On the mixed Cauchy problem with data on singular conics
Abstract
We consider a problem of mixed Cauchy type for certain holomorphic partial differential operators whose principal part Q2p(D) essentially is the (complex) Laplace operator to a power, p. We pose inital data on a singular conic divisor given by P=0, where P is a homogeneous polynomial of degree 2p. We show that this problem is uniquely solvable if the polynomial P is elliptic, in a certain sense, with respect to the principal part Q2p(D).
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