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Abstract

In this paper, we mainly investigate a class of Kolmogorov-Fokker-Planck operator with 4 different scalings in nondivergence form. And we assume the coefficients $a^{ij}$ are only measurable in $t$ and satisfy the vanishing mean oscillation in space variables. We establish a global priori estimates of $\nabla_x^u$, $( -\Delta_y )^{1/3} u$ and $( -\Delta_z )^{1/5} u$ in $L^p$ space which extend the work of Dong and Yastrzhembskiy \cite{ref49} where they focus on the 3 different scalings KFP operator. Moreover we establish a kind of Poincare inequality for homogeneous equations.