Special Session 134: Recent advances in wavelet analysis, PDEs and dynamical systems - part II

Extension of wavelets/PDEs to topologically complicated domains
Mani Mehra
Department of Mathematics, Indian Institute of Technology Delhi, IITD, India
India
Co-Author(s):    
Abstract:
Differential equations on topologically complicated domains is a relatively new branch in the theory of differential equations. Some of the examples include differential equations on manifolds or irregularly shaped domains and differential equation on network-like structure. Differential equations on manifolds arises in the areas of mathematical physics, fluid dynamics, image processing, medical imaging etc.. Differential equations on network-like structure also play a fundamental role in many problems in science and engineering. The aim of this talk is to show how wavelets could be extended to network to solve partial differential equations on network like structure using spectral graph wavelet.