Functional Relations, Random Coefficients, and Nonlinear Regression with Application to Kinetic Data pp 71-97 | Cite as

# Non Linear Regression

Chapter

## Abstract

Let Y ~ N. We shall assume that θ is compact with interior points and that f is injective and continuous. We further assume that f is twice continuously differentiable at interior points. Such a hypothesis will be called smooth.

_{n}(ξ, σ^{2}I) and assume that we have the following specification of the Mean$$\xi = f\left( \theta \right),\theta \in \theta \subset R^P$$

(5.5)

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## Copyright information

© Springer-Verlag New York Inc. 1984