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Cauchy-Riemann differential equations of the spherical geometry

Subburathnam, J (Centre for Development of Advanced Computing, (C-DAC), India)
Friday 07 September 2012, 10:00-11:00

Seminar Room 2, Newton Institute Gatehouse


A system of PDEs relating to the transformation of the latitude- longitude parameterisation of the sphere was described in the work of F. Schmidt[Sch77]. This system of PDEs is known in the Meteorological literature as Cauchy-Riemann equations of the sphere. However the connection between this form of PDEs and the complex analytic function theory is not known to be reported. This talk will describe the connection between complex analytic function theory and the differential geometry of the sphere. A class of variable separable solutions of the C-R equations are useful in creating variable mesh configurations. One such solution had been applied to create a variable resolution global spectral method on the sphere[JNM12]. Complex function theory provides some useful insights on the types of variable resolution mesh configurations that can be generated on the sphere.


[JNM12] S. Janakiraman, Ravi S. Nanjundiah, and A.S. Vasudeva Murthy, A novel variable resolution global spectral method on the sphere, Journal of Computational Physics 231 (2012), no. 7, 2794  2810.

[Sch77] F. Schmidt, Variable ne mesh in spectral global models, Beiträge zur Physik der Atmosphäre 50 (1977), no. 12, 211  217.


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