Rigid stationary determinantal processes in non-Archimedean fields
Abstract
Let F be a non-discrete non-Archimedean local field. For any subset S⊂ F with finite Haar measure, there is a stationary determinantal point process on F with correlation kernel 1S(x-y), where 1S is the Fourier transform of the indicator function 1S. In this note, we give a geometrical condition on the subset S, such that the associated determinantal point process is rigid in the sense of Ghosh and Peres. Our geometrical condition is very different from the Euclidean case.
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