Constructs probabilistic strong solutions to radial cubic NLS on 3D ball in supercritical regime via gauge transforms and random averaging operators, improving Bourgain-Bulut.
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2 Pith papers cite this work. Polarity classification is still indexing.
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2026 2verdicts
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Derives beta functions for couplings in interacting bosonic and fermionic fields on curved spacetimes via local potential approximation and proves local existence and uniqueness of the resulting flow equations.
citing papers explorer
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Gauge transforms, random averaging operator ansatz and improved probabilistic well-posedness for the radial NLS on the $3d$ ball
Constructs probabilistic strong solutions to radial cubic NLS on 3D ball in supercritical regime via gauge transforms and random averaging operators, improving Bourgain-Bulut.
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A perturbative approach to the Wetterich equation for Bosonic and Fermionic interacting fields
Derives beta functions for couplings in interacting bosonic and fermionic fields on curved spacetimes via local potential approximation and proves local existence and uniqueness of the resulting flow equations.