On the equivalence of Lp-parabolicity and Lq-liouville property on weighted graphs

Abstract: We study the relationship between the $L^p$-parabolicity, the $L^q$-Liouville property for positive superharmonic functions, and the existence of nonharmonic positive solutions to the system \begin{align*} \left{ \begin{array}{lr} -\Delta u\geq 0, \Delta(|\Delta u|^{p-2}\Delta u)\geq 0, \end{array} \right. \end{align*} on weighted graphs, where $1\leq p< \infty$ and $(p, q)$ are H\"{o}lder conjugate exponent pair. Moreover, some new technique is developed to establish the estimate of green function under volume doubling and Poincar\'{e} inequality conditions, and the sharp volume growth conditions for the $L^p$-parabolicity can be derived on some graphs.