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Annals of Mathematics, II. Series, Vol. 152, No. 2, pp. 645-658, 2000
EMIS ELibM Electronic Journals Annals of Mathematics, II. Series
Vol. 152, No. 2, pp. 645-658 (2000)

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Counting dimensions of $L$-harmonic functions

Peter Li and Jiaping Wang


Review from Zentralblatt MATH:

This paper deals with second order uniformly elliptic operators of divergence form defined on $R^n$ with measurable coefficients. The authors give estimates on the dimension of spaces of solutions that grow at most polynomially of degree $d$.

Reviewed by Dagmar Medková

Keywords: elliptic partial differential equation; polynomial grow

Classification (MSC2000): 35-99

Full text of the article:


Electronic fulltext finalized on: 8 Sep 2001. This page was last modified: 22 Jan 2002.

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