Then z ∑m k=1 | | |zk| | |= ∑ j=1 ( | | |zj| | | ∑m k=1 | | |zk| | | ) zj | | |zj| | |∈ conv(BZ )

so that ∥z∥ = ∑m j=1 | | |zj| | |

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(Co-)type and the linear stability of Wigner's symmetry theorem

math-ph · 2019-07-12 · unverdicted · novelty 4.0

Almost transition-probability-preserving maps on finite-dimensional Banach spaces admit linear approximations whose quality depends on the spaces' type and cotype constants.

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(Co-)type and the linear stability of Wigner's symmetry theorem math-ph · 2019-07-12 · unverdicted · none · ref 2
Almost transition-probability-preserving maps on finite-dimensional Banach spaces admit linear approximations whose quality depends on the spaces' type and cotype constants.

Then z ∑m k=1 | | |zk| | |= ∑ j=1 ( | | |zj| | | ∑m k=1 | | |zk| | | ) zj | | |zj| | |∈ conv(BZ )

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