Symmetries, Conservation Laws, and Variational Principles for VectorField Theories

The interplay between symmetries, conservation laws, and variational principles is a rich and varied one and extends well beyond the classical Noether\u27s theorem. Recall that Noether\u27s first theorem asserts that to every r dimensional Lie algebra of (generalized) symmetries of a variational problem there are r conserved quantities for the corresponding Euler-Lagrange equations. Noether\u27s second theorem asserts that infinite dimensional symmetry algebras (depending upon arbitrary functions of all the independent variables) lead to differential identities for the Euler-Lagrange equations