A translation-invariant Banach space is constructed on which the non-classical maximal operator M^diamond is bounded but the sharp maximal operator M^sharp is not.
Klein, Absolutely continuous spectrum in the Anders on model on the Bethe lattice, Math
3 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
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2026 3verdicts
UNVERDICTED 3representative citing papers
For strong disorder the root-averaged density of states of the Anderson model on the Bethe lattice is absolutely continuous with real-analytic density possessing a finite-order strong-disorder expansion whose leading coefficient is the single-site density and whose odd coefficients all vanish.
Extends zero-cycle results to twisted K3 moduli spaces and shows that effective zero-cycles on double EPW quartics agree with those on associated Verra fourfolds while twisted and standard Beauville-Voisin classes coincide.
citing papers explorer
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A Banach space that distinguishes two maximal operators
A translation-invariant Banach space is constructed on which the non-classical maximal operator M^diamond is bounded but the sharp maximal operator M^sharp is not.
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Strong-disorder expansion of the root-averaged density of states for the Anderson model on the Bethe lattice
For strong disorder the root-averaged density of states of the Anderson model on the Bethe lattice is absolutely continuous with real-analytic density possessing a finite-order strong-disorder expansion whose leading coefficient is the single-site density and whose odd coefficients all vanish.
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Zero-cycles on Moduli Spaces of Twisted Sheaves and Applications to Double EPW Quartics
Extends zero-cycle results to twisted K3 moduli spaces and shows that effective zero-cycles on double EPW quartics agree with those on associated Verra fourfolds while twisted and standard Beauville-Voisin classes coincide.