Biochemical systems equation

The biochemical systems equation is a compact equation of nonlinear differential equations for describing a kinetic model for any network of coupled biochemical reactions and transport processes. The equation is expressed in the following form: d x d t = N v ( x ( p ) , p ) {\displaystyle {\dfrac {\bf {dx}}{dt}}={\bf {N}}{\bf {v}}({\bf {x}}(p),p)} The notation for the dependent variable x varies among authors.

Source: Wikipedia — Biochemical systems equation (CC BY-SA 4.0)

Biochemical systems equation

The biochemical systems equation is a compact equation of nonlinear differential equations for describing a kinetic model for any network of coupled biochemical reactions and transport processes. The equation is expressed in the following form: d x d t = N v ( x ( p ) , p ) {\displaystyle {\dfrac {\bf {dx}}{dt}}={\bf {N}}{\bf {v}}({\bf {x}}(p),p)} The notation for the dependent variable x varies among authors.

Source: Wikipedia "Biochemical systems equation" · CC BY-SA 4.0

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