The Real Characterization of $H_{\lambda}^p(\mathbb R_+^2)$ for $\frac{2\lambda}{2\lambda+1}<p\leq1$

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Contribution

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Abstract

For $p>p_0=\frac{2\lambda}{2\lambda+1}$ with $\lambda>0$, the Hardy space $H_{\lambda}^p(\mathbb R_+^2)$ associated with the Dunkl transform $\mathcal{F}_\lambda$ and the Dunkl operator $D$ on the real line $\mathbb R$, where $D_xf(x)=f'(x)+\frac{\lambda}{x}[f(x)-f(-x)]$, is the set of functions $F=u+iv$ on the upper half plane $\mathbb R^2_+=\left\{(x, y): x\in\mathbb R, y>0\right\}$, satisfying $\lambda$-Cauchy-Riemann equations: $ D_xu-\partial_y v=0$, $\partial_y u +D_xv=0$, and $\sup\limits_{y>0}\int_{\mathbb R}|F(x+iy)|^p|x|^{2\lambda}dx<\infty$. In this paper, we will give a further characterization of $H_{\lambda}^p(\mathbb R_+^2)$ in \cite{ZhongKai Li 3}. We prove the inequality $\|F\|_{H_{\lambda}^p(\mathbb R_+^2)}\leq c\|u_{\nabla}^*\|_{L^p_{\lambda}}$, which gives a Real Characterization of the class $H_{\lambda}^p(\mathbb R_+^2)$ for $\frac{2\lambda}{2\lambda+1}<p\leq1$ as a main result.