The density of integral points on hypersurfaces of degree at least four

Oscar Marmon

doi:10.4064/aa141-3-1

The density of integral points on hypersurfaces of degree at least four
Journal article, 2010

Let f be a polynomial of degree at least four with integer-valued coefficients. We establish new bounds for the density of integer solutions to the equation f=0, using an iterated version of Heath-Browns q-analogue of van der Corput's method of exponential sums.

van der Corput's method

integral points

Weyl differencing

Author

Oscar Marmon

Chalmers, Mathematical Sciences, Mathematics

University of Gothenburg

Other publications Research

Acta Arithmetica

0065-1036 (ISSN) 17306264 (eISSN)

Vol. 141 3 211-240

Subject Categories

Mathematics

DOI

10.4064/aa141-3-1

Publication data connected to DOI

More information

Created

10/6/2017

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The density of integral points on hypersurfaces of degree at least four Journal article, 2010