Local Distribution of Ordered Factorizations of Integers

We study in detail the asymptotic behavior of the number of ordered factorizations with a given number of factors. Asymptotic formulae are derived for almost all possible values of interest. In particular, the distribution of the number of factors is asymptotically normal. Also we improve the error

Let A be a real quadratic algebra of dimension s 3 which satisfies the basic relations of hypercomplex systems. For a large positive parameter X, let A(X) denote the number of squares : 2 with : # A, : integral, and all s components of : 2 lying in the interval [&X, X]. With particular regard to Cay

Let O denote the ring of integers of a local field. In this note we prove an Ä 4 ϱ approximation theorem for the Riesz type kernels ␥ over O. The proof , , n ns1 Ž . y1 requires a sharp estimate of the Dirichlet kernel D x on P \_ O, which may also n have independent interest. As a consequence we so

We present a construction of regular compactly supported wavelets in any Sobolev space of integer order. It is based on the existence and suitable estimates of filters defined from polynomial equations. We give an implicit study of these filters and use the results obtained to construct scaling func

Let KÂk be an extension of degree p 2 over a p-adic number field k with the Galois group G. We study the Galois module structure of the ring O K of integers in K. We determine conditions under which the invariant factors of Kummer orders O K t in O K of two extensions coincide with each other and gi