On Two Weight Estimates for Dyadic Operators
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Publication:4608793
DOI10.1007/978-3-319-51593-9_5zbMath1387.42010arXiv1602.02084OpenAlexW2270022762MaRDI QIDQ4608793
Oleksandra V. Beznosova, Daewon Chung, Jean Carlo Moraes, María Cristina Pereyra
Publication date: 28 March 2018
Published in: Association for Women in Mathematics Series (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1602.02084
Related Items (5)
Unnamed Item ⋮ A NOTE ON TWO WEIGHT INEQUALITIES FOR THE DYADIC PARAPRODUCT ⋮ Unnamed Item ⋮ Dyadic Harmonic Analysis and Weighted Inequalities: The Sparse Revolution ⋮ Unnamed Item
Cites Work
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- Perfect dyadic operators: weighted \(T(1)\) theorem and two weight estimates
- Two-weight \(L^p\)-\(L^q\) bounds for positive dyadic operators: unified approach to \(p \leq q\) and \(p>q\)
- \(L^{p}(\mu) \to L^{q}(\nu)\) characterization for well localized operators
- On \(A_p\)-\(A_\infty \) type estimates for square functions
- Mixed \(A_p\)-\(A_r\) inequalities for classical singular integrals and Littlewood-Paley operators
- Sharp weighted bounds involving \(A_\infty\)
- A Bellman function proof of the \(L^2\) bump conjecture
- The sharp weighted bound for general Calderón-Zygmund operators
- Sharp norm inequalities for commutators of classical operators
- Two weight norm inequalities for the \(g\) function
- Two-weight inequality for the Hilbert transform: a real variable characterization. I
- Two-weight inequality for the Hilbert transform: a real variable characterization. II
- Commutators in the two-weight setting
- Extrapolation and sharp norm estimates for classical operators on weighted Lebesgue spaces
- Sharp weighted norm inequalities for Littlewood-Paley operators and singular integrals
- Sharp weighted estimates for classical operators
- Two weight inequalities for individual Haar multipliers and other well localized operators
- Linear bound for the dyadic paraproduct on weighted Lebesgue space \(L_2(w)\)
- Weighted inequalities for the dyadic square function without dyadic \(A_{\infty}\)
- Summation conditions on weights
- On the resolvents of dyadic paraproducts
- On the two weights problem for the Hilbert transform
- A sharp estimate on the norm of the martingale transform
- Two weight \(L^{p}\) estimates for paraproducts in non-homogeneous settings
- A characterization of two weight norm inequalities for maximal singular integrals with one doubling measure
- On the operator \({\mathcal L}(f)=f\log|f|\)
- Equivalent definitions of dyadic Muckenhoupt and reverse Hölder classes in terms of Carleson sequences, weak classes, and comparability of dyadic \(L \log L\) and \(A_\infty\) constants
- Two-weight inequality for operator-valued positive dyadic operators by parallel stopping cubes
- Logarithmic bump conditions and the two-weight boundedness of Calderón-Zygmund operators
- Weighted Littlewood-Paley theory and exponential-square integrability
- A characterization of two-weight trace inequalities for positive dyadic operators in the upper triangle case
- A problem in prediction theory
- Bloom's inequality: commutators in a two-weight setting
- Weighted estimates for dyadic paraproducts and \(t\)-Haar multipliers with complexity (\(m,n\))
- Mixed Ap-A∞estimates with one supremum
- The Ap-Ainfty inequality for general Calderon-Zygmund operators
- A Remark on Two Weight Estimates for Positive Dyadic Operators
- Two-weight $L^{p}$-inequalities for dyadic shifts and the dyadic square function
- The linear bound in A2for Calderón–Zygmund operators: a survey
- Sharp one-weight and two-weight bounds for maximal operators
- A Commutator Theorem and Weighted BMO
- A Characterization of Two Weight Norm Inequalities for Fractional and Poisson Integrals
- Weighted norm inequalities for maximal functions and singular integrals
- The Bellman functions and two-weight inequalities for Haar multipliers
- The Two Weight Inequality for the Hilbert Transform: A Primer
- A Bump Theorem for Weighted Embeddings and Maximal Operator: The Bellman Function Approach
- A characterization of a two-weight norm inequality for maximal operators
- Two weight inequalities for fractional integral operators and commutators
- Matrix weighted norm inequalities for commutators and paraproducts with matrix symbols
- A new quantitative two weight theorem for the Hardy-Littlewood maximal operator
- Weighted Norm Inequalities for the Hardy Maximal Function
- Weighted Norm Inequalities for the Conjugate Function and Hilbert Transform
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