How to estimate the memory of the elephant random walk

We introduce an original way to estimate the memory parameter of the elephant random walk, a fascinating discrete time random walk on integers having a complete memory of its entire history. Our estimator is nothing more than a quasi-maximum likelihood estimator, based on a second order Taylor approximation of the log-likelihood function. We show the almost sure convergence of our estimate in the diffusive, critical and superdiffusive regimes. The local asymptotic normality of our statistical procedure is established in the diffusive regime, while the local asymptotic mixed normality is proven in the superdiffusive regime. Asymptotic and exact confidence intervals as well as statistical tests are also provided. All our analysis relies on asymptotic results for martingales and the quadratic variations associated. MSC: primary 60G50; secondary 60G42; 62M09

[1]  Cristian F. Coletti,et al.  A strong invariance principle for the elephant random walk , 2017, 1707.06905.

[2]  Q. Shao Almost sure invariance principles for mixing sequences of random variables , 1993 .

[3]  B. Bercu A martingale approach for the elephant random walk , 2017, 1707.04130.

[4]  Stephen S. Wilson,et al.  Random iterative models , 1996 .

[5]  J. Bertoin Counterbalancing steps at random in a random walk. , 2020, 2011.14069.

[6]  Jun Yan Survival Analysis: Techniques for Censored and Truncated Data , 2004 .

[7]  B. Delyon,et al.  Concentration Inequalities for Sums and Martingales , 2015 .

[8]  Cristian F. Coletti,et al.  Asymptotic analysis of the elephant random walk , 2019, 1910.03142.

[9]  P. Hall,et al.  Martingale Limit Theory and Its Application , 1980 .

[10]  Cristian F. Coletti,et al.  Central limit theorem and related results for the elephant random walk , 2016, 1608.01662.

[11]  Steffen Trimper,et al.  Elephants can always remember: exact long-range memory effects in a non-Markovian random walk. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[12]  Masato Takei,et al.  Limit Theorems for the ‘Laziest’ Minimal Random Walk Model of Elephant Type , 2020, 2003.04441.

[13]  Wenbo V. Li Limit theorems for the square integral of Brownian motion and its increments , 1992 .

[14]  C. C. Heyde,et al.  Remarks on efficiency in estimation for branching processes , 1975 .

[15]  Víctor Hugo Vázquez Guevara On the almost sure central limit theorem for the elephant random walk , 2019, Journal of Physics A: Mathematical and Theoretical.

[16]  Haijuan Hu,et al.  Cramér moderate deviations for the elephant random walk , 2021 .

[17]  J. Bertoin,et al.  Elephant random walks and their connection to Pólya-type urns. , 2016, Physical review. E.