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From Symplectic Measurements to the Mahler Conjecture
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In this note we link symplectic and convex geometry by relating two seemingly different open conjectures: a symplectic isoperimetric-type inequality for convex domains, and Mahler's conjecture on the volume product of centrally symmetric convex bodies. More precisely, we show that if for convex bodies of fixed volume in the classical phase space the Hofer-Zehnder capacity is maximized by the Euclidean ball, then a hypercube is a minimizer for the volume product among centrally symmetric convex bodies.
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On Quantum Indeterminacy
Quantum indeterminacy is reformulated geometrically via convex duality and symplectic capacities in phase space, making the Robertson-Schrödinger inequalities necessary consequences of admissible configurations.
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