Non-autonomous mechanics

Non-autonomous mechanics describe non-relativistic mechanical systems subject to time-dependent transformations. In particular, this is the case of mechanical systems whose Lagrangians and Hamiltonians depend on the time. The configuration space of non-autonomous mechanics is a fiber bundle $Q\to \mathbb {R}$ over the time axis $\mathbb {R}$ coordinated by $(t,q^{i})$ .

This bundle is trivial, but its different trivializations $Q=\mathbb {R} \times M$ correspond to the choice of different non-relativistic reference frames. Such a reference frame also is represented by a connection $\Gamma$ on $Q\to \mathbb {R}$ which takes a form $\Gamma ^{i}=0$ with respect to this trivialization. The corresponding covariant differential $(q_{t}^{i}-\Gamma ^{i})\partial _{i}$ determines the relative velocity with respect to a reference frame $\Gamma$ .

As a consequence, non-autonomous mechanics (in particular, non-autonomous Hamiltonian mechanics) can be formulated as a covariant classical field theory (in particular covariant Hamiltonian field theory) on $X=\mathbb {R}$ . Accordingly, the velocity phase space of non-autonomous mechanics is the jet manifold $J^{1}Q$ of $Q\to \mathbb {R}$ provided with the coordinates $(t,q^{i},q_{t}^{i})$ . Its momentum phase space is the vertical cotangent bundle $VQ$ of $Q\to \mathbb {R}$ coordinated by $(t,q^{i},p_{i})$ and endowed with the canonical Poisson structure. The dynamics of Hamiltonian non-autonomous mechanics is defined by a Hamiltonian form $p_{i}dq^{i}-H(t,q^{i},p_{i})dt$ .

One can associate to any Hamiltonian non-autonomous system an equivalent Hamiltonian autonomous system on the cotangent bundle $TQ$ of $Q$ coordinated by $(t,q^{i},p,p_{i})$ and provided with the canonical symplectic form; its Hamiltonian is $p-H$ .

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Non-autonomous mechanics

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