Plurisubharmonic Function for Linear Growth
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   Chapter 3 Mahonian Partition Identities via Polyhedral Geometry
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   Chapter 4 Second-Order Modular Forms with Characters
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   Chapter 5 Disjointness of Moebius from Horocycle Flows
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   Chapter 6 Duality and Differential Operators for Harmonic Maass Forms
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   Chapter 7 Function Theory Related to the Group PSL2(ℝ)
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   Chapter 8 Analysis of Degenerate Diffusion Operators Arising in Population Biology
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    Chapter 9 A Matrix Related to the Theorem of Fermat and the Goldbach Conjecture
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    Chapter 10 Continuous Solutions of Linear Equations
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    Chapter 11 Recurrence for Stationary Group Actions
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    Chapter 12 On the Honda - Kaneko Congruences
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    Chapter 13 Some Intrinsic Constructions on Compact Riemann Surfaces
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    Chapter 14 The Parallel Refractor
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    Chapter 15 On a Theorem of N. Katz and Bases in Irreducible Representations
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    Chapter 16 Vector-Valued Modular Forms with an Unnatural Boundary
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    Chapter 17 Loss of Derivatives
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    Chapter 18 On an Oscillatory Result for the Coefficients of General Dirichlet Series
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    Chapter 19 Representation Varieties of Fuchsian Groups
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    Chapter 20 Two Embedding Theorems
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    Chapter 21 Cubature Formulas and Discrete Fourier Transform on Compact Manifolds
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    Chapter 22 The Moment Zeta Function and Applications
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    Chapter 23 A Transcendence Criterion for CM on Some Families of Calabi–Yau Manifolds
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    Chapter 24 Ehrenpreis and the Fundamental Principle
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    Chapter 25 Minimal Entire Functions
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    Chapter 26 A Conjecture by Leon Ehrenpreis About Zeroes of Exponential Polynomials
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    Chapter 27 The Discrete Analog of the Malgrange–Ehrenpreis Theorem
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    Chapter 28 The Legacy of Leon Ehrenpreis