PRACTICAL MATHEMATICS Theory and Practice w/ Applications to

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Modern geometry has multiple strong bonds with physics, exemplified by the ties between Riemannian geometry and general relativity. The theory of partial differential equations at Columbia is practically indistinguishable from its analytic, geometric, or physical contexts: the d-bar-equation from several complex variables and complex geometry, real and complex Monge-Ampère equations from differential geometry and applied mathematics, Schrodinger and Landau-Ginzburg equations from mathematical physics, and especially the powerful theory of geometric evolution equations from topology, algebraic geometry, general relativity, and gauge theories of elementary particle physics.

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Publisher: Education Pty, Limited; Unknown edition (1945)


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