论文信息 - On the non-tangential convergence of Poisson and modified Poisson semigroups at the smoothness points of $L_{p}$-functions

On the non-tangential convergence of Poisson and modified Poisson semigroups at the smoothness points of $L_{p}$-functions

The high-dimensional version of Fatou’s classical theorem asserts that the Poisson semigroup of a function $$f\in L_{p}(\mathbb {R}^{n}), \ 1\le p \le \infty $$, converges to f non-tangentially at Lebesque points. In this paper we investigate the rate of non-tangential convergence of Poisson and metaharmonic semigroups at $$\mu $$-smoothness points of f.

Simten Bayrakci | M. F. Shafiev | Ilham A. Aliev | I. A. Aliev | S. Bayrakci

[1] B. Rubin,et al. Wavelet-Like Transforms for Admissible Semi-Groups; Inversion Formulas for Potentials and Radon Transforms , 2005 .

[2] R. Mañé,et al. On a theorem of Fatou , 1993 .

[3] On a rate of convergence of truncated hypersingular integrals associated to Riesz and Bessel potentials , 2013 .

[4] I. A. Aliev,et al. The rate of convergence of truncated hypersingular integrals generated by the Poisson and metaharmonic semigroups , 2014 .

[5] J. Littlewood. Mathematical Notes (4): On a Theorem of Fatou , 1927 .

[6] A counter example on nontangential convergence for oscillatory integrals , 2008, 0806.1453.

[7] E. Stein,et al. On certain maximal functions and approach regions , 1984 .

[8] On the Gauss-Weierstrass summability of multiple trigonometric series at µ-smoothness points , 2011 .

[9] W. Urbina,et al. Non Tangential Convergence for the Ornstein-Uhlenbeck Semigroup. , 2006, math/0611040.

[10] P. Turán. On a Theorem of Littlewood , 1946 .

[11] E. Stein. Singular Integrals and Di?erentiability Properties of Functions , 1971 .

On the non-tangential convergence of Poisson and modified Poisson semigroups at the smoothness points of \(L_{p}\)-functions