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arxiv: 1602.06856 · v2 · pith:OLUVQGF6new · submitted 2016-02-22 · 🧮 math-ph · math.DS· math.MP

Long time semiclassical Egorov theorem for hbar-pseudodifferential systems

classification 🧮 math-ph math.DSmath.MP
keywords hbarsemiclassicaltimematrix-valuedalmostegorovlongmathbb
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In the Heisenberg picture, we study the semiclassical time evolution of a bounded quantum observable $Q^w(x,\hbar D_x)$ associated to a $(m\times m)$ matrix-valued symbol $Q$ generated by a semiclassical matrix-valued Hamiltonian $H\sim H_0+\hbar H_1$. Under a non-crossing assumption on the eigenvalues of the principal symbol $H_0$ that ensures the existence of almost invariant subspaces of $L^{2}(\mathbb R^n)\otimes \mathbb C^m$, and for a class of observables that are semiclassically block-diagonal with respect to the projections onto these almost invariants subspaces, we establish a long time matrix-valued version for the semiclassical Egorov theorem valid in a large time interval of Ehrenfest type $T(\hbar)\simeq log(\hbar^{-1})$.

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