English

Power variations for fractional type infinitely divisible random fields

Probability 2022-02-22 v3

Abstract

This paper presents new limit theorems for power variation of fractional type symmetric infinitely divisible random fields. More specifically, the random field X=(X(t))t[0,1]dX = (X(\boldsymbol{t}))_{\boldsymbol{t} \in [0,1]^d} is defined as an integral of a kernel function gg with respect to a symmetric infinitely divisible random measure LL and is observed on a grid with mesh size n1n^{-1}. As nn \to \infty, the first order limits are obtained for power variation statistics constructed from rectangular increments of XX. The present work is mostly related to Basse-O'Connor, Lachi\`eze-Rey, Podolskij (2017), Basse-O'Connor, Heinrich, Podolskij (2019), who studied a similar problem in the case d=1d=1. We will see, however, that the asymptotic theory in the random field setting is much richer compared to Basse-O'Connor, Lachi\`eze-Rey, Podolskij (2017), Basse-O'Connor, Heinrich, Podolskij (2019) as it contains new limits, which depend on the precise structure of the kernel gg. We will give some important examples including the L\'evy moving average field, the well-balanced symmetric linear fractional β\beta-stable sheet, and the moving average fractional β\beta-stable field, and discuss potential consequences for statistical inference.

Keywords

Cite

@article{arxiv.2008.01412,
  title  = {Power variations for fractional type infinitely divisible random fields},
  author = {Andreas Basse-O'Connor and Vytautė Pilipauskaitė and Mark Podolskij},
  journal= {arXiv preprint arXiv:2008.01412},
  year   = {2022}
}
R2 v1 2026-06-23T17:37:37.039Z