Mathematics

Let c be a number lying in the interval (1, 2]. The binary additive problem with semiprimes p1p2 such that { 1/2(p1p2)^(1/c)}<1/2 solved in this paper.

In this paper exact order estimations of errors in uniform metric approximation of smooth function and its derivatives over several classes are obtained in cases when the function is defined precisely or using its  δ-approximation  fδ(x) in  L2[a,b] metric. Integral operators with polynomial finite kernels are considered as approximate one.

We consider a functioning property of a system with a finite set of elements and with different kinds of Boolean binary relations on it. We also construct the square matrices over arbitrary Boolean algebra which determine some Boolean binary relation and generate a cyclic semigroup with the maximum index and period. The looping of the system with a finite set of elements called an oscillator, is accompanied by appearing of subsequences (overtones) in a sequence of elements on the main diagonal of powers of a relevant Boolean matrix.

This paper is devoted to the proof of the theorem including necessary and sufficient conditions in the problem of the best plural reflection’s ap-proximation by algebraic polynomial. In the proof is used several author’s were published results and two auxiliary lemmas. The proof is based on the minim ax’s problems theory, the approximation’s theory by algebraic polynomials of the P.L. Chebyshev and the plural’s analysis.