kw.\*:("PROCESSUS ROBBINS-MONRO")
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A MODIFICATION OF THE ROBBINS-MONRO PROCESS.KOMLOS J; REVESZ P.1973; STUD. SCI. MATH. HUNGAR.; HONGR.; DA. 1973; VOL. 8; NO 3-4; PP. 329-340; BIBL. 7 REF.Article
ALMOST SURE CONVERGENCE FOR THE ROBBINS-MONRO PROCESS.GOODSELL CA; HANSON DL.1976; ANN. PROBAB.; U.S.A.; DA. 1976; VOL. 4; NO 6; PP. 890-901; BIBL. 13 REF.Article
ALMOST SURE APPROXIMATION OF THE ROBBINS-MONRO PROCESS BY SUMS OF INDEPEDENT RANDOM VARIABLES.KERSTING G.1977; ANN. PROBAB.; U.S.A.; DA. 1977; VOL. 5; NO 6; PP. 954-965; BIBL. 12 REF.Article
STETIGE STOCHASTISCHE APPROXIMATION = APPROXIMATION STOCHASTIQUE CONTINUEPFLUG G.1979; METRIKA; DEU; DA. 1979; VOL. 26; NO 3; PP. 139-150; BIBL. 8 REF.Article
Estimating conditional quantiles at the root of a regression functionMUKERJEE, H.Annals of statistics. 1992, Vol 20, Num 4, pp 2168-2176, issn 0090-5364Article
Estimating confidence intervals by the Robbins-Monro search processBUCKLAND, S. T; GARTHWAITE, P. H.Applied statistics. 1990, Vol 39, Num 3, pp 413-424, issn 0035-9254, 12 p.Article
Statistical properties and control algorithms of recursive quantile estimatorsMÖLLER, Eva; GRIESZBACH, Gert; SCHACK, Bärbel et al.Biometrical journal. 2000, Vol 42, Num 6, pp 729-746, issn 0323-3847Article