A. I. Stepanets,Classification and Approximation of Periodic Functions

Information is given concerning the implemention and complexity of an important family of signal classi"ers.

Given two graphs G = (V(G), QG)) and H = (V(H), €(H)), the sum of G and H, G + H, is the disjoint union of G and H. The product of G and H, G X H, is the graph with the vertex set V(G x H) that is the Cartesian product of V(G) and V(H), and two vertices (gl, h l ) , (92, h2) are adjacent if and only

We determine the exact order of best approximation by polynomials and entire functions of exponential type of functions like . \*, : (x)= |x| \* exp(&A |x| &: ). In particular, it is shown that E(. \*, : , P n , L p (&1, 1))tn &(2\*p+:p+2)Â2 p(1+:) \_ exp(&(1+: &1 )(A:) 1Â(1+:) cos :?Â2(1+:) n :Â(1+

## Abstract We consider quasi‐conformal 3D‐mappings realized by hypercomplex differentiable (monogenic) functions and their polynomial approximation. Main tools are the series development of monogenic functions in terms of hypercomplex variables and the generalization of Kantorovich's approach for

In order to evolve the methods of mechanical spectroscopy and find new methods of studying the rise of nonlinear viscoelasticity, periodic square and triangular stress functions have been used. A "new" viscoelastic function is defined, log JZ = g { log J1 1, where J1 and JZ are the compliances a t t