ON THE LEVY-KHINCHIN FORMULA IN NONCOMMUTATIVE PROBABILITY-THEORY

An important role in modern statistical quantum measurement theory is played by measures that assume values in a noncommutative algebra of transformations. This paper investigates convolution semigroups of such measures arising in connection with measurement processes that proceed continuously in time. The principal result is a noncommutative generalization of the Levy Khinchin formula, which describes the structure of the convolution semigroups in terms of their Fourier transforms.