Linear Hamiltonians in generators of the real Jacobi group on the extended Siegel-Jacobi space and equations of motion attached
Abstract
Using the energy function on the extended Siegel-Jacobi upper half space of order n, XJn, with n∈ N, the equations of motion in the variables (x,y,q,p,κ) attached to linear Hamiltonians in the generators of the real Jacobi group GJn(R) are presented, where x,y are symmetric matrices in M(n,R) and p,q are real n-vectors. The case n=1 is presented separately.
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