The Littlewood-Paley-Stein inequality for Dirichlet space tamed by signed measured curvature lower bounds
Abstract
The notion of tamed Dirichlet space by distributional lower Ricci curvature bounds was proposed by Erbar--Rigoni--Sturm--Tamanini as the Dirichlet space having a weak form of Bakry--\'Emery curvature lower bounds in distribution sense. In this framework, we establish the Littlewood--Paley--Stein inequality for Lp-functions which partially generalizes the result by Kawabi--Miyokawa.
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