In 1999 Nina Zorboska and in 2003 P. S. Bourdon, D. Levi, S. K. Narayan and J. H. Shapiro investigated the essentially normal composition operator $C_{\varphi }$, when $\varphi$ is a linear-fractional self-map of $𝔻$. In this paper first, we investigate the essential normality problem for the operator $T_w{C}_{\varphi }$ on the Hardy space $H^2$, where $w$ is a bounded measurable function on $\partial 𝔻$ which is continuous at each point of $F\left(\varphi \right)$, $\varphi \in 𝒮\left(2\right)$, and $T_w$ is the Toeplitz operator with symbol $w$. Then we use these results and characterize the essentially normal...

We complete the different cases remaining in the estimation of the essential norm of a weighted composition operator acting between the Hardy spaces $H^p$ and $H^q$ for 1 ≤ p,q ≤ ∞. In particular we give some estimates for the cases 1 = p ≤ q ≤ ∞ and 1 ≤ q < p ≤ ∞.

The main purpose of this work is to establish some logarithmic estimates of optimal type in the Hardy-Sobolev space $H^{k,\infty }$; $k\in {\mathbb{N}}^{*}$ of an annular domain. These results are considered as a continuation of a previous study in the setting of the unit disk by L. Baratchart and M. Zerner, On the recovery of functions from pointwise boundary values in a Hardy-Sobolev class of the disk, J. Comput. Appl. Math. 46 (1993), 255–269 and by S. Chaabane and I. Feki, Optimal logarithmic estimates in Hardy-Sobolev spaces...