Growth of the Fourier transforms of the weak Hardy spaces (Q1902254)

In this note we estimate the growth of the Fourier transforms of the weak Hardy spaces on the Heisenberg group. Theorem 1. Let \(f\in WH^p (\mathbb{H}^n)\), \(0< p<1\). Then \[ \| \widehat{f} (\lambda) F_{\lambda,\alpha} \|\leq C\| f\|_{WH^p} ((2| \alpha|+ n)|\lambda |)^{\frac{Q}{2} (\frac{1}{p}-1)}. \] Theorem 2. Let \(f\in WH^1 (\mathbb{H}^n)\). Then \[ \frac{1} {R^{n+1}} \int_{-\infty}^{+\infty} \sum_{0< (2| \alpha|+ n)| \lambda|\leq R} \exp\Biggl( \frac{\delta} {\| f\|_{WH^1}} \| \widehat{f} (\lambda) F_{\lambda,\alpha}\| \Biggr)| \lambda|^n d\lambda< \infty \] for some small constant \(\delta>0\). For notations and definitions see the original.