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Autore principale: Kosovtsov, Yu. N.
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2308.12081
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author Kosovtsov, Yu. N.
author_facet Kosovtsov, Yu. N.
contents The paper establishes conditions under which there are exact linear representations of nonlinear partial differential equations (Cauchy problems). By introducing a certain linear operator $A$, it is shown that under these conditions there are three equivalent equations (one linear and two nonlinear), while the formal operator solution is common for all of them and is the expansion of the desired function $v(t,x)$ into a formal Taylor series. Using the Borel-Whitney lemma, which states that any smooth function $v(t,x)$ in a neighborhood of a point is defined by its formal Taylor series, we obtain the following statement. If all parameters of the operator $A$ are smooth functions, then there exists a smooth function $\tilde{v}(t,x)$, which for $t=0$ has the same power expansion as $v(t,x) $ and this function solves all equivalent equations. The Navier-Stokes and Euler equations are considered as a non-trivial examples of this approach.
format Preprint
id arxiv_https___arxiv_org_abs_2308_12081
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Exact linear representations of the nonlinear Cauchy problems and their smooth solutions
Kosovtsov, Yu. N.
Mathematical Physics
The paper establishes conditions under which there are exact linear representations of nonlinear partial differential equations (Cauchy problems). By introducing a certain linear operator $A$, it is shown that under these conditions there are three equivalent equations (one linear and two nonlinear), while the formal operator solution is common for all of them and is the expansion of the desired function $v(t,x)$ into a formal Taylor series. Using the Borel-Whitney lemma, which states that any smooth function $v(t,x)$ in a neighborhood of a point is defined by its formal Taylor series, we obtain the following statement. If all parameters of the operator $A$ are smooth functions, then there exists a smooth function $\tilde{v}(t,x)$, which for $t=0$ has the same power expansion as $v(t,x) $ and this function solves all equivalent equations. The Navier-Stokes and Euler equations are considered as a non-trivial examples of this approach.
title Exact linear representations of the nonlinear Cauchy problems and their smooth solutions
topic Mathematical Physics
url https://arxiv.org/abs/2308.12081