We study singular integral operators with variable Calderón--Zygmund kernels and their commutators with $VMO$ functions in the framework of Orlicz spaces. After revisiting the classical $L^p$ theory, we establish boundedness results in $L^\Phi$ under standard $\Delta_2$ and $\nabla_2$ conditions on the Young function. The proofs rely on decomposition techniques and weak-type estimates. As an application, these results provide a functional-analytic foundation for a priori estimates and interior regularity of solutions to higher-order elliptic operators with discontinuous coefficients.
Interior a priori estimates for higher order elliptic systems in Orlicz spaces
Amiran GogatishviliMembro del Collaboration Group
;Pia SalernoMembro del Collaboration Group
;Lyoubomira Softova
Membro del Collaboration Group
2026
Abstract
We study singular integral operators with variable Calderón--Zygmund kernels and their commutators with $VMO$ functions in the framework of Orlicz spaces. After revisiting the classical $L^p$ theory, we establish boundedness results in $L^\Phi$ under standard $\Delta_2$ and $\nabla_2$ conditions on the Young function. The proofs rely on decomposition techniques and weak-type estimates. As an application, these results provide a functional-analytic foundation for a priori estimates and interior regularity of solutions to higher-order elliptic operators with discontinuous coefficients.File in questo prodotto:
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