JP Journal of Geometry and Topology
Volume 7, Issue 1, Pages 1 - 22
(March 2007)
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INTEGRAL REPRESENTATIONS OF SOLUTIONS TO THE SUB-LAPLACE EQUATIONS BY TWISTOR THEORY
Yoshinori Machida (Japan)
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Abstract: Twistor integral representations of solutions to the Laplace
equation on the complex space
endowed with a standard flat complex Riemannian metric, are well-known. In the
case of the odd-dimensional complex space
we have analogous results to [1]. In this
paper, we extend the results above to that of the sub-Laplace equation on
with the contact structure, regarded as the Heisenberg group |
Keywords and phrases: sub-Laplacian, sub-Riemannian geometry, Heisenberg group, contact structure, twistor theory. |
Communicated by Johann Davidov |
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