Noether's problem for A5

## Abstract In this paper we generalize two Noether‐Lefschetz theorems for surfaces by L. Ein to varieties of arbitrary even dimension. Our results also generalize the classical Noether‐Lefschetz theorem for complete intersections of even dimension in ℙ~n~.

We consider a relativistic brane propagating in Minkowski spacetime described by any action which is local in its worldvolume geometry. We examine the conservation laws associated with the Poincare symmetry of the background from a worldvolume geometrical point of the view. These laws are exploited

This article is a theoretical investigation of generalized Noether's theorem, which, though unconcerned with considerations such as coordinate transformations, symmetry, and invariance, is the basic mechanism of conventional Noether's theorem, its extensions, and its inverse. The generalized theorem

We consider the application of generalized Noether's theorem, a completely new approach -formally, conceptually, and practically -to Noether's theorem, its extensions, and its inverse. We discuss application in general and present specific applications: to the Dirac field, to creation/annihilation c