I know that Dr. Pertti Lounesto (
http://users.tkk.fi/~ppuska/mirror/Lounesto/) has expressed some disagreement with Dr. Hestenes regarding Geometric Algebra and Geometric Calculus, but one can't walk three roads at the same time and Dr. Hestenes has done a good job of designing a mathematical language that can be used from fermis to light years. J.W. Gibbs tried to do something similar by cutting scalars off quaternions and advocating only vectors for use in physics. Clifford algebras are a part of quantum mechanics but they need to be a part of a unified mathematical language for all of physics. As Dr. Hestenes points out in the papers listed below, there is a lot of redundancy in mathematical physics which needs to be handled. In designing a better language, one has to take decisions and make tradeoffs. Is there some feature of other clifford algebras you would like to see in a better mathematical language for physics?
When I was young I read “Gravity” by Misner, Thorne and Wheeler (1979) and it used a good half dozen formalisms (vectors, tensors, differential forms, spinors etc.) and in the physics journals there sometimes seems to be one for each researcher (Van der Waerden symbols, tetrads etc.). Over the years I've seen Maxwell's equations expressed in terms of scalars, vectors, tensors, differential forms, quaternions, spinors, twistors and Geometric Algebra/Calculus.
Physicists have sometimes invented their own math and interpretations of the math and sometimes empirically spliced two different formalisms together such as with the use of the Pauli matrices in Quantum Mechanics. The Geometric Algebra/Calculus of Dr. Hestene was designed as a unified mathematical language and allows one a different viewpoint on the physical interpretation of the math. Sometimes seemingly different equations describe similar things as John Shive points out in "Similarities in Physics" or as Schrodinger showed regarding Heisenberg's Matrix Mechanics and Schrodinger's Wave Mechanics. Geometric Algebra allows one to see some similarities more easily and get General Relativity and Quantum Mechanics speaking the same mathematical language.
One of the problems in quantum mechanics involves complex amplitudes that has made some suggest a need for a complex probability calculus but the problem is really in interpreting what the appearance of the complex numbers mean. For example, several physicists have been intrigued by the idea of the Schrodinger equation as a diffusion equation with complex number elements. What do Hamilton-Jacobi theory and Hamilton's optico-mechanical analogy look like in Geometric Calculus? What is the source of the infinities in QED that needs renormalization procedures to avoid them? Physicists can get the right answers to 11 decimal places but they need to be more explicit in step two where they just replace infinite values with known values. Sure it works, but why?
Oersted Medal Lecture 2002: Reforming the Mathematical Langauge of Physics
by David Hestenes
(http://modelingnts.la.asu.edu/pdf/OerstedMedalLecture.pdf )
“My purpose is to lay bare some serious misconceptions that complicate quantum
mechanics and obscure its relation to classical mechanics. The most basic of
these misconceptions is that the Pauli matrices are intrinsically related to spin.
On the contrary, I claim that their physical significance is derived solely from
their correspondence with orthogonal directions in space. The representation of
σi by 2×2 matrices is irrelevant to physics. That being so, it should be possible
to eliminate matrices altogether and make the geometric structure of quantum
mechanics explicit through direct formulation in terms of GA. How to do that
is explained below. For the moment, we note the potential for this change in
perspective to bring classical mechanics and quantum mechanics closer together.”
Vectors, Spinors, and Complex Numbers in Classical and Quantum Physics
by David Hestenes
In the American Journal of Physics, Vol. 39/9, 1013-1027, September 1971.
"Though the geometric algebra discussed here is isomorphic to the so-called
"Pauli (matrix) algebra," the interpretations of the two systems differ considerably,
and the practical consequences of this difference are not trivial. Thus, questions of
the representation of Pauli matrices and of transformations among representations
never arise in geometric algebra, because they are irrelevant. Matrix algebra was
invented to describe linear transformations. So it should not be surprising to find
that matrices have irrelevant features when they are used to represent objects of
a different nature. From the geometric viewpoint of geometric algebra, matrices
are seen to arise in the theory of linear geometric functions; that is, geometrics
are taken to be more fundamental than matrices, rather than the other around.
Simplifications which result from this reversal of viewpoint are manifest in text and
references of this paper."
MATHEMATICAL VIRUSES*
by David Hestenes
http://modelingnts.la.asu.edu/pdf/MathViruses.pdf
* In: A.Micali et al., Clifford Algebras and their Applications in Mathematical Physics,
3-16. 1992 Kluwer Academic Publishers.
CLIFFORD ALGEBRA AND THE INTERPRETATION
OF QUANTUM MECHANICS
by David Hestenes
http://modelingnts.la.asu.edu/pdf/caiqm.pdf
In: J.S.R. Chisholm/A.K. Commons (Eds.), Clifford Algebras and their Applications in
Mathematical Physics. Reidel, Dordrecht/Boston (1986), 321-346.
A UNIFIED LANGUAGE FOR MATHEMATICS AND PHYSICS
by DAVID HESTENES
http://modelingnts.la.asu.edu/html/GeoCalc.html
In: J.S.R. Chisholm/A.K. Commons (Eds.), Clifford Algebras and their Applications in
Mathematical Physics. Reidel, Dordrecht/Boston (1986), 1-23.
THE VECTOR CALCULUS GAP:
Mathematics does not = Physics
by Tevian Dray and Corinne A. Manogue
(24 September 1998)
(
http://www.math.oregonstate.edu/bridge/papers/calculus.pdf)
BRIDGING THE VECTOR (CALCULUS) GAP
TEVIAN DRAY and CORINNE A. MANOGUE
(
http://www.physics.orst.edu/bridge/papers/pathways.pdf)
Bridging the Vector Calculus Gap Workshop
(
http://www.math.oregonstate.edu/bridge/)
