Central limit properties of GZH-semigroups and their applications in probability theory (Q2365743)

The paper continues the work by D. G. Kendall, R. Davidson, I. Z. Ruzsa and the reviewer on Delphic, Hun, and Hungarian semigroups. New classes of topological semigroups called GZH and GMD semigroups are introduced. Using these notions the author proves that infinitesimal arrays are infinitely divisible in the limit for a large class of topological semigroups including the convolution semigroup of all probability measures on second countable LCA-groups or on a real separable Hilbert space or the semigroup of all positive definite kernels defined on a countable set with complex values and with norms not greater than 1.