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The Evans field equation is solved to give the equations governing the evolution of scalar curvature R and contracted energy-momentum T. These equations show that R and T are always analytical, oscillatory, functions without singularity and apply to all radiated and matter fields from the sub-atomic to the cosmological level. One of the implications is that all radiated and matter fields are both causal and quantized, contrary to the Heisenberg uncertainty principle. The wave equations governing this quantization are deduced from the Evans field equation. Another is that the universe is oscillatory without singularity, contrary to contemporary opinion based on singularity theorems. The Evans field equation is more fundamental than, and leads to, the Einstein field equation as a particular example, and so modifies and generalizes the contemporary Big Bang model. The general force and conservation equations of radiated and matter fields are deduced systematically from the Evans field equation. These include the field equations of electrodynamics, dark matter, and the unified or hybrid field.
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Evans, M. New Concepts from the Evans Unified Field Theory. Part One: The Evolution of Curvature, Oscillatory Universe Without Singularity, Causal Quantum Mechanics, and General Force and Field Equations. Found Phys Lett 18, 139–155 (2005). https://doi.org/10.1007/s10702-005-3958-2
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DOI: https://doi.org/10.1007/s10702-005-3958-2