Browse > Article
http://dx.doi.org/10.4134/JKMS.2012.49.2.395

SOME REMARKS ON VECTOR-VALUED TREE MARTINGALES  

He, Tong-Jun (College of Mathematics and Computer Science Fuzhou University)
Publication Information
Journal of the Korean Mathematical Society / v.49, no.2, 2012 , pp. 395-404 More about this Journal
Abstract
Our first aim of this paper is to define maximal operators a-quadratic variation and of a-conditional quadratic variation for vectorvalued tree martingales and to show that these maximal operators and maximal operators of vector-valued tree martingale transforms are all sublinear operators. The second purpose is to prove that maximal operator inequalities of a-quadratic variation and of a-conditional quadratic variation for vector-valued tree martingales hold provided 2 ${\leq}$ a < $\infty$ by means of Marcinkiewicz interpolation theorem. Based on a result of reference [10] and using Marcinkiewicz interpolation theorem, we also propose a simple proof of maximal operator inequalities for vector-valued tree martingale transforms, under which the vector-valued space is a UMD space.
Keywords
tree martingales; sublinear operator; maximal operator; Marcinkiewicz interpolation;
Citations & Related Records

Times Cited By Web Of Science : 0  (Related Records In Web of Science)
Times Cited By SCOPUS : 0
연도 인용수 순위
  • Reference
1 T. Ando, Contractive projections in $L^{p}$ spaces, Pacic J. Math. 17 (1966), 391-405.   DOI
2 J. Bergh and J. Lofstrom, Interpolation Spaces: An Introduction, Vol. 223, Springer-Verlag, Berlin, 1976.
3 D. L. Burkholder and R. F. Gundy, Extrapolation and interpolation of Quasi-linear operators on martingales, Acta Math. 124 (1970), no. 1, 249-304.   DOI   ScienceOn
4 R. Cairoli and J. B. Walsh, Stochastic integrals in the plane, Acta Math. 134 (1975), 111-183.   DOI   ScienceOn
5 L. E. Dor and E. Odell, Monotone bases in $L^{p}$, Pacic J. Math. 60 (1975), no. 2, 51-61.   DOI
6 S. Fridli and F. Schipp, Tree-martingales, The 5th Pannonian Symposium on Mathematical Statistics, 1985, Grossmann, W. and Pug, G. Ch. and Vincze I. and And Wertz W., 53-63, Visegrad, Hungary, Akademiai Kiado.
7 G. Gat, On (C, 1) summability for Vilenkin-like systems, Studia Math. 144 (2001), no. 2, 101-120.   DOI
8 J. Gosselin, Almost everywhere convergence of Vilenkin-Fourier series, Trans. Amer. Math. Soc. 185 (1973), 345-370.   DOI
9 T.-J. He and Y. L Hou, Some inequalities for tree martingales, Acta Math. Appl. Sin. Engl. Ser. 21 (2005), no. 4, 671-682.   DOI   ScienceOn
10 T.-J. He and Y. Shen, Maximal operators of tree martingale transforms and their maximal operator inequalities, Trans. Amer. Math. Soc. 12 (2008), no. 12, 6595-6609.
11 G. Pisier, Martingales with values in uniformly convex spaces, Israel J. Math. 20 (1975), no. 3-4, 326-350.   DOI   ScienceOn
12 T.-J. He and Y. Shen, Decomposition and convergence for tree martingales, Stochastic Process. Appl. 119 (2009), no. 8, 2625-2644.   DOI   ScienceOn
13 T.-J. He, Y. X. Xiao, and Y. L. Hou, Inequalities for vector-valued tree martingales, International Conference on Functional Space Theory and Its Applications, 2004, Liu, P. D., 67-75, Wuhan, Research Information Ltd UK.
14 D. Khoshnevisan, Multiparameter Processes, Springer-Verlag, New York, 2002.
15 F. Schipp, Universal contractive projections and a.e. convergence, Probability theory and applications, 221-233, Math. Appl., 80, Kluwer Acad. Publ., Dordrecht, 1992.
16 F. Schipp and F. Weisz, Tree martingales and a.e. convergence of Vilenkin-Fourier series, Math. Pannon. 8 (1997), no. 1, 17-35.
17 F. Weisz, Martingale Hardy spaces and their applications in Fourier analysis, Lecture Notes in Mathematics, 1568. Springer-Verlag, Berlin, 1994.
18 F. Weisz, Almost everywhere convergence of Banach space-valued Vilenkin-Fourier series, Acta Math. Hungar. 116 (2007), no. 1-2, 47-59.   DOI   ScienceOn
19 W.-S. Young, Mean convergence of generalized Walsh-Fourier series, Trans. Amer. Math. Soc. 218 (1976), 311-320.   DOI