Canonical variables for one Hamiltonian system

This paper introduces generalized canonical transformations for generalized Hamiltonian systems which convert a generalized Hamiltonian system into another one, and preserve the generalized Hamiltonian structure of the original. As in classical mechanics, it is expected that canonical transformation

In this paper we construct canonical difference schemes of any order accuracy based on Pad6 approximation for Linear canonical systems with constant coefficients. For non-linear Hamiltonian equations we will use an infinitesimally canonical transformation to construct canonical schemes of any order

## Abstract In the theory of mechanics and/or mathematical physics problems in a prismatic domain, the method of separation of variables ususally leads to the Sturm–Liouville‐type eigenproblems of self‐adjoint operators, and then the eigenfunction expansion method can be used in equation solving. H

We study canonical forms for Hamiltonian and symplectic matrices or pencils under equivalence transformations which keep the class invariant. In contrast to other canonical forms our forms are as close as possible to a triangular structure in the same class. We give necessary and sufficient conditio