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Hauptverfasser: Agarwal, Shivani, Mantzavinos, Dionyssios
Format: Preprint
Veröffentlicht: 2026
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Online-Zugang:https://arxiv.org/abs/2605.14335
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author Agarwal, Shivani
Mantzavinos, Dionyssios
author_facet Agarwal, Shivani
Mantzavinos, Dionyssios
contents We prove the local Hadamard well-posedness of the ``good'' Boussinesq equation formulated on the half-line with nonzero Robin boundary conditions. These boundary data involve the Dirichlet and Neumann boundary values as well as the second spatial derivative of the solution evaluated at the boundary. The nonlinear analysis crucially relies on the linear estimates established through the explicit solution formula obtained for the forced linear counterpart of the problem via Fokas's unified transform. The two pieces of initial data and the two pieces of boundary data belong in appropriate Sobolev spaces. The corresponding solution is established in the natural Hadamard solution space of continuous/continuously differentiable functions from a suitable time interval to the Sobolev spaces associated with the two initial data. Furthermore, in line with the well-posedness theory of the Cauchy problem, in the case of low regularity (namely, below the spatial continuity threshold) the solution space is refined by also including an appropriate spatiotemporal Lebesgue space.
format Preprint
id arxiv_https___arxiv_org_abs_2605_14335
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle The "good" Boussinesq equation on the half-line with Robin boundary conditions
Agarwal, Shivani
Mantzavinos, Dionyssios
Analysis of PDEs
35Q55, 35G31, 35G16
We prove the local Hadamard well-posedness of the ``good'' Boussinesq equation formulated on the half-line with nonzero Robin boundary conditions. These boundary data involve the Dirichlet and Neumann boundary values as well as the second spatial derivative of the solution evaluated at the boundary. The nonlinear analysis crucially relies on the linear estimates established through the explicit solution formula obtained for the forced linear counterpart of the problem via Fokas's unified transform. The two pieces of initial data and the two pieces of boundary data belong in appropriate Sobolev spaces. The corresponding solution is established in the natural Hadamard solution space of continuous/continuously differentiable functions from a suitable time interval to the Sobolev spaces associated with the two initial data. Furthermore, in line with the well-posedness theory of the Cauchy problem, in the case of low regularity (namely, below the spatial continuity threshold) the solution space is refined by also including an appropriate spatiotemporal Lebesgue space.
title The "good" Boussinesq equation on the half-line with Robin boundary conditions
topic Analysis of PDEs
35Q55, 35G31, 35G16
url https://arxiv.org/abs/2605.14335