A Class of Conserved Surface Layer Integrals for Causal Variational Principles
classification
🧮 math-ph
gr-qchep-thmath.MP
keywords
causalvariationalclassconservedequationsintegralslayerprinciples
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In the theory of causal fermion systems, the physical equations are obtained as the Euler-Lagrange equations of a causal variational principle. Studying families of critical measures of causal variational principles, a class of conserved surface layer integrals is found and analyzed.
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Cited by 1 Pith paper
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Holographic Mixing and Fock Space Dynamics of Causal Fermion Systems
A limiting case of the causal action principle in causal fermion systems yields QED Fock space dynamics via stochastic fluctuating fields and dephasing, while introducing holographic mixing.
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