Matter as Curvature and Torsion of General Metric-Affine Space

General equations of the unified field theory, obtained using the curved and torsional space-time, are presented. They contain only independent geometrical parameters (metric and connections) of metric-affine space, and describe the distribution and motion of matter, which represents the curvature and torsion of the space-time. Equations, describing spherically symmetric fields, are derived for various cases: gravitational field in vacuum, arbitrary material field, and field of massless fluid with spin. Equations with and without cosmological terms, are derived for the closed and open uniform isotropic models of the Universe for the gravitational field in vacuum and field of massless fluid with spin. The respective solutions without singularities have been obtained for these cases. Equations, describing cosmological models, are presented for various material uniform isotropic fields: scalar, electromagnetic and spinor. The relations of the obtained results to the anthropic principle, cosmological natural selection concept, and Gödel theorems are discussed. It is shown that there is no necessity to quantize the obtained general equations. Applying the concept of the unified geometrical field, the hypothetical qualitative explanations of some non-conventional phenomena are proposed.