AbstractMany real-life time series exhibit clusters of outlying observations that cannot be adequately modeled by a Gaussian distribution. Heavy-tailed distributions such as the Pareto distribution have proved useful in modeling a wide range of bursty phenomena that occur in areas as diverse as finance, insurance, telecommunications, meteorology, and hydrology. Regular variation provides a convenient and unified background for studying multivariate extremes when heavy tails are present. In this paper, we study the extreme value behavior of the space–time process given by Xt(s)=∑i=0∞ψi(s)Zt−i(s),s∈[0,1]d, where (Zt)t∈Z is an iid sequence of random fields on [0,1]d with values in the Skorokhod space D([0,1]d) of càdlàg functions on [0,1]d equ...