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An inverse problem for an inhomogeneous conformal Killing field equation
Authors:Ziqi Sun
Affiliation:Department of Mathematics, Wichita State University, Wichita, Kansas 67260-0033
Abstract:Let $g$ be a $C^{2,alpha}$ Riemannian metric defined on a bounded domain $Omegasubset R^2$ with $C^{3,alpha}$ boundary and let $X$be a $C^{2,alpha}$ vector field on $bar{Omega}$ satisfying $Xvert _{partialOmega}=0$. We show that if $l$ is a gradient field of a solution $u$ to the equation $triangle_gu-bigllanglenabla_{g,}sigma,,nabla_gubigrrangle_g=0$ on $Omega$, then both inner products $bigllangle l,Xbigrrangle_g,$ and $bigllangle l^perp,Xbigrrangle_g,$ are uniquely determined by the restriction of the tensor ${mathcal L}_X(g)-(e^sigma,nabla_{g}cdot(e^{-sigma}X)) g$ to the gradient field $l$, where ${mathcal L}_X(g)$ is the Lie derivative of the metric tensor $g$ under the vector field $X$ and $sigma=logsqrt{det(g)}$. This work solves a problem related to an inverse boundary value problem for nonlinear elliptic equations.

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