Inflation model and Riemann tensor on non-associative algebra

Abstract

In this article the reduction of a n-dimensional space to a k-dimensional space is considered as a reduction of Nn states to Nk states, where N stands for the number of single-particle states per unit of spatial length. It turns out, this space reduction could be understood as another definition of inflation. It is shown that the introduction of the non-associativity of the algebra of physical fields in a homogeneous space leads to a nonlinear equation, the solutions of which can be considered as two-stage inflation. Using the example of reduction T× R7 to T× R3, it is shown that there is a continuous cross-linking of the Friedmann and inflationary stages of algebraic inflation at times 10-15 with the number of baryons 1080 in the Universe. In this paper, we construct a new gravitational constant based on a nonassociative octonion algebra.