From Kalman to Einstein and Maxwell: the Structural Controllability Revisited

Abstract

In the Special Relativity paper of Einstein (1905), only a footnote provides a reference to the conformal group of space-time for the Minkowski metric ω. We prove that General Relativity (1915) will depend on the following cornerstone result of differential homological algebra (1990). Let K be a differential field and D=K[d1,...,dn] be the ring of differential operators with coefficients in K. If M is the differential module over D defined by the Killing operator D :T → S2T*: → = L() ω and N is the differential module over D defined by the Cauchy = ad(Killing) adjoint operator with torsion submodule t(N), then t(N) ext1D(M) = 0 and the Cauchy operator can be thus parametrized by stress functions having strictly nothing to do with . This result is largely superseding the Kalman controllability test in classical OD control theory and is showing that controllability is a structural " built-in" property of an OD/PD control system not depending on the choice of inputs and outputs, contrary to the engineering tradition. It also points out the terrible confusion done by Einstein (1915) while following Beltrami (1892), both of them using the Einstein operator but ignoring that it was self-adjoint in the framework of differential double duality (1995). We finally prove that the structure of electromagnetism and gravitation only depends on the nonlinear elations of the conformal group of space-time, showing thus that nothing is left from the mathematical foundations of both general relativity and gauge theory.