A central limit theorem for random sums of random variables

In this note we prove a functional central limit theorem for LPQD processes, satisfying some assumptions on the covariances and the moment condition \(\sup \_{j \geqslant 1} E\left|X\_{1}\right|^{2+}0\). ' 1943 Academic Press. Inc

## Abstract The paper provides some central limit theorems for triangular arrays of Markov‐connected random variables. It is assumed the Markov chain to satisfy condition (__D__~1~) which is an generalization of strong Doeblin's condition (__D~o~__). One result represents a central limit theorem wi

The random variables (r.vs.) X , . i E S : = ( 1 , 2 ...I, to he dealt uith are measurable mappings from a probability space (9. 91, P ) into a measure space (B, %), R being a RANACH space with a countable hasis (e,),,,, and ' 3 the o-algebra of 13orel sets of B. The type of convergence to be mainly

We consider limit theorems for counting processes generated by Minkowski sums of random fuzzy sets. Using support functions, we prove almost-sure convergence for a renewal process indexed by fuzzy sets in an inner-product vector space. We also get convergence for the associated containment renewal f