A. Bacciotti, Local stabilizability of nonlinear control systems, Series on Advances in Mathematics for Applied Sciences. 8. Singapore, World Scientific. [A well written and easy to read introduction to the stabilization of control systems], 1992.
DOI : 10.1142/1446

G. Bastin and D. Dochain, On-line Estimation and Adaptive Control of Bioreactors, 379 pBioreactor models have specific structures which are thoroughly considered in this book, particular, the theory of asymptotic observers is well developed and applied to bioreactors, 1990.

O. Bernard, G. Sallet, and A. Sciandra, Nonlinear observers for a class of biological systems: application to validation of a phytoplanktonic growth model, IEEE Transactions on Automatic Control, vol.43, issue.8, 1998.
DOI : 10.1109/9.704977

. Automat, [This paper deals with the observability of some biological systems like Trophic chains and Leslie-type systems. It also presents an application of the observers theory to a particular biological system in order to estimate some state variables that can not be measured, pp.43-1056

G. Bornard, F. Celle-couenne, and G. Gilles, Observabilité et observateurs. Systèmes non linéaires, 1. modélisation -estimation, 1993.

R. W. Brockett, . Ed, R. W. Brockett, R. S. Millmann, and H. J. Sussmann, Asymptotic stability and feedback stabilization. in Differential Geometric Control Theory, pp.181-191, 1983.

. Birkhäuser, [This seminal article gives some necessary conditions for the existence of a stabilizing feedback for a nonlinear system

J. Gauthier, H. Hammouri, and S. Othman, A simple observer for nonlinear systems applications to bioreactors, IEEE Transactions on Automatic Control, vol.37, issue.6, pp.875-880, 1992.
DOI : 10.1109/9.256352

J. Gauthier and I. Kupka, Deterministic Observation Theory and Applications [This self contained book presents the theoretical foundations of observability. It provides very general results in the construction of exponential observers for nonlinear systems. This monograph requires a good background in differential geometry, 2001.

V. Jurdjevic, Geometric control theory, 492 p. Cambridge Studies in Advanced Mathematics. 52, This book presents the essential aspects of nonlinear control theory including optimal control], 1997.

H. Nijmeijer and A. J. Van-der-schaft, Nonlinear Dynamical Control Systems, 467 ppThis book presents many techniques for the study of inputoutput nonlinear systems, 1990.

S. Touzeau and J. Gouzé, On the stock-recruitment relationships in fish population models. Environmental modelling and assessment, This article gives a stage-structured model of a fish population, pp.87-93, 1998.