Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection

We study the Kuramoto-Sivashinsky equation (KSE) in scalar form on the two-dimensional torus with and without advection by an incompressible vector field. We prove local existence of mild solutions for arbitrary data in L2. We then study the issue of global existence. We prove global existence for the KSE in the presence of advection for arbitrary data, provided the advecting velocity field *v** satisfies certain conditions that ensure the dissipation time of the associated hyperdiffusion-advection equation is sufficiently small. In the absence of advection, global existence can be shown only if the linearized operator does not admit any growing mode and for sufficiently small initial data.

This is an Accepted Manuscript of an article published by Taylor & Francis in Communications in Partial Differential Equations on 2021-09-08, available online: https://www.tandfonline.com/10.1080/03605302.2021.1975131.

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Work Title Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection
Access
Open Access
Creators
  1. Yuanyuan Feng
  2. Anna L. Mazzucato
License CC BY-NC 4.0 (Attribution-NonCommercial)
Work Type Article
Publisher
  1. Informa UK Limited
Publication Date September 8, 2021
Publisher Identifier (DOI)
  1. 10.1080/03605302.2021.1975131
Source
  1. Communications in Partial Differential Equations
Deposited June 17, 2022

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  • Created
  • Added ScalarKSE-1.pdf
  • Added Creator Yuanyuan Feng
  • Added Creator Anna L. Mazzucato
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  • Updated Work Title, Description Show Changes
    Work Title
    • Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection
    • ! Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection
    Description
    • We study the Kuramoto-Sivashinsky equation (KSE) in scalar form on the two-dimensional torus with and without advection by an incompressible vector field. We prove local existence of mild solutions for arbitrary data in L*2. We then study the issue of global existence. We prove global existence for the KSE in the presence of advection for arbitrary data, provided the advecting velocity field **v** satisfies certain conditions that ensure the dissipation time of the associated hyperdiffusion-advection equation is sufficiently small. In the absence of advection, global existence can be shown only if the linearized operator does not admit any growing mode and for sufficiently small initial data.
    • We study the Kuramoto-Sivashinsky equation (KSE) in scalar form on the two-dimensional torus with and without advection by an incompressible vector field. We prove local existence of mild solutions for arbitrary data in L*2. We then study the issue of global existence. We prove global existence for the KSE in the presence of advection for arbitrary data, provided the advecting velocity field **v** satisfies certain conditions that ensure the dissipation time of the associated hyperdiffusion-advection equation is sufficiently small. In the absence of advection, global existence can be shown only if the linearized operator does not admit any growing mode and for sufficiently small initial data.
  • Updated Work Title Show Changes
    Work Title
    • ! Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection
    • Global existence for the two-dimensional Kuramoto-sivashinsky equation with advection
  • Updated