Advances in Mathematical Physics (Jan 2016)

Mixed Initial-Boundary Value Problem for the Capillary Wave Equation

  • B. Juarez Campos,
  • Elena Kaikina,
  • Hector F. Ruiz Paredes

DOI
https://doi.org/10.1155/2016/7475061
Journal volume & issue
Vol. 2016

Abstract

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We study the mixed initial-boundary value problem for the capillary wave equation: iut+u2u=∂x3/2u, t>0, x>0; u(x,0)=u0(x), x>0; u(0,t)+βux(0,t)=h(t), t>0, where ∂x3/2u=(1/2π)∫0∞sign⁡x-y/x-yuyy(y) dy. We prove the global in-time existence of solutions of IBV problem for nonlinear capillary equation with inhomogeneous Robin boundary conditions. Also we are interested in the study of the asymptotic behavior of solutions.