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The implicate order, algebras, and the spinor
Foundations of Physics 10 (1-2):7-31 (1980)
Abstract
We review some of the essential novel ideas introduced by Bohm through the implicate order and indicate how they can be given mathematical expression in terms of an algebra. We also show how some of the features that are needed in the implicate order were anticipated in the work of Grassmann, Hamilton, and Clifford. By developing these ideas further we are able to show how the spinor itself, when viewed as a geometric object within a geometric algebra, can be given a meaning which transcends the notion of the usual metric geometry in the sense that it must be regarded as an element of a broader and more general pregeometryOther Versions
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Citations of this work
The Pauli–Jung Conjecture and Its Relatives: A Formally Augmented Outline.Harald Atmanspacher - 2020 - Open Philosophy 3 (1):527-549.
Quantum Gravity and Phenomenological Philosophy.Steven M. Rosen - 2008 - Foundations of Physics 38 (6):556-582.
Clifford Algebras and the Dirac-Bohm Quantum Hamilton-Jacobi Equation.B. J. Hiley & R. E. Callaghan - 2012 - Foundations of Physics 42 (1):192-208.
The algebraization of quantum mechanics and the implicate order.F. A. M. Frescura & B. J. Hiley - 1980 - Foundations of Physics 10 (9-10):705-722.
References found in this work
On the intuitive understanding of nonlocality as implied by quantum theory.D. J. Bohm & B. J. Hiley - 1975 - Foundations of Physics 5 (1):93-109.
Quantum theory as an indication of a new order in physics. Part A. The development of new orders as shown through the history of physics.D. Bohm - 1971 - Foundations of Physics 1 (4):359-381.
H. Grassmann's 1844 Ausdehnungslehre and Schleiermacher's Dialektik.Albert C. Lewis - 1977 - Annals of Science 34 (2):103-162.
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