Multiple points of operator semistable L\'evy processes

We determine the Hausdorff dimension of $k$-multiple points for a symmetric operator semistable L\'evy process $X=\{X(t), t\in\mathbb{R}_+\}$ in terms of the eigenvalues of its stability exponent. We also give a necessary and sufficient condition for the existence of $k$-multiple points. Our results extend to all $k\geq2$ the recent work [23], where the set of double points $(k = 2)$ was studied in the symmetric operator stable case.