Autoregressive conditional duration

From Wikipedia, the free encyclopedia

In Financial Econometrics, an autoregressive conditional duration (ACD, Engle and Russell (1998)) model considers irregularly spaced and autocorrelated intertrade durations. ACD is analogous to GARCH. Indeed, in a continuous double auction (a common trading mechanism in many financial markets) waiting times between two consecutive trades vary at random.

[edit] Definition

Specifically, let $~\tau_t~$ denote the duration (the waiting time between consecutive trades) and assume that $~\tau_t=\theta_t z_t ~$ , where $z_t \sim iid~$ , positive and with $\operatorname{E}(z_t) = 1$ and where the series $~\theta_t~$ is given by

$\theta_t = \alpha_0 + \alpha_1 \tau_{t-1} + \cdots + \alpha_q \tau_{t-q} + \beta_1 \theta_{t-1} + \cdots + \beta_p\theta_{t-p} = \alpha_0 + \sum_{i=1}^q \alpha_i \tau_{t-i} + \sum_{i=1}^p \beta_i \theta_{t-i}$

and where $~\alpha_0>0~$ , $\alpha_i\ge 0$ , $\beta_i \ge 0$ , $~i>0$ .

[edit] References

Robert F. Engle and J.R. Russell. "Autoregressive Conditional Duration: A New Model for Irregularly Spaced Transaction Data", Econometrica, 66:1127-1162, 1998.

Autoregressive conditional duration

From Wikipedia, the free encyclopedia

[edit] Definition

[edit] References

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