CONDITIONAL LEAST SQUARES ESTIMATION IN NONSTATIONARY NONLINEAR STOCHASTIC REGRESSION MODELS
成果类型:
Article
署名作者:
Jacob, Christine
署名单位:
INRAE; Universite Paris Saclay
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/09-AOS733
发表日期:
2010
页码:
566-597
关键词:
dependent branching-process
polymerase-chain-reaction
asymptotic properties
strong consistency
quasi-likelihood
pcr
identification
parameters
摘要:
Let {Z(n)} be a real nonstationary stochastic process such that E(Z(n)vertical bar Fn-1) <(a.s.) infinity and E(Z(n)(2)vertical bar Fn-1) <(a.s.) infinity, where {F-n} is an increasing sequence of sigma-algebras. Assuming that E(Z(n)vertical bar Fn-1) = gn(theta(0), nu(0)) = g(n)((1))(theta(0)) + g(n)((2))(theta(0), nu(0)), theta(0) is an element of R-p, p < infinity, nu(0) is an element of R-q and q <= infinity, we study the symptotic properties of <(theta)over cap>(n) := arg min(theta) Sigma(n)(k=1) (Z(k) = g(k)(theta, (nu) over cap))(2)lambda(-1)(k), where lambda(k) is Fk-1-measurable, (nu) over cap = {(nu) over cap (k)} is a sequence of estimations of nu(0), g(n)(theta, (nu) over cap) is Lipschits in theta and g(n)((2))(theta(0), (nu) over cap) - g(n)((2))(theta, (nu) over cap) is asymptotically negligible relative to g(n)((1))(theta(0)) - g(n)((1)) (theta). We first generalize to this nonlinear stochastic model the necessary and sufficient condition obtained for the strong consistency of {(theta) over cap (n)} in the linear model. For that, we prove a strong law of large numbers for a class of submartingales. Again using this strong law, we derive the general conditions leading to the asymptotic distribution of (theta) over cap (n). We illustrate the theoretical results with examples of branching processes, and extension to quasi-likelihood estimators is also considered.
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