Minimum Parametrization of the Cauchy Stress Operator
Abstract
When D: → η is a linear differential operator, a "direct problem " is to find the generating compatibility conditions (CC) in the form of an operator D1:η → ζ such that D=η implies D1η=0. When D is involutive, the procedure provides successive first order involutive operators D1, ... , Dn when the ground manifold has dimension n. Conversely, when D1 is given, a more difficult " inverse problem " is to look for an operator D: → η having the generating CC D1η=0. If this is possible, that is when the differential module defined by D1 is torsion-free, one shall say that the operator D1 is parametrized by D and there is no relation in general between D and D2. The parametrization is said to be " minimum " if the differential module defined by D has a vanishing differential rank and is thus a torsion module. The parametrization of the Cauchy stress operator in arbitrary dimension n has attracted many famous scientists (G.B. Airy in 1863 for n=2, J.C. Maxwell in 1863, G. Morera and E. Beltrami in 1892 for n=3, A. Einstein in 1915 for n=4) . This paper proves that all these works are using the Einstein operator and not the Ricci operator. As a byproduct, they are all based on a confusion between the so-called div operator induced from the Bianchi operator D2 and the Cauchy operator which is the formal adjoint of the Killing operator D parametrizing the Riemann operator D1 for an arbitrary n. Like the Michelson and Morley experiment, it is an open historical problem to know whether Einstein was aware of these previous works or not, as the comparison needs no comment.
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