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.
Asymptotic Completeness, Global Existence and the Infrared Problem for the Maxwell-Dirac Equations (Memoirs of the American Mathematical Society)
📄 Viewing lite version
Full site ›
Price not listed
🛒 Buy New on Amazon 🇺🇸
Book Details
Author(s)Flato, M.
PublisherAmer Mathematical Society
ISBN / ASIN0821806831
ISBN-139780821806838
Sales Rank10,954,733
MarketplaceUnited States 🇺🇸
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.