Area-preserving mean curvature flow of rotationally symmetric hypersurfaces with free boundaries

Wang, Kunbo

doi:10.1007/s11425-015-5036-y

Sci. China Math.

2015

DOI: 10.1007/s11425-015-5036-y

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Area-preserving mean curvature flow of rotationally symmetric hypersurfaces with free boundaries

Kunbo Wang

Abstract: In this paper, we consider the area-preserving mean curvature flow with free Neumann boundaries. We show that for a rotationally symmetric n-dimensional hypersurface in R n+1 between two parallel hyperplanes will converge to a cylinder with the same area under this flow. We use the geometric properties and the maximal principle to obtain gradient and curvature estimates, leading to long-time existence of the flow and convergence to a constant mean curvature surface.

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2017

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Cited by 1 publication

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Spreading and vanishing in a West Nile virus model with expanding fronts

Tarboush¹,

Lin²,

Zhang³

2017

Sci. China Math.

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Abstract. In this paper, we study a simplified version of a West Nile virus model discussed by Lewis et al. [28], which was considered as a first approximation for the spatial spread of WNv. The basic reproduction number R 0 for the non-spatial epidemic model is defined and a threshold parameter R D 0 for the corresponding problem with null Dirichlet boundary condition is introduced. We consider a free boundary problem with coupled system, which describes the diffusion of birds by a PDE and the movement of mosquitoes by a ODE. The risk index R F 0 (t) associated with the disease in spatial setting is represented. Sufficient conditions for the WNv to eradicate or to spread are given. The asymptotic behavior of the solution to system when the spreading occurs are considered. It is shown that the initial number of infected populations, the diffusion rate of birds and the length of initial habitat exhibit important impacts on the vanishing or spreading of the virus. Numerical simulations are presented to illustrate the analytical results.MSC: primary: 35R35; secondary: 35K60

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Spreading and vanishing in a West Nile virus model with expanding fronts

Tarboush¹,

Lin²,

Zhang³

2017

Sci. China Math.

View full text Add to dashboard Cite

show abstract

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Area-preserving mean curvature flow of rotationally symmetric hypersurfaces with free boundaries

Cited by 1 publication

References 17 publications

Spreading and vanishing in a West Nile virus model with expanding fronts

Spreading and vanishing in a West Nile virus model with expanding fronts

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