Maximal degree variational principles
Abstract
Let M be smooth n-dimensional manifold, fibered over a k-dimensional submanifold B as π:M B, and ∈ k (M); one can consider the functional on sections φ of the bundle π defined by ∫D φ* (), with D a domain in B. We show that for k = n-2 the variational principle based on this functional identifies a unique (up to multiplication by a smooth function) nontrivial vector field in M, i.e. a system of ODEs. Conversely, any vector field X on M satisfying iX ( d ) = 0 for some ∈ n-2 (M) admits such a variational characterization. We consider the general case, and also the particular case M = P × R where one of the variables (the time) has a distinguished role; in this case our results imply that any Liouville (volume-preserving) vector field on the phase space P admits a variational principle of the kind considered here.
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