Between local and global logarithmic averages

For continuous local martingales, we establish an almost sure central limit theorem and a logarithmic strong law. We also establish the central limit theorem and the law of iterated logarithm associated with this strong law.

## Abstract A vertex __v__ of a graph __G__ is called __groupie__ if the average degree __t__~__v__~ of all neighbors of __v__ in __G__ is not smaller than the average degree __t__~__G__~ of __G.__ Every graph contains a groupie vertex; the problem of whether or not every simple graph on ≧2 vertice

We prove the strong law of large numbers for logarithmic averages of random vectors. We also obtain a strong approximation for logarithmic averages. for a large class of functions a if d = 1. Earlier results are due to [IS] and [12] when a(t) = I { t 5 0). For extensions of (1.3) we refer to [17],

## Abstract We analyze in this article the degree to which different groups of atoms retain local symmetries when assembled in a molecule. This study is carried out by applying continuous symmetry measures to several families of mixed sandwiches, a variety of piano‐stool molecules, and several orga