We prove that a snapping-out Brownian motion with large permeability coefficients is a good approximation of Walsh’s spider process on the star-like graph K₁, ₊. Thus, the latter process can be seen as a Brownian motion perturbed by a trace of semi-permeable membrane at the graph’s center. Besides convergence of processes and semigroups we establish, via the Lord Kelvin method of images and analysis of ergodic properties of matrices involved, convergence of cosine families underlying the semigroups and thus gain additional insight into the approximation theorem.
Bobrowski et al. (Wed,) studied this question.