Dirichlet problems of a quasi-linear elliptic system
Abstract
We discuss the Dirichlet problem of the quasi-linear elliptic system eqnarray* -e-f(U)div(ef(U) U)+&1/2f'(U)| U|2&=0, in , & U|∂&=φ. eqnarray* Here a smooth bounded domain in Rn, f: RN R is a smooth function, U: RN is the unknown vector-valued function, φ: RN is a given vector-valued C2 function, f' is the gradient of the function f with respect to the variable U. Such problems arise in population dynamics and Differential Geometry. The difficulty of studying this problem is that this nonlinear elliptic system does not fit the usual growth condition in M.Giaquinta's book [G] and the natural working space H1 L∞() for the corresponding Euler-Lagrange functional does not fit the usual minimization or variational argument. We use the direct method on a convex subset of H1 L∞() to overcome these difficulties. Under a suitable assumption on the function f, we prove that there is at least one solution to this problem. We also give application of our result to the Dirichlet problem of harmonic maps into the standard sphere
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