Non-asymptotic estimates for accelerated high order Langevin Monte Carlo
algorithms
Non-asymptotic estimates for accelerated high order Langevin Monte Carlo
algorithms
In this paper, we propose two new algorithms, namely aHOLA and aHOLLA, to sample from high-dimensional target distributions with possibly super-linearly growing potentials. We establish non-asymptotic convergence bounds for aHOLA in Wasserstein-1 and Wasserstein-2 distances with rates of convergence equal to $1+q/2$ and $1/2+q/4$, respectively, under a local H\"{o}lder condition …