1206.6040 (T. Ootsuka)
T. Ootsuka
A novel approach for Lagrange formulation for field theories is proposed in terms of Kawaguchi geometry (areal metric space). On the extended configuration space M for classical field theory composed of spacetime and field configuration space, one can define a geometrical structure called Kawaguchi areal metric K from the field Lagrangian and (M,K) can be regarded as Kawaguchi manifold. The geometrical action functional is given by K and the dynamics of field is determined by covariant Euler-Lagrange equation derived from the variational principle of the action. The solution to the equation becomes a minimal hypersurface on (M,K) which has the same dimension as spacetime. We propose that this hypersurface is what we should regard as our real spacetime manifold, while the usual way to understand spacetime is to consider it as the parameter spacetime (base manifold) of a fibre bundle. In this way, the dynamics of field and spacetime structure is unified by Kawaguchi geometry. The theory has the property of strong covariance, which means that it allows one to choose arbitrary parameter spacetime from the total extended configuration space. In other words, we can take more wider class of coordinate transformations such that mix spacetime and field variables which are forbidden to be exchanged in conventional formalism. In this aspect, we call our formalism fibration-free. This aspect also simplifies the discussion on symmetries such as Noether's theorem.
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http://arxiv.org/abs/1206.6040
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