Abstract
We provide a generalization of the normal mode decomposition for nonsymmetric or locality constrained situations. This allows, for instance, to locally decouple a bipartitioned collection of arbitrarily correlated oscillators up to elementary pairs into which all correlations are condensed. Similarly, it enables us to decouple the interaction parts of multimode channels into single-mode and pair interactions where the latter are shown to be a clear signature of squeezing between system and environment. In mathematical terms the result is a canonical matrix form with respect to real symplectic equivalence transformations.
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