The Singular Case in the Stability of Additive Functions

In this paper, we present results in the Gevrey asymptotics which correspond to some existing results concerning asymptotic solutions in the Poincare asymptotics of singularly perturbed ordinary differential equations. The main idea is based on a characterization of the Gevrey flat functions and a c

We work over any algebraically closed field F. However the applications are not vacuos only if char (F) > 0. A finite set S in a projective space V is said to be in t-unifomn position, t an integer, if for any two subsets A , B of S with card it is in t-uniform position for every t. 9 is called in

Let S q (n) denote the sum of digits of n in base q. For given pairwise coprime bases q 1 , ..., q l and arbitrary residue classes a i mod m i (i=1, ..., l), we obtain an estimate with error term O(N 1&$ ) for the quantity which extends results of J. Be sineau and establishes a conjecture of A. O.

We show that a function f having a little uniform smoothness can be locally represented at any point x 0 as where g is an indefinitely oscillating function; the value of ␤ of the regularity of r are related by the 2-microlocal regularity of f.