Convergence in nonisotropic regions of harmonic functions in $^n$

Cascante, Carme; Ortega, Joaquin

Convergence in nonisotropic regions of harmonic functions in

^{n}

Cascante, Carme ; Ortega, Joaquin

Studia Mathematica, Tome 133 (1999), p. 269-298 / Harvested from The Polish Digital Mathematics Library

Access to full text
Full (PDF)

Résumé

We study the boundedness in $L^{p} (^{n})$ of the projections onto spaces of functions with spectrum contained in horizontal strips. We obtain some results concerning convergence along nonisotropic regions of harmonic extensions of functions in $L^{p} (^{n})$ with spectrum included in these horizontal strips.

Publié le : 1999-01-01

Zbl 0941.31002

EUDML-ID : urn:eudml:doc:216638

@article{bwmeta1.element.bwnjournal-article-smv134i3p269bwm,
     author = {Carme Cascante and Joaquin Ortega},
     title = {Convergence in nonisotropic regions of harmonic functions in $^n$
            },
     journal = {Studia Mathematica},
     volume = {133},
     year = {1999},
     pages = {269-298},
     zbl = {0941.31002},
     language = {en},
     url = {http://dml.mathdoc.fr/item/bwmeta1.element.bwnjournal-article-smv134i3p269bwm}
}

Cascante, Carme; Ortega, Joaquin. Convergence in nonisotropic regions of harmonic functions in $^n$
            . Studia Mathematica, Tome 133 (1999) pp. 269-298. http://gdmltest.u-ga.fr/item/bwmeta1.element.bwnjournal-article-smv134i3p269bwm/

Bibliographie

[00000] [AhBr] P. Ahern and J. Bruna, Maximal and area integral characterizations of Hardy-Sobolev spaces in the unit ball of $ℂ^{n}$ , Rev. Mat. Iberoamericana 4 (1988), 123-153. | Zbl 0685.42008

[00001]

[00002] [Al] A. B. Aleksandrov, Several Complex Variables II, Encyclopaedia Math. Sci. 8, G. M. Khenkin and A. G. Vitushkin (eds.), Springer, 1991.

[00003] [BeLo] J. Bergh and J. Löfström, Interpolation Spaces. An Introduction, Springer, 1976. | Zbl 0344.46071

[00004] [BoCl] A. Bonami et J.-L. Clerc, Sommes de Cesàro et multiplicateurs des développements en harmoniques sphériques, Trans. Amer. Math. Soc. 183 (1973), 223-263.

[00005] [BrCa] J. Bruna and C. Cascante, Restriction to transverse curves of some spaces of functions in the unit ball, Michigan Math. J. 36 (1989), 387-401. | Zbl 0692.46018

[00006] [BrOr] J. Bruna and J. M. Ortega, Closed finitely generated ideals in algebras of holomorphic functions and smooth to the boundary in strictly pseudoconvex domains, Math. Ann. 268 (1984), 137-157. | Zbl 0533.32002

[00007] [CaOr] C. Cascante and J. M. Ortega, A characterisation of tangential exceptional sets for $H_{α}^{p}$ , α p=n, Proc. Roy. Soc. Edinburgh 126 (1996), 625-641. | Zbl 0881.32003

[00008] [Ch] E. M. Chirka, The Lindelöf and Fatou theorems in $ℂ^{n}$ , Mat. Sb. 92 (1973), 622-644 (in Russian).

[00009] [Do] E. Doubtsov, thesis, Université Bordeaux I, 1995.

[00010] [GaRu] J. García-Cuerva and J. L. Rubio de Francia, Weighted Norm Inequalities and Related Topics, North-Holland, 1985.

[00011] [Ge] D. Geller, Some results in $H^{p}$ theory for the Heisenberg group, Duke Math. J. 47 (1980), 365-390.

[00012] [Kr1] V. G. Krotov, Estimates for maximal operators connected with boundary behavior and their applications, Trudy Mat. Inst. Steklov. 190 (1989), 117-138 (in Russian); English transl.: Proc. Steklov Inst. Math. 1 (1992), 123-144.

[00013] [Kr2] V. G. Krotov, A sharp estimate of the boundary behavior of functions in the Hardy-Sobolev classes $H_{α}^{p} (^{n})$ in the critical case α p=n, Dokl. Akad. Nauk SSSR 319 (1991), 42-45 (in Russian); English transl.: Soviet Math. Dokl. 44 (1992), 36-39.

[00014] [Li] E. Lindelöf, Sur un principe générale de l'analyse et ses applications à la théorie de la représentation conforme, Acta Soc. Sci. Fenn. 46 (1915), 1-35.

[00015] [NaRoStWa] A. Nagel, J. P. Rosay, E. M. Stein and S. Wainger, Estimates for the Bergman and Szegő kernels in $ℂ^{2}$ , Ann. of Math. 129 (1989), 113-149. | Zbl 0667.32016

[00016] [NaRu] A. Nagel and W. Rudin, Local boundary behavior of bounded holomorphic functions, Canad. J. Math. 30 (1978), 583-592. | Zbl 0427.32006

[00017] [NaRuSh] A. Nagel, W. Rudin and J. H. Shapiro, Tangential boundary behavior of functions in Dirichlet-type spaces, Ann. of Math. 116 (1982), 331-360. | Zbl 0531.31007

[00018] [NaWa] A. Nagel and S. Wainger, Limits of bounded holomorphic functions along curves, in: Recent Developments in Several Complex Variables, J. E. Fornaess (ed.), Princeton Univ. Press, 1981, 327-344.

[00019] [Ru] W. Rudin, Function Theory in the Unit Ball of $ℂ^{n}$ , Springer, 1980.

[00020] [St] J. D. Stafney, The spectrum of an operator on an interpolation space, Trans. Amer. Math. Soc. 144 (1969), 333-349. | Zbl 0225.46034

[00021] [Su] J. Sueiro, Tangential boundary limits and exceptional sets for holomorphic functions in Dirichlet-type spaces, Math. Ann. 286 (1990), 661-678. | Zbl 0664.32003

[00022] [TrEr] F. G. Tricomi and A. Erdélyi, The asymptotic expansion of a ratio of gamma functions, Pacific J. Math. 1 (1951), 133-142. | Zbl 0043.29103

[00023] [Zy] A. Zygmund, On a theorem of Littlewood, Summa Brasil. Math. 2 (1949), 1-7.