Email this article Resolvent Kernels of Self-Adjoint Extensions of the Laplace Operator on the Subspace of Solenoidal Vector Functions
- Authors: Bolokhov T.A.1
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Affiliations:
- St.Petersburg Department of Steklov Institute of Mathematics
- Issue: Vol 243, No 6 (2019)
- Pages: 835-840
- Section: Article
- URL: https://journals.rcsi.science/1072-3374/article/view/243169
- DOI: https://doi.org/10.1007/s10958-019-04582-6
- ID: 243169
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Abstract
The Laplace operator on the subspace of solenoidal vector functions of three variables vanishing at the origin together with first derivatives is a symmetric operator with deficiency indices (3). Krein’s theory allows one to derive an expression for the resolvent kernel of a self-adjoint extension of the operator in question as a sum of the Green’s function of the vector Laplace operator and some additional kernel of finite rank.
About the authors
T. A. Bolokhov
St.Petersburg Department of Steklov Institute of Mathematics
Author for correspondence.
Email: timur@pdmi.ras.ru
Russian Federation, St.Petersburg
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