The deformation quantization mapping of Poisson- to associative structures in field theory

Abstract

Let \·,·\P be a variational Poisson bracket in a field model on an affine bundle π over an affine base manifold Mm. Denote by × the commutative associative multiplication in the Poisson algebra A of local functionals (π) that take field configurations to numbers. By applying the techniques from geometry of iterated variations, we make well defined the deformation quantization map ×=×+\,\·,·\P+o() that produces a noncommutative [[]]-linear star-product in A.