On the Non-existence of Unbounded Domains of Normality of Meromorphic Functions

In this paper, by studying the counting functions of the common 1-points of meromorphic functions, a more precise relation between the characteristics of meromorphic functions that share three values CM has been obtained. As applications of this, many known results can be improved.

We determine integral formulas for the meromorphic extension in the \*-parameter of the spherical functions . \* on a noncompactly causal symmetric space. The main tool is Bernstein's theorem on the meromorphic extension of complex powers of polynomials. The regularity properties of . \* are deduced

j makes sense. If ⍀ is bounded then, with the understanding that Z 0 [ л, Ž . Ž . A3 is trivially satisfied with s ⍀, s л, and m s 0, and iii then imposes no restriction on the kernel k.

## Abstract We consider the problem of the asymptotic behaviour in the __L__^2^‐norm of solutions of the Navier–Stokes equations. We consider perturbations to the rest state and to stationary motions. In both cases we study the initial‐boundary value problem in unbounded domains with non‐compact bo