On Some Asymptotic Properties and an Almost Sure Approximation of the Normalized Inverse-Gaussian Process
classification
🧮 math.ST
stat.TH
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processinverse-gaussiannormalizedalmostapproximationasymptoticlargeproperties
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In this paper, we present some asymptotic properties of the normalized inverse-Gaussian process. In particular, when the concentration parameter is large, we establish an analogue of the empirical functional central limit theorem, the strong law of large numbers and the Glivenko-Cantelli theorem for the normalized inverse-Gaussian process and its corresponding quantile process. We also derive a finite sum-representation that converges almost surely to the Ferguson and Klass representation of the normalized inverse-Gaussian process. This almost sure approximation can be used to simulate efficiently the normalized inverse-Gaussian process.
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