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    There are no transformation techniques that can turn a no... — Carmelics
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    Supports→Nonseparability of a Hamiltonian is a necessary condition for chaos.

    There are no transformation techniques that can turn a nonseparable Hamiltonian into the sum of separate Hamiltonians.

    CausationModality & Possibility
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    For nonlinear systems, Hamiltonians are never separable.Nonseparability of a Hamiltonian is a necessary condition for chaos.Nonseparable classical systems are the kinds of systems where chaotic behavior c...Stretching and folding mechanisms, which are required for chaos, require nonsepa...

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    A separable Hamiltonian can always be transformed into a sum of separa...81%The interactions in a nonseparable system cannot be transformed away, ...73%Standard methods of proof — conversion, ecthesis, and reductio ad absu...73%Chaos is impossible for separable Hamiltonians.73%

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    As discussed in Section 1.2.2, linear systems always obey the principle of linear superposition. This implies that the Hamiltonians for such systems are always separable. A separable Hamiltonian can always be transformed into a sum of separate Hamiltonians with one element in the sum corresponding to each subsystem. In effect, a separable system is one where the interactions among subsystems can be transformed away leaving the subsystems independent of each other. The whole is the sum of the par

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