On one-sided boundedness of normed partial sums

Abstract

This paper gives a very general sufficient condition for the existence of constants B(n), C(n) for which either almost surely or almost surely, where S_n = X₁ + X₂ + … + X_n and X_i are independent and identically distributed random variables. The theorem is closely connected with results of Klass and Teicher on the one-sided boundedness of S_n, with the relative stability of S_n, and with a generalised law of the iterated logarithm due to Kesten. For non negative X_i the sufficient condition is shown to be necessary, and the results are partially generalised to the case when X_i form a stationary m-dependent sequence. Some connections with a generalised type of regular variation and with domains of partial attraction are also noted.