English

Martingale transform and Square function: some weak and restricted weak sharp weighted estimates

Analysis of PDEs 2018-04-10 v2 Classical Analysis and ODEs Probability

Abstract

Following the ideas of A. Lerner, F. Nazarov, S. Ombrosi from [12] we prove that there is a sequence of weights wA1dw\in A^d_1 such that [w]A1d[w]^d_{A_1}\to \infty, and martingale transforms TT such that with an absolute positive cc T:L1(w)L1,(w)c[w]A1dlog[w]A1d\|T: L^1(w) \to L^{1, \infty}(w)\| \ge c [w]^d_{A_1}\log [w]^d_{A_1}. We also show the existence of the sequence of weights (now in A2A_2) such that [w]A2d[w]^d_{A_2}\to \infty, and such that the following holds: [w]A2dMdw12[w]_{A_2^d}\asymp \|M^d\|_{w^{-1}}^2; Sw:L2(w)L2(w1)cMdw1logMdw1\|S_{w}: L^{2} (w) \to L^2(w^{-1})\| \ge c\, \|M^d\|_{w^{-1}}\sqrt{\log \|M^d\|_{w^{-1}}}; Sw:L2,1(w)L2(w1)cMdw1logMdw1;\|S_{w}: L^{2,1} (w) \to L^2(w^{-1})\| \ge c\, \|M^d\|_{w^{-1}}\sqrt{\log \|M^d\|_{w^{-1}}}; S:L2(w)L2,(w)=Sw1:L2(w1)L2,(w)CMdw1C([w]A2d)1/2\|S: L^2(w)\to L^{2, \infty}(w)\|=\|S_{w^{-1}}: L^{2}(w^{-1}) \to L^{2,\infty}(w)\|\le C\, \|M^d\|_{w^{-1}}\le C\, ([w]^d_{A_2})^{1/2}. Finally, it is shown that for test functions of the form χI\chi_I the weak norm SwχIL2,C[w]A2d1/2χIw\|S_w \chi_I\|_{L^{2, \infty}} \le C\, [w]_{A_2^d}^{1/2}\|\chi_I\|_w.

Keywords

Cite

@article{arxiv.1711.10578,
  title  = {Martingale transform and Square function: some weak and restricted weak sharp weighted estimates},
  author = {Paata Ivanisvili and Alexander Volberg},
  journal= {arXiv preprint arXiv:1711.10578},
  year   = {2018}
}
R2 v1 2026-06-22T23:00:08.281Z