The joint limit distribution of partial maxima and partial sums of a heavy-tailed time series

The limits of the ratio of partial maxima and partial sums of an iid real-valued sequence have been studied since the 1959s. The limit theory is well understand since the 1980s; see for example the monograph by Bingham, Goldie, Teugels (1987). This theory is most interesting if the marginal distribution has innite variance. Then, roughly speaking, the maximum of a given sample and the sum have the same magnitude.
We will consider the innite variance case and assume stationarity of the underlying sequence. We will exploit regular variation calculus for stationary sequences. It is useful for describing clusters of  extremes. These represent the main dierence to the iid case. We provide results about the joint convergence of maxima and sums and, in turn, derive limit theory for their ratios. We also touch on related problems on self-normalization of partial sums such as present in sample autovoriances or
studentized sums.

Jointly with Olivier Wintenberger (Paris)

Personal Website of Thomas Mikosch

The talk also can be joined online via our ZOOM MEETING

Meeting room opens at: October 18, 2021 4.30 pm Vienna

Meeting ID: 928 1821 6086

Password: 156890