2001
DOI: 10.1016/s0165-1765(01)00514-6
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On non-contemporaneous short-run co-movements

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Cited by 45 publications
(59 citation statements)
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“…The number of studies of comovements among stationary time series has increased considerably since the 1990s, and the different common features that have been defined and proposed include codependence (Gourieroux et al, 1991) and polynomial serial correlation (Cubadda & Hecq, 2001). Most of these features can be encompassed in the notion of the weak form of polynomial serial correlation proposed by Cubadda (2007).…”
Section: Theoretical Efficiency Estimation Uncertainty and Relevant mentioning
confidence: 99%
“…The number of studies of comovements among stationary time series has increased considerably since the 1990s, and the different common features that have been defined and proposed include codependence (Gourieroux et al, 1991) and polynomial serial correlation (Cubadda & Hecq, 2001). Most of these features can be encompassed in the notion of the weak form of polynomial serial correlation proposed by Cubadda (2007).…”
Section: Theoretical Efficiency Estimation Uncertainty and Relevant mentioning
confidence: 99%
“…As shown by Vahid and Engle (1993), the presence of s SCCF's is equivalent to the existence of (n s) common and synchronous cycles 5 .…”
Section: Accepted M Manuscriptmentioning
confidence: 92%
“…In order to allow for adjustment delays, Cubadda and Hecq (2001) propose to look at the presence of non-synchronous common cycles in the context of the polynomial serial correlation common feature (PSCCF hereafter) modeling. In this framework there exists a full-rank (N × s) matrix δ 0 such that under the null hypothesis that PSCCF of…”
Section: Synchronous and Non-synchronous Common Cyclesmentioning
confidence: 99%
“…These three clusters will be obtained thanks to a measure of the degree of cyclical commonality among the various economies. In particular, the first group is such that there is a common synchronous cycle among these N 1 time series (Engle and Kozicki, 1993;Vahid and Engle, 1993); the N 2 variables of the second group share a non-synchronous common cycle (Cubadda and Hecq, 2001), and the last group comprises N 3 series with idiosyncratic short-run dynamics. For small dimensional systems, a VAR analysis with additional reduced rank restrictions can be undertaken to discover these groups (Cubadda, 2007b).…”
Section: Introductionmentioning
confidence: 99%