Fourier Transforms of Positive Definite Kernels and the Riemann $$\xi $$ ξ -Function
Copyright policy )Fourier Transforms of Positive Definite Kernels and the Riemann $$\xi $$ ξ -Function
The purpose of this paper is to investigate the distribution of zeros of entire functions which can be represented as the Fourier transforms of certain admissible kernels. The principal results bring to light the intimate connection between the Bochner-Khinchin-Mathias theory of positive definite kernels and the generalized real Laguerre inequalities. The concavity and convexity properties of the Jacobi theta function play a prominent role throughout this work. The paper concludes with several questions and open problems.
- National Oceanic and Atmospheric Administration United States
- University of Hawaii System United States
- University of Hawaiʻi Sea Grant United States
- University of Hawaii at Manoa United States
Mathematics - Complex Variables, Mathematics - Classical Analysis and ODEs, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Complex Variables (math.CV)
Mathematics - Complex Variables, Mathematics - Classical Analysis and ODEs, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Complex Variables (math.CV)
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