We prove a function field analog of Weyl's classical theorem on
equidistribution of polynomial sequences. Our result covers the case when the
degree of the polynomial is greater than or equal to the characteristic of the
field, which is a natural barrier when applying the Weyl differencing process
to function fields. We also discuss applications to van der Corput and
intersective sets in function fields.Comment: 24 page

Hoang Le, Thai

Liu, Yu-Ru

Wooley, Trevor D.

English

arXiv

We provide a function field analog of Weyl's classical theorem on equidistribution of polynomial sequences. Our result covers the case in which the degree of the polynomial is greater than or equal to the characteristic of the field, which is a natural barrier when applying the Weyl differencing process to function fields. We also discuss applications to van der Corput, intersective and Glasner sets in function fields.NSERC Discovery Grant || NSF grants DMS-1854398, DMS-200154

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Equidistribution of Polynomial Sequences in Function Fields, with Applications

Le, Thai Hoang

arXiv.org e-Print Archive

Equidistribution of polynomial sequences in function fields, with
  applications

https://uwspace.uwaterloo.ca/bitstream/10012/20010/1/2023-equidistribution-ff.pdf

Equidistribution of polynomial sequences in function fields, with applications

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