English

Swap-invariant and exchangeable random measures

Probability 2016-07-06 v3 Dynamical Systems Statistics Theory Statistics Theory

Abstract

In this work we analyze the concept of swap-invariance, which is a weaker variant of exchangeability. A random vector ξ\xi in Rn\mathbb{R}^n is called swap-invariant if E ⁣jujξj\,{\mathbf E}\,\big| \!\sum_j u_j \xi_j \big|\, is invariant under all permutations of (ξ1,,ξn)(\xi_1, \ldots, \xi_n) for each uRnu \in \mathbb{R}^n. We extend this notion to random measures. For a swap-invariant random measure ξ\xi on a measure space (S,S,μ)(S,\mathcal{S},\mu) the vector (ξ(A1),,ξ(An))(\xi(A_1), \ldots, \xi(A_n)) is swap-invariant for all disjoint AjSA_j \in \mathcal{S} with equal μ\mu-measure. Various characterizations of swap-invariant random measures and connections to exchangeable ones are established. We prove the ergodic theorem for swap-invariant random measures and derive a representation in terms of the ergodic limit and an exchangeable random measure. Moreover we show that diffuse swap-invariant random measures on a Borel space are trivial. As for random sequences two new representations are obtained using different ergodic limits.

Keywords

Cite

@article{arxiv.1602.07666,
  title  = {Swap-invariant and exchangeable random measures},
  author = {Felix Nagel},
  journal= {arXiv preprint arXiv:1602.07666},
  year   = {2016}
}

Comments

30 pages; v2: variant of ergodic theorem and example added, minor changes in text; v3: structure changed, theorems slightly improved

R2 v1 2026-06-22T12:57:08.120Z