Finite Bases with Respect to the Superposition in Classes of Elementary Recursive Functions, dissertation

Abstract

This is a thesis that was defended in 2009 at Lomonosov Moscow State University. In Chapter 1: 1. It is proved that that the class of lower (Skolem) elementary functions is the set of all polynomial-bounded functions that can be obtained by a composition of x+1, xy, (x-y,0), x y, x/y , and one exponential function (2x or xy) using formulas that have no more than 2 floors with respect to an exponent (for example, (x+y)xy+z+1 has 2 floors, 22x has 3 floors). Here x y is a bitwise AND of x and y. 2. It is proved that \x+y,\ (x-y,0),\ x y,\ x/y ,\ 2 2 x 2\ and \x+y,\ (x-y,0),\ x y,\ x/y ,\ x 2 y \ are composition bases in the functional version of the uniform TC0 (also known as FOM). 3. The hierarchy of classes exhausting the class of elementary functions is described in terms of compositions with restrictions on a number of floors in a formula. The results of Chapter 1 are published in: 1) Volkov S.A. An exponential expansion of the Skolem-elementary functions, and bounded superpositions of simple arithmetic functions (in Russian), Mathematical Problems of Cybernetics, Moscow, Fizmatlit, 2007, vol. 16, pp. 163-190 2) doi:10.1134/S1064562407040217 In Chapter 2 a simple composition basis in the class E2 of Grzegorczyk hierarchy is described. This result is published in DOI: 10.1515/156939206779238436 In Chapter 3 it is proved that the group of permutations Gr(Q)=\f:\ f,f-1∈ Q\ is generated by two permutations for many classes Q. For example, this is proved for Q=FP, where FP is the class of all polynomial-time computable functions (of the length of input). The results of chapter 3 are published in DOI: 10.1515/DMA.2008.046