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Well-posedness of the initial-boundary value problem for 1D degenerate quasilinear wave equations

Yanbo Hu, Yuusuke Sugiyama

2024Advances in Differential Equations14 citationsDOI

Abstract

In this paper, we study the local well-posedness of the initial-boundary value problem for the 1D quasilinear wave equation $$ \partial^2 _t u = \partial_x ( u^{2a} \partial_x u) + F(u)u_x $$ with the zero Dirichlet data on boundaries and the Levi condition on $F$. The boundary degeneracy causes losses in the principal part of the equation, which results in previous results only obtaining the estimates with loss of regularity. To overcome the main difficulty, we introduce singular weight functions to derive the estimates of preserving the initial regularity for the solution and its derivatives. The local existence and uniqueness for the degenerate initial-boundary value problem are established by applying the method of characteristic, the contraction mapping principle, and $L^\infty$ estimate with singular weight functions.

Topics & Concepts

MathematicsDegenerate energy levelsBoundary value problemMathematical analysisValue (mathematics)Wave equationInitial value problemApplied mathematicsPhysicsStatisticsQuantum mechanicsAdvanced Mathematical Physics ProblemsDifferential Equations and Boundary ProblemsGeotechnical and Geomechanical Engineering
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