In life sciences, deriving insights from dynamic models can be challenging due to the large number of state variables involved. To address this, model reduction techniques can be used to project the system onto a lower-dimensional state space. Constrained lumping can reduce systems of ordinary differential equations with polynomial derivatives up to linear combinations of the original variables while preserving specific output variables of interest. Exact reductions may be too restrictive in practice for biological systems since quantitative information is often uncertain or subject to estimations and measurement errors. This might come at the cost of limiting the actual aggregation power of exact reduction techniques. We propose an extensi...
Abstract: Model reduction methods usually focus on the error performance analysis; however, in pres...
ix, 93 leaves ; 29 cmModelling a chemical or biochemical system involves the use of differential equ...
Dynamics of metabolic systems can be modelled by systems of differential equations. Realistic models...
In life sciences, deriving insights from dynamic models can be challenging due to the large number o...
It is well known that exact notions of model abstraction and reduction for dynamical systems may not...
Biological systems are typically modelled by nonlinear differential equations. In an effort to produ...
Models of complex systems often consist of state variables with structurally similar dynamics that d...
Ordinary differential equation (ODE) models are often used to quantitatively describe and predict th...
We present an algorithm to compute exact aggregations of a class of systems of ordinary differential...
Differential equation models of chemical or biochemical systems usually display multiple, ...
We present an algorithm to compute exact aggregations of a class of systems of ordinary differential...
Abstract. We present an algorithm to compute exact aggregations of a class of systems of ordinary di...
The complexity of full-scale metabolic models is a major obstacle for their effective use in computa...
We present a model reduction technique for a class of nonlinear ordinary differential equation (ODE)...
BACKGROUND: Systems biology models tend to become large since biological systems often consist of co...
Abstract: Model reduction methods usually focus on the error performance analysis; however, in pres...
ix, 93 leaves ; 29 cmModelling a chemical or biochemical system involves the use of differential equ...
Dynamics of metabolic systems can be modelled by systems of differential equations. Realistic models...
In life sciences, deriving insights from dynamic models can be challenging due to the large number o...
It is well known that exact notions of model abstraction and reduction for dynamical systems may not...
Biological systems are typically modelled by nonlinear differential equations. In an effort to produ...
Models of complex systems often consist of state variables with structurally similar dynamics that d...
Ordinary differential equation (ODE) models are often used to quantitatively describe and predict th...
We present an algorithm to compute exact aggregations of a class of systems of ordinary differential...
Differential equation models of chemical or biochemical systems usually display multiple, ...
We present an algorithm to compute exact aggregations of a class of systems of ordinary differential...
Abstract. We present an algorithm to compute exact aggregations of a class of systems of ordinary di...
The complexity of full-scale metabolic models is a major obstacle for their effective use in computa...
We present a model reduction technique for a class of nonlinear ordinary differential equation (ODE)...
BACKGROUND: Systems biology models tend to become large since biological systems often consist of co...
Abstract: Model reduction methods usually focus on the error performance analysis; however, in pres...
ix, 93 leaves ; 29 cmModelling a chemical or biochemical system involves the use of differential equ...
Dynamics of metabolic systems can be modelled by systems of differential equations. Realistic models...