Logarithmic Bump With Bilinear T (B) Theorem And Maximal Singular Integral Operators
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Abstract
We show that if a pair of weights (u, ) satisfies a sharp Ap - bump condition in the scale of all log bumps certain loglog bumps , then Haar shifts map
( ) into
(u) with a constant quadratic in the complexity of the shift . This in turn implies the two weight boundedness for all Calderón – Zygmund operators. We obtain a generalized version of the former theorem valid for a larger family of Calderón – Zygmund operators in any ambient space . We present a bilinear Tb theorem for singular operators Calderón – Zygmund type. Extending the end point results obtained to maximal singular. Another consequence is a quantitative two weight bump estimate.
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APA
(2026). Logarithmic Bump With Bilinear T (B) Theorem And Maximal Singular Integral Operators. Afribary. Retrieved June 14, 2026, from http://library.afribary.com/works/logarithmic-bump-with-bilinear-t-b-theorem-and-maximal-singular-integral-operators
MLA
"Logarithmic Bump With Bilinear T (B) Theorem And Maximal Singular Integral Operators." Afribary, 7 Jun. 2026, http://library.afribary.com/works/logarithmic-bump-with-bilinear-t-b-theorem-and-maximal-singular-integral-operators. Accessed June 14, 2026.
Chicago
"Logarithmic Bump With Bilinear T (B) Theorem And Maximal Singular Integral Operators." Afribary (2026). Accessed June 14, 2026. http://library.afribary.com/works/logarithmic-bump-with-bilinear-t-b-theorem-and-maximal-singular-integral-operators