Local well-posedness and blow-up for the half ginzburg-landau-kuramoto equation with rough coefficients and potential

Luigi Forcella; Kazumasa Fujiwara; Vladimir Georgiev; Tohru Ozawa

Local well-posedness and blow-up for the half ginzburg-landau-kuramoto equation with rough coefficients and potential

Luigi Forcella, Kazumasa Fujiwara, Vladimir Georgiev, Tohru Ozawa

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

Abstract

We study the Cauchy problem for the half Ginzburg-Landau-Kuramoto (hGLK) equation with the second order elliptic operator having rough coefficients and potential type perturbation. The blow-up of solutions for hGLK equation with non-positive nonlinearity is shown by an ODE argument. The key tools in the proof are appropriate commutator estimates and the essential self-adjointness of the symmetric uniformly elliptic operator with rough metric and potential type perturbation.

35Q40, 35Q55

Original language	English
Journal	Unknown Journal
Publication status	Published - 2018 Apr 7

Keywords

Blow-up
Commutator estimate
Fractional Ginzburg-Landau equation

ASJC Scopus subject areas

General

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title = "Local well-posedness and blow-up for the half ginzburg-landau-kuramoto equation with rough coefficients and potential",

abstract = "We study the Cauchy problem for the half Ginzburg-Landau-Kuramoto (hGLK) equation with the second order elliptic operator having rough coefficients and potential type perturbation. The blow-up of solutions for hGLK equation with non-positive nonlinearity is shown by an ODE argument. The key tools in the proof are appropriate commutator estimates and the essential self-adjointness of the symmetric uniformly elliptic operator with rough metric and potential type perturbation.35Q40, 35Q55",

keywords = "Blow-up, Commutator estimate, Fractional Ginzburg-Landau equation",

author = "Luigi Forcella and Kazumasa Fujiwara and Vladimir Georgiev and Tohru Ozawa",

year = "2018",

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language = "English",

journal = "Nuclear Physics A",

issn = "0375-9474",

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T1 - Local well-posedness and blow-up for the half ginzburg-landau-kuramoto equation with rough coefficients and potential

AU - Forcella, Luigi

AU - Fujiwara, Kazumasa

AU - Georgiev, Vladimir

AU - Ozawa, Tohru

PY - 2018/4/7

Y1 - 2018/4/7

N2 - We study the Cauchy problem for the half Ginzburg-Landau-Kuramoto (hGLK) equation with the second order elliptic operator having rough coefficients and potential type perturbation. The blow-up of solutions for hGLK equation with non-positive nonlinearity is shown by an ODE argument. The key tools in the proof are appropriate commutator estimates and the essential self-adjointness of the symmetric uniformly elliptic operator with rough metric and potential type perturbation.35Q40, 35Q55

AB - We study the Cauchy problem for the half Ginzburg-Landau-Kuramoto (hGLK) equation with the second order elliptic operator having rough coefficients and potential type perturbation. The blow-up of solutions for hGLK equation with non-positive nonlinearity is shown by an ODE argument. The key tools in the proof are appropriate commutator estimates and the essential self-adjointness of the symmetric uniformly elliptic operator with rough metric and potential type perturbation.35Q40, 35Q55

KW - Blow-up

KW - Commutator estimate

KW - Fractional Ginzburg-Landau equation

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JO - Nuclear Physics A

JF - Nuclear Physics A

SN - 0375-9474

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