Establishes that the L^p(Ω; S_r) norm of a finite-order decoupled homogeneous Gaussian chaos operator is bounded by C_m (p+r)^{m/2} times the maximum oriented Schatten flattening norm of its kernel.
Lust-Piquard and G
2 Pith papers cite this work. Polarity classification is still indexing.
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Pith papers citing it
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math.PR 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Proves localized operator estimate for centered second-order Gaussian chaoses with scale window conditions, applicable to paracontrolled resonant products on R^d.
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Finite-Order Hilbertian Gaussian Random Tensor Estimates
Establishes that the L^p(Ω; S_r) norm of a finite-order decoupled homogeneous Gaussian chaos operator is bounded by C_m (p+r)^{m/2} times the maximum oriented Schatten flattening norm of its kernel.
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Localized Centered Second-Chaos Operator
Proves localized operator estimate for centered second-order Gaussian chaoses with scale window conditions, applicable to paracontrolled resonant products on R^d.