Sensitivity analysis for the reduction of complex metabolism models

For a given real n × n matrix A and initial vectors v 1 and w 1 , we examine the sensitivity of the tridiagonal matrix T and the biorthogonal sets of vectors of the Lanczos reduction to small changes in A, v 1 and w 1 . We also consider the sensitivity of the developing Krylov subspaces.

## Abstract The differential equations governing the propagation in time of the sensitivity matrix for a mathematical model given by a system of ordinary differential equations are derived. These equations are used to perform a statistical sensitivity analysis of models for chemical reactors. The b

Complex transfer function models of chemical plant can be reduced to simple models using the method of moments. Two such simple transfer function models are and G(s) = exp [-,sl (1+7qS)(1+T3S) G(s) = exp 1~~~1 (1+7\*s)"' The three parameters of the simple model are obtained by matching the first thr