On the form of local conservation laws for some relativistic field theories in 1+1 dimensions

Abstract

We investigate the possible form of local translation invariant conservation laws associated with the relativistic field equations ∂∂φi=-vi() for a multicomponent field . Under the assumptions that (i)~the vi's can be expressed as linear combinations of partial derivatives ∂ wj/∂φk of a set of functions wj(), (ii)~the space of functions spanned by the wj's is closed under partial derivations, and (iii)~the fields take values in a simply connected space, the local conservation laws can either be transformed to the form ∂ P=∂Σj wj Qj (where P and Qj are homogeneous polynomials in the variables ∂φi, ∂2φi,…), or to the parity transformed version of this expression ∂(∂t+∂x)/ 2∂ (∂t-∂x)/2.

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