Reiteration Formulae for the Real Interpolation Method Including limiting ${\mathcal L}$ or ${\mathcal R}$ Spaces (2201.05568v1)

Abstract: We consider K-interpolation methods involving slowly varying functions. Let $\overline{A}{\theta,*}^{\mathcal{L}}$ and $\overline{A}{\theta,}^{\mathcal{R}}$ $(0\leq\theta\leq1)$ be the so called ${\mathcal{L}}$ or ${\mathcal{R}}$ limiting interpolation spaces which arise naturally in reiteration formulae for the limiting cases. We characterize the interpolation spaces $\Big(\overline{A}_{\theta_0,}^{\mathcal{L}}, \Big){\eta,r,a}$, $\Big(\overline{A}{\theta_0,}^{\mathcal{R}}, \Big)_{\eta,r,a}$, $\Big(, \overline{A}{\theta_1,*}^{\mathcal{L}}\Big){\eta,r,a}$, and $\Big(, \overline{A}_{\theta_1,}^{\mathcal{R}}\Big)_{\eta,r,a}$ $(0\leq\eta\leq1)$ for the limiting cases $\theta_0=0$ and $\theta_1=1$. This supplements the earlier papers of the authors, which only considered the case $0<\theta_0<\theta_1<1$. The proofs of most reiteration formulae are based on Holmstedt-type formulae. Applications to grand and small Lorentz spaces as well as to Lorentz-Karamata spaces are given.