Growth of Certain Subharmonic Functions

We characterize the Julia sets of certain exponential functions. We show that the Julia sets J F λ n of F λ n z = λ n e z n where λ n > 0 is the whole plane , provided that lim k→∞ F k λ n 0 = ∞. In particular, this is true when λ n are real numbers such that λ n > 1 ne 1/n . On the other hand, if 0

## Abstract Properties of the space of one‐dimensional continuous probability distribution functions endowed with the topology of pointwise convergence are investigated. For example, the operation of convolution is shown to be continuous.

## Abstract Certain subclasses 𝒜~__p__~(__j__, α), ℬ︁~__p__~(__j__, α) and 𝒢~__p,b__~(__j__, α) of multivalent functions in the unit disk are introduced. The object of the present paper is to derive some properties of functions belonging to the classes 𝒜~__p__~(__j__, α), ℬ︁~__p__~(__j__, α), or 𝒢~

## Abstract Some new results of the PRAGMÉN‒LINDELÖF theory in 𝔜~+~ (namely the elementary method of successive mapping [4] and ROSSBERG's [8] non‒elementary theorem) are carried over to subharmonic functions. The theorems have – in spite of their very different nature – a common salient feature: R