Dynamics of Dimensions in Factor Space Cosmology

Abstract

We consider multidimensional cosmological models with a generalized space-time manifold M = R x M1 ...x Mn, composed from a finite number of factor spaces Mi, i=1,..n. While usually each factor space Mi is considered to be some Riemannian space of integer dimension di, here it is, more generally, a fractal space, the dimension of which is a smooth function di(t) of time. Hence, besides the scale factor exponents ln ai and their derivatives, we consider also the dimensions di of the factor spaces as classical dynamical variables. The classical equation of motions and the corresponding Wheeler-de Witt equation are set up generally, and the qualitative behaviour of the system is discussed for some specific model with 2 factor spaces.

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