Iterants, Idempotents and Clifford algebra in Quantum Theory

TL;DR

This paper explores the algebraic structure of quantum idempotents, showing they generate various geometric algebras and provide new insights into quantum processes, geometry, and particle physics representations.

Contribution

It introduces the concept of quantum idempotents generating iterant, Lie, Grassmann, and Clifford algebras, linking geometric algebras directly to quantum theory and processes.

Findings

Quantum idempotents generate key geometric algebras.

Iterant algebra encodes spatial and temporal recursive processes.

New representations of braid, parafermion, and quark algebras in quantum physics.

Abstract

Projection operators are central to the algebraic formulation of quantum theory because both wavefunction and hermitian operators(observables) have spectral decomposition in terms of the spectral projections. Projection operators are hermitian operators which are idempotents also. We call them quantum idempotents. They are also important for the conceptual understanding of quantum theory because projection operators also represent observation process on quantum system. In this paper we explore the algebra of quantum idempotents and show that they generate Iterant algebra (defined in the paper), Lie algebra, Grassmann algebra and Clifford algebra which is very interesting because these later algebras were introduced for the geometry of spaces and hence are called geometric algebras. Thus the projection operator representation gives a new meaning to these geometric algebras in that they are also underlying algebras of quantum processes and also they bring geometry closer to the quantum theory. It should be noted that projection operators not only make lattices of quantum logic but they also span projective geometry. We will give iterant representations of framed braid group algebras, parafermion algebras and the $su(3)$ algebra of quarks. These representations are very striking because iterant algebra encodes the spatial and temporal aspects of recursive processes. In that regard our representation of these algebras for physics opens up entirely new perspectives of looking at fermions,spins and parafermions(anyons).