Multistable L\'evy motions and their continuous approximations

Multistable L\'evy motions are extensions of L\'evy motions where the stability index is allowed to vary in time. Several constructions of these processes have been introduced recently, based on Poisson and Ferguson-Klass-LePage series representations and on multistable measures. In this work, we prove a functional central limit theorem for the independent-increments multistable L\'evy motion, as well as of integrals with respect to these processes, using weighted sums of independent random variables. This allows us to construct continuous approximations of multistable L\'evy motions. In particular, we prove that multistable L\'evy motions are stochastic H\"older continuous and strongly localisable.