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Glasnik matematički, Vol. 59 No. 1, 2024.

Izvorni znanstveni članak

https://doi.org/10.3336/gm.59.1.10

An approximate maximum likelihood estimator of drift parameters in a multidimensional diffusion model

Miljenko Huzak ; Department of Mathematics, Faculty of Science, University of Zagreb, 10 000 Zagreb, Croatia
Snježana Lubura Strunjak ; Department of Mathematics, Faculty of Science, University of Zagreb, 10 000 Zagreb, Croatia
Andreja Vlahek vStrok ; Faculty of Chemical Engineering and Technology, University of Zagreb, 10 000 Zagreb, Croatia

Puni tekst: engleski pdf 596 Kb

str. 213-258

preuzimanja: 106

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Sažetak

For a fixed \(T\) and \(k \geq 2\), a \(k\)-dimensional vector stochastic differential equation \(dX_t=\mu(X_t, \theta)\,dt+\nu(X_t)\,dW_t,\) is studied over a time interval \([0,T]\). Vector of drift parameters \(\theta\) is unknown. The dependence in \(\theta\) is in general nonlinear. We prove that the difference between approximate maximum likelihood estimator of the drift parameter \(\overline{\theta}_n\equiv \overline{\theta}_{n,T}\) obtained from discrete observations \((X_{i\Delta_n}, 0 \leq i \leq n)\) and maximum likelihood estimator \(\hat{\theta}\equiv \hat{\theta}_T\) obtained from continuous observations \((X_t, 0\leq t\leq T)\), when \(\Delta_n=T/n\) tends to zero, converges stably in law to the mixed normal random vector with covariance matrix that depends on \(\hat{\theta}\) and on path \((X_t, 0 \leq t\leq T)\). The uniform ellipticity of diffusion matrix \(S(x)=\nu(x)\nu(x)^T\) emerges as the main assumption on the diffusion coefficient function.

Ključne riječi

Multidimensional diffusion processes, maximum likelihood estimation, uniform ellipticity, asymptotic mixed normality

Hrčak ID:

318148

URI

https://hrcak.srce.hr/318148

Datum izdavanja:

21.11.2024.

Posjeta: 279 *

Publication date: 20 June 2024

Volume: Vol 59

Issue: Svezak 1

Pages: 213-258

DOI: 10.3336/gm.59.1.10

Article Information (continued)

Categories:

Subject: Izvorni znanstveni članak

Keywords:

Keyword: Multidimensional diffusion processes, maximum likelihood estimation, uniform ellipticity, asymptotic mixed normality

An approximate maximum likelihood estimator of drift parameters in a multidimensional diffusion model

Miljenko Huzak[1]

Email: miljenko.huzak@math.hr

Snježana Lubura Strunjak[2]

Email: snjezana.lubura.strunjak@math.hr

Andreja Vlahek vStrok[3]

Email: avlahek@fkit.hr

 

[1] Department of Mathematics, Faculty of Science, University of Zagreb, 10 000 Zagreb, Croatia

[2] Department of Mathematics, Faculty of Science, University of Zagreb, 10 000 Zagreb, Croatia

[3] Faculty of Chemical Engineering and Technology, University of Zagreb, 10 000 Zagreb, Croatia

Abstract

For a fixed \(T\) and \(k \geq 2\), a \(k\)-dimensional vector stochastic differential equation \(dX_t=\mu(X_t, \theta)\,dt+\nu(X_t)\,dW_t,\) is studied over a time interval \([0,T]\). Vector of drift parameters \(\theta\) is unknown. The dependence in \(\theta\) is in general nonlinear. We prove that the difference between approximate maximum likelihood estimator of the drift parameter \(\overline{\theta}_n\equiv \overline{\theta}_{n,T}\) obtained from discrete observations \((X_{i\Delta_n}, 0 \leq i \leq n)\) and maximum likelihood estimator \(\hat{\theta}\equiv \hat{\theta}_T\) obtained from continuous observations \((X_t, 0\leq t\leq T)\), when \(\Delta_n=T/n\) tends to zero, converges stably in law to the mixed normal random vector with covariance matrix that depends on \(\hat{\theta}\) and on path \((X_t, 0 \leq t\leq T)\). The uniform ellipticity of diffusion matrix \(S(x)=\nu(x)\nu(x)^T\) emerges as the main assumption on the diffusion coefficient function.

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