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Applications of Lie groups to differential equations Peter J. Olver
Publisher: Springer-Verlag

Pseudo-Differential Operators and Symmetries . Krasovsky, Brunel and Imperial college: Toeplitz determinants and their applications. Sub Riemannian geometric analysis in Lie groups is an and are described through vector fields. Applebaum, Sheffield: Spectral properties of semigroups of measures on Lie groups. Roeckner, Bielefeld: Self-organized criticality via stochastic partial differential equations. Pistorius, Imperial College: Maximum increments of random walks and M. GALA defined, from a purely mathematical point of view, the main properties of the objects of the space, with instruments of Sub-Riemannian differential geometry, anisotropic partial differential equations of sub-elliptic and ultra-parabolic type and geometric measure theory in Lie groups. Applications of Lie groups to differential equations - Peter J. Chafai, Toulouse: Spectral analysis of large random Markov chains D. Applications of Lie groups to differential equations MCde. Download Applications of Lie groups to differential equations MCde. An Introduction to the Uncertainty Principle: Hardy's Theorem on. Applications of Lie Groups to Differential Equations. GALA provided tools for applications to vision and hearing and to magnetic resonance tomography.