From boundary random walks to Feller's Brownian Motions
Abstract
We establish an invariance principle connecting boundary random walks on N with Feller's Brownian motions on [0,∞). A Feller's Brownian motion is a Feller process on [0,∞) whose excursions away from the boundary 0 coincide with those of a killed Brownian motion, while its behavior at the boundary is characterized by a quadruple (p1,p2,p3,p4). This class encompasses many classical models, including absorbed, reflected, elastic, and sticky Brownian motions, and further allows boundary jumps from 0 governed by the measure p4. For any Feller's Brownian motion that is not purely driven by jumps at the boundary, we construct a sequence of boundary random walks whose appropriately rescaled processes converge weakly to the given Feller's Brownian motion.
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