Numerical Analysis of the Causal Action Principle in Low Dimensions

Abstract: The numerical analysis of causal fermion systems is advanced by employing differentiable programming methods. The causal action principle for weighted counting measures is introduced for general values of the integer parameters f (the particle number), n (the spin dimension) and m (the number of spacetime points). In the case n = 1, the causal relations are clarified geometrically in terms of causal cones. Discrete Dirac spheres are introduced as candidates for minimizers for large m in the cases n = 1, f = 2 … Show more