Effective uniform bounding in partial differential fields

James Freitag; Omar Sanchez

doi:10.1016/j.aim.2015.10.013

Effective uniform bounding in partial differential fields

James Freitag, Omar Sanchez

University of California, Berkeley

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Abstract

Motivated by the effective bounds found in [12] for ordinary differential equations, we prove an effective version of uniform bounding for fields with several commuting derivations. More precisely, we provide an upper bound for the size of finite solution sets of partial differential polynomial equations in terms of data explicitly given in the equations and independent of parameters. Our methods also produce an upper bound for the degree of the Zariski closure of solution sets, whether they are finite or not.

Original language	English
Pages (from-to)	308-336
Journal	Advances in Mathematics
Volume	288
Early online date	11 Nov 2015
DOIs	https://doi.org/10.1016/j.aim.2015.10.013
Publication status	Published - Jan 2016

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title = "Effective uniform bounding in partial differential fields",

abstract = "Motivated by the effective bounds found in [12] for ordinary differential equations, we prove an effective version of uniform bounding for fields with several commuting derivations. More precisely, we provide an upper bound for the size of finite solution sets of partial differential polynomial equations in terms of data explicitly given in the equations and independent of parameters. Our methods also produce an upper bound for the degree of the Zariski closure of solution sets, whether they are finite or not.",

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Effective uniform bounding in partial differential fields

Abstract

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