FROM ALGEBRA TO ANALYSIS: NEW PROOFS OF THEOREMS BY RITT AND SEIDENBERG

D. Pavlov; G. Pogudin; Y. U.P. Razmyslov

doi:10.1090/proc/16065

FROM ALGEBRA TO ANALYSIS: NEW PROOFS OF THEOREMS BY RITT AND SEIDENBERG

D. Pavlov
, G. Pogudin
, Y. U.P. Razmyslov

Moscow State University

Research output: Contribution to journal › Article › peer-review

Abstract

Ritt’s theorem of zeroes and Siedenberg’s embedding theorem are classical results in differential algebra allowing to connect algebraic and model-theoretic results on nonlinear PDEs to the realm of analysis. However, the existing proofs of these results use sophisticated tools from constructive algebra (characteristic set theory) and analysis (Riquier’s existence theorem). In this paper, we give new short proofs for both theorems relying only on basic facts from differential algebra and the classical Cauchy-Kovalevskaya theorem for PDEs.

Original language	English
Pages (from-to)	5085-5095
Number of pages	11
Journal	Proceedings of the American Mathematical Society
Volume	150
Issue number	12
DOIs	https://doi.org/10.1090/proc/16065
Publication status	Published - 1 Dec 2022

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abstract = "Ritt{\textquoteright}s theorem of zeroes and Siedenberg{\textquoteright}s embedding theorem are classical results in differential algebra allowing to connect algebraic and model-theoretic results on nonlinear PDEs to the realm of analysis. However, the existing proofs of these results use sophisticated tools from constructive algebra (characteristic set theory) and analysis (Riquier{\textquoteright}s existence theorem). In this paper, we give new short proofs for both theorems relying only on basic facts from differential algebra and the classical Cauchy-Kovalevskaya theorem for PDEs.",

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FROM ALGEBRA TO ANALYSIS: NEW PROOFS OF THEOREMS BY RITT AND SEIDENBERG

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