A class of generalized Lévy Laplacians in infinite dimensional calculus (Q5951485)

Within the framework of white noise calculus, a generalized Lévy Laplacian is defined which extends the ordinary Lévy Laplacian and allows derivatives of any order of a \(\delta\)-function. The authors establish relations of their generalized Lévy Laplacian with Kuo's Fourier transform and other infinite dimensional Laplacians. They also treat some questions of limit average of the second order functional derivative with respect to certain orthonormal bases.