Asymptotic Completeness, Global Existence and the Infrared Problem for the Maxwell-Dirac Equations (Memoirs of the American Mathematical Society) Buy on Amazon
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Asymptotic Completeness, Global Existence and the Infrared Problem for the Maxwell-Dirac Equations (Memoirs of the American Mathematical Society)

Book Details
Author(s) Flato, M.
ISBN / ASIN 0821806831
ISBN-13 9780821806838
Sales Rank #10,954,733
Marketplace United States 🇺🇸
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Description
The purpose of this work is to present and give full proofs of new original research results concerning integration of and scattering for the classical Maxwell-Dirac equations. These equations govern first quantized electrodynamics and are the starting point for a rigorous formulation of quantum electrodynamics. The presentation is given within the formalism of nonlinear group and Lie algebra representations, i.e. the powerful new approach to nonlinear evolution equations covariant under a group action.

The authors prove that the nonlinear Lie algebra representation given by the manifestly covariant Maxwell-Dirac equations is integrable to a global nonlinear representation of the Poincaré group on a differentiable manifold of small initial conditions. This solves, in particular, the small-data Cauchy problem for the Maxwell-Dirac equations globally in time. The existence of modified wave operators and asymptotic completeness is proved. The asymptotic representations (at infinite time) turn out to be nonlinear. A cohomological interpretation of the results in the spirit of nonlinear representation theory and its connection to the infrared tail of the electron are developed.

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