On the uniqueness theorem of Holmgren

Abstract

We rereview the classical Cauchy-Kovalevskaya theorem and the related uniqueness theorem of Holmgren, in the simple setting of powers of the Laplacian and a smooth curve segment in the plane. As a local problem, the Cauchy-Kovalevskaya and Holmgren theorems supply a complete answer to the existence and uniqueness issues. Here, we consider a global uniqueness problem of Holmgren's type. Perhaps surprisingly, we obtain a connection with the theory of quadrature identities, which demonstrates that rather subtle algebraic properties of the curve come into play. For instance, if is the interior domain of an ellipse, and I is a proper arc of the ellipse ∂, then there exists a nontrivial biharmonic function u in which vanishes to degree three on I (i.e., all partial derivatives of u of order 2 vanish on I) if and only if the ellipse is a circle. Finally, we consider a three-dimensional case, and analyze it partially using analogues of the square of the 2X2 Cauchy-Riemann operator.