A counterexample related to ${A}_{p}$-weights in martingale theory
Séminaire de probabilités de Strasbourg, Volume 19 (1985), p. 275-277
@article{SPS_1985__19__275_0,
author = {Kazamaki, Norihiko},
title = {A counterexample related to $A\_p$-weights in martingale theory},
journal = {S\'eminaire de probabilit\'es de Strasbourg},
publisher = {Springer - Lecture Notes in Mathematics},
volume = {19},
year = {1985},
pages = {275-277},
zbl = {0561.60055},
mrnumber = {889487},
language = {en},
url = {http://www.numdam.org/item/SPS_1985__19__275_0}
}

Kazamaki, Norihiko. A counterexample related to $A_p$-weights in martingale theory. Séminaire de probabilités de Strasbourg, Volume 19 (1985) pp. 275-277. http://www.numdam.org/item/SPS_1985__19__275_0/

[1] C. Dellacherie, P.A. Meyer and M. Yor, Sur certaines propriétés des espaces de Banach H1 et BMO, Sém. de Prob. XII, Lecture Notes in Math. 649, 1978, 98-113 | Numdam | MR 519999 | Zbl 0392.60009

[2] M. Emery, Le théorème de Garnett - Jones d'après Varopoulos, Sém. de Prob. XV, Lecture Notes in Math. 850, 1981, 278-284 | Numdam | MR 622569 | Zbl 0458.60036

[3] N. Kazamaki, A characterization of BMO-martingales, Sém. de Prob. X, Lecture Notes in Math. 511, 1976, 536-538 | Numdam | MR 445605 | Zbl 0338.60028

[4] N. Kazamaki and Y. Shiota, Remarks on the class of continuous martingales with bounded quadratic variation, Tôhoku Math. J., (to appear) | MR 778374 | Zbl 0567.60050

[5] S.C. Port and C.T. Stone, Brownian Motion and Classical Potential Theory, Academic Press 1978 | Zbl 0413.60067

[6] T. Sekiguchi, Weighted norm inequalities on the martingale theory, Math. Rep. Toyama Univ., 3 (1980), 37-100. | MR 586536 | Zbl 0447.60036