Limit theorems for some long range random walks on torsion free nilpotent groups
Abstract
We consider a natural class of long range random walks on torsion free nilpotent groups and develop limit theorems for these walks. Given the original discrete group and a random walk (Sn) n1 driven by a certain type of symmetric probability measure μ, we construct a homogeneous nilpotent Lie group G(,μ) which carries an adapted dilation structure and a stable-like process (Xt) t0 which appears in a Donsker-type functional limit theorem as the limit of a rescaled version of the random walk. Both the limit group and the limit process on that group depend on the measure μ. In addition, the functional limit theorem is complemented by a local limit theorem.
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