Cecilia Y. Wang scite author profile

Abstract. Harmonic functions cannot change rapidly. For example, if K is a compact subset of a Rie mann surface R and {"} a family of harmonic functions u on R of nonconstant sign on K, then it is known that there exists a constant q G (0, 1) independent of u such that max^lul < q supÄ |u| for all u G {u}. In the present note we shall show that relations expressing such "stiffness" of harmonic functions can also be given for the Dirichlet norm and for the partial derivative with respect to the Green's function.

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Stiffness of Harmonic Functions

Wang¹

1979

Proceedings of the American Mathematical Society

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Identification of a dissipative transport system

Wang

1998

Applied Mathematics and Computation

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Cecilia Y. Wang

A biharmonic kernel function

Stiffness of harmonic functions

Stiffness of Harmonic Functions

Identification of a dissipative transport system

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