Non-Local Classical Field Theory with Fractional Operators on S3 × R1 Space
Abstract
We present a theoretical framework on non-local classical field theory using fractional integrodifferential operators. Due to the lack of easily manageable symmetries in traditional fractional calculus and the difficulties that arise in the formalism of multi-fractional calculus over RD space, we introduce a set of new fractional operators over the S3 × R1 space. The redefined fractional integral operator results in the non-trivial measure canonically, and they can account for the spacetime symmetries for the underlying space S3 × R1 with the Lorentzian signature (+, -, -, -, -). We conclude that the field equation for the non-local classical field can be obtained as the consequence of the optimisation of the action by employing the non-local variations in the field after defining the non-local Lagrangian density, namely, L(φa(x), α φa(x)), as the function of the symmetric fractional derivative of the field, e.g. in the context of the kinetic term, and the field itself.
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