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Faster ARMA maximum likelihood estimation

Published 3 Nov 2016 in math.ST, stat.ME, and stat.TH | (1611.00965v1)

Abstract: A new likelihood based AR approximation is given for ARMA models. The usual algorithms for the computation of the likelihood of an ARMA model require $O(n)$ flops per function evaluation. Using our new approximation, an algorithm is developed which requires only $O(1)$ flops in repeated likelihood evaluations. In most cases, the new algorithm gives results identical to or very close to the exact maximum likelihood estimate (MLE). This algorithm is easily implemented in high level Quantitative Programming Environments (QPEs) such as {\it Mathematica\/}, MatLab and R. In order to obtain reasonable speed, previous ARMA maximum likelihood algorithms are usually implemented in C or some other machine efficient language. With our algorithm it is easy to do maximum likelihood estimation for long time series directly in the QPE of your choice. The new algorithm is extended to obtain the MLE for the mean parameter. Simulation experiments which illustrate the effectiveness of the new algorithm are discussed. {\it Mathematica\/} and R packages which implement the algorithm discussed in this paper are available (McLeod and Zhang, 2007). Based on these package implementations, it is expected that the interested researcher would be able to implement this algorithm in other QPE's.

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