Parties d'ouvrages collectifs (42)
22.
Hallin, M. (2001). Rank tests. In J. Zidek (Ed.), Encyclopedia of environmetrics: statistical theory and methods, volume 3 (pp. 1690-1706). New York: J. Wiley.
23.
Hallin, M., & Tribel, O. (2000). The efficiency of some nonparametric competitors to correlogram-based methods. In Game theory, optimal stopping, probability, and statistics: papers in honor of T.S. Ferguson on the occasion of his 70th birthday (pp. 249-262). Beachwood: Institute of Mathematical Statistics.(I.M.S. Lecture Notes-Monograph Series).
24.
Hallin, M., & Werker, B. (1998). Optimal testing for semiparametric autoregressive models: from Gaussian Lagrange multipliers to regression rank scores and adaptive tests. In N. Mendes Lopes & E. Gonçalves (Eds.), On nonparametric and semiparametric statistics (pp. 1-63). Coimbra: Centro Internacional de Mathemática.
25.
Hallin, M., & Werker, B. (1998). Optimal testing for semiparametric autoregressive models: from Gaussian Lagrange multipliers to regression rank scores and adaptive tests. In S. Ghosh (Ed.), Asymptotics, nonparametrics, and time series (pp. 295-358). New York: M. Dekker.
26.
Hallin, M., & Mizera, I. (1997). Unimodality and the asymptotics of M-estimators. In Y. Dodge (Ed.), L1 statistical procedures and related topics (pp. 47-56). Institute of Mathematical Statistics.(I.M.S. Lecture Notes-Monograph Series).
27.
Hallin, M., & Vermandele, C. (1996). A simple proof of asymptotic normality for simple serial rank statistics. In E. Brunner & M. Denker (Eds.), Research developments in probability and statistics: Festschrift in honor of Madan L. Puri on the occasion of his 65th birthday (pp. 163-191). Utrecht: VSP.
28.
Hallin, M., & Seoh, M. (1996). Is 131,000 a large sample size?: a numerical study of Edgeworth expansions. In E. Brunner & M. Denker (Eds.), Research developments in probability and statistics: Festschrift in Honor of Madan L. Puri on the occasion of his 65th birthday (pp. 141-161). Utrecht: VSP.
29.
Hallin, M., & El Matouat, A. (1996). Order selection, stochastic complexity and Kullback-Leibler information. In J. P. Robinson & M. Rosenblatt (Eds.), Athens conference on applied probability and time series analysis: time series analysis in memory of E. J. Hannan (pp. 291-299). Springer-Verlag.(Lecture Notes in Statistics).
30.
Hallin, M. (1996). Tests sans biais, tests de permutation, tests invariants, tests de rangs. In J.-J. Droesbeke & J. Fine (Eds.), Inférence non paramétrique fondée sur les rangs (pp. 101-128). Bruxelles: Editions de l'Université de Bruxelles.
31.
Hallin, M., & Barbe, P. (1996). Statistiques de rangs linéaires: normalité asymptotique et théorèmes de projection de Hájek. In J.-J. Droesbeke & J. Fine (Eds.), Inférence non paramétrique fondée sur les rangs (pp. 101-128). Bruxelles: Editions de l'Université de Bruxelles.
32.
Hallin, M. (1996). Eléments de la théorie asymptotique des expériences statistiques. In J.-J. Droesbeke & J. Fine (Eds.), Inférence non paramétrique fondée sur les rangs (pp. 101-128). Bruxelles: Editions de l'Université de Bruxelles.
33.
Hallin, M. (1996). Tests de rangs et tests de rangs signés pour le modèle linéaire général et les modèles autorégressifs. In J.-J. Droesbeke & J. Fine (Eds.), Inférence non paramétrique fondée sur les rangs (pp. 101-128). Bruxelles: Editions de l'Université de Bruxelles.