Stability theorems for cones and wedges of continuous functions

A number of publications have appeared on the transverse vibration of "complete" and truncated wedge and cone beams. The mode shape equations are linear differential equations with regular singularity. The natural frequencies of "complete" beams are found in several publications. For truncated beams

In earlier papers [1,2], Naguleswaran studied the vibrations of beams with non-uniform thickness by solving the differential equation with the Frobenius method, which gives the solutions in infinite power series. The author observed the fact that, for some cases, even the quadruple precision could n

## 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