Clarkson-McCarthy inequality on a locally compact group (2502.19188v1)

Abstract: Let $G$ be a locally compact group, $\mu$ its Haar measure, $\hat G$ its Pontryagin dual and $\nu$ the dual measure. For any $A_\theta\in L^1(G;\mathcal C_p)\cap L^2(G;\mathcal C_p)$, ($\mathcal C_p$ is Schatten ideal), and $1<p\le2$ we prove $$\int_{\hat G}\left|\int_GA_\theta\overline{\xi(\theta)}\,\mathrm d\mu(\theta)\right|p^q\,\mathrm d\nu(\xi)\le \left(\int_G|A\theta|_p^p\,\mathrm d\mu(\theta)\right)^{q/p}, $$ where $q=p/(p-1)$. This appears to be a generalization of some earlier obtained inequalities, including Clarkson-McCarthy inequalities (in the case $G=\mathbf Z_2$), and Hausdorff-Young inequality. Some corollaries are also given.