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Proof of the Wehrl-type Entropy Conjecture for Symmmetric SU(N) Coherent States
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The Wehrl entropy conjecture for coherent (highest weight) states in representations of the Heisenberg group, which was proved in 1978 and recently extended by us to the group $SU(2)$, is further extended here to symmetric representations of the groups $SU(N)$ for all $N$. This result gives further evidence for our conjecture that highest weight states minimize group integrals of certain concave functions for a large class of Lie groups and their representations.
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A conjecture on a tight norm inequality in the finite-dimensional l_p
A new tight inequality for l_p norms in finite-dimensional spaces is conjectured, proven for three dimensions, and numerically confirmed up to 200 dimensions with links to quantum entropy problems.
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