Marc Arnaudon, Clément Dombry, Anthony Phan, Le Yang
Published 2011-06-25Version 1
Consider a probability measure supported by a regular geodesic ball in a manifold. For any p larger than or equal to 1 we define a stochastic algorithm which converges almost surely to the p-mean of the measure. Assuming furthermore that the functional to minimize is regular around the p-mean, we prove that a natural renormalization of the inhomogeneous Markov chain converges in law into an inhomogeneous diffusion process. We give an explicit expression of this process, as well as its local characteristic.
Equivalence of two orthogonalities between probability measures
Semigroups related to additive and multiplicative, free and Boolean convolutions
Construction of an Edwards' probability measure on $\mathcal{C}(\mathbb{R}_+,\mathbb{R})$
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