References
- Ben Nahia Z, Ben Salem N. Spherical harmonics and applications associated with the Weinstein operator. Potential theory-proceedings of the ICPT 94; Berlin: de Gruyter; 1994. p. 223–241.
- Ben Nahia Z, Ben Salem N. On a mean value property associated with the Weinstein operator. Potential theory-proceedings of the ICPT 94; Berlin: de Gruyter; 1994. p. 243–253.
- Muckenhoupt B, Stein E. Classical expansions and their relation to conjugate harmonic functions. Trans Amer Math Soc. 1965;118:17–92. doi: 10.1090/S0002-9947-1965-0199636-9
- Betancor JJ, Farińa JCC, Buraczewski D, et al. Riesz transforms related to Bessel operators. Proc R S Edinb Sect. 2007;137:701–725. doi: 10.1017/S0308210505001034
- Christ M. Lectures on singular integral operators. Reg. Conf. Math., Vol. 77. Providence (RI): American Mathematical Society; 1990.
- Mejjaoli H. Hardy-type inequalities associated with the Weinstein operator. J Inequal Appl. 2015;267. DOI:10.1186/s13660-015-0779-0
- Chettaoui C, Trimeche K. Bochner-Hecke theorems for the Weinstein transform and application. Fract Calc Appl Anal. 2010;13(3):261–280.
- Mejjaoli H, Salhi M. Uncertainty principles for the Weinstein transform. Czechoslovak Math J. 2011;61(4):941–974. doi: 10.1007/s10587-011-0061-7
- Ben Salem N, Nasr AR. The Littlewood-Paley g-function associated with the Weinstein operator. Integral Transforms Spec Funct. 2016;27(11):846–865. doi: 10.1080/10652469.2016.1227328
- Calderón AP. Inequalities for the maximal function relative to a metric. Studia Math. 1976;57:297–306.
- Rubio de Francia JL, Ruiz FJ, Torrea JL. Calderón–Zygmund theory for operator-valued kernels. Adv Math. 1986;62:7–48. doi: 10.1016/0001-8708(86)90086-1
- Ruiz F, Torrea JL. Vector-valued Calderón–Zygmund theory and Carleson measures on spaces of homogeneous nature. Studia Math. 1988;88:221–243.
- Duoandikoetxea J. Fourier analysis. Graduate Studies in Math., Vol. 29. Providence (RI): Amer. Math. Soc.; 2001.