![]() These transformations make it possible to describe the interaction of fundamental and intermediate particles. Linear and bilinear transformations of universal algebra are set to match intermediate particles. ![]() A special case of universal algebra is Clifford's algebra assigned to leptons in our approach. Furthermore, it helps us to explain the hierarchy of fundamental elementary particles and make generalizations about them. This main concept allows us to explain quantum phenomena and give a new understanding of the wave function. We attribute the properties of the universal algebra to the space-time and the action space. ![]() Our key approach is to make algebraic generalization of two spaces: the space-time and the space of the action similar to the space-time. This study concerns the field of fundamental generalizing concepts in present-day physics known as Unified Theory, Theory of Everything etc.
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