Catalyst.jl is a symbolic modeling package for analysis and high performance
simulation of chemical reaction networks. Catalyst defines symbolic
ReactionSystems,
which can be created programmatically or easily
specified using Catalyst's domain specific language (DSL). Leveraging
ModelingToolkit and
Symbolics.jl, Catalyst enables
large-scale simulations through auto-vectorization and parallelism. Symbolic
ReactionSystems can be used to generate ModelingToolkit-based models, allowing
the easy simulation and parameter estimation of mass action ODE models, Chemical
Langevin SDE models, stochastic chemical kinetics jump process models, and more.
Generated models can be used with solvers throughout the broader
SciML ecosystem, including higher level SciML packages (e.g.
for sensitivity analysis, parameter estimation, machine learning applications,
etc).
Breaking changes and new functionality are summarized in the HISTORY.md file.
- A short 15 minute overview of Catalyst as of version 6 is available in the talk Modeling Biochemical Systems with Catalyst.jl.
- A short 13 minute overview of Catalyst when it was known as DiffEqBiological in older versions is available in the talk Efficient Modelling of Biochemical Reaction Networks
For tutorials and information on using the package, see the stable documentation. The in-development documentation describes unreleased features in the current master branch.
- DSL provides a simple and readable format for manually specifying chemical reactions.
- Catalyst
ReactionSystems provide a symbolic representation of reaction networks, built on ModelingToolkit.jl and Symbolics.jl. - Non-integer (e.g.
Float64) stoichiometric coefficients are supported for generating ODE models, and symbolic expressions for stoichiometric coefficients are supported for all system types. - The Catalyst.jl API provides functionality for extending networks, building networks programmatically, network analysis, and for composing multiple networks together.
ReactionSystems generated by the DSL can be converted to a variety ofModelingToolkit.AbstractSystems, including symbolic ODE, SDE, and jump process representations.- By leveraging ModelingToolkit, users have a variety of options for generating optimized system representations to use in solvers. These include construction of dense or sparse Jacobians, multithreading or parallelization of generated derivative functions, automatic classification of reactions into optimized jump types for Gillespie-type simulations, automatic construction of dependency graphs for jump systems, and more.
- Generated systems can be solved using any
DifferentialEquations.jl
ODE/SDE/jump solver, and can be used within
EnsembleProblems for carrying out parallelized parameter sweeps and statistical sampling. Plot recipes are available for visualizing the solutions. - Symbolics.jl symbolic expressions
and Julia
Exprs can be obtained for all rate laws and functions determining the deterministic and stochastic terms within resulting ODE, SDE, or jump models. - Latexify can be used to generate LaTeX expressions corresponding to generated mathematical models or the underlying set of reactions.
- Graphviz can be used to generate and visualize reaction network graphs. (Reusing the Graphviz interface created in Catlab.jl.)
- Catalyst
ReactionSystems can be imported from SBML files via SBMLToolkit.jl, and from BioNetGen .net files and various matrix network representations using ReactionNetworkImporters.jl.
using Catalyst, Plots, DiffEqJump
rs = @reaction_network begin
c1, S + E --> SE
c2, SE --> S + E
c3, SE --> P + E
end c1 c2 c3
p = (:c1 => 0.00166, :c2 => 0.0001, :c3 => 0.1)
tspan = (0., 100.)
u0 = [:S => 301, :E => 100, :SE => 0, :P => 0]
# solve JumpProblem
dprob = DiscreteProblem(rs, u0, tspan, p)
jprob = JumpProblem(rs, dprob, Direct())
jsol = solve(jprob, SSAStepper())
plot(jsol,lw=2,title="Gillespie: Michaelis-Menten Enzyme Kinetics")
using Catalyst, Plots, StochasticDiffEq
rs = @reaction_network begin
c1, X --> 2X
c2, X --> 0
c3, 0 --> X
end c1 c2 c3
p = (:c1 => 1.0, :c2 => 2.0, :c3 => 50.)
tspan = (0.,10.)
u0 = [:X => 5.]
sprob = SDEProblem(rs, u0, tspan, p)
ssol = solve(sprob, LambaEM(), reltol=1e-3)
plot(ssol,lw=2,title="Adaptive SDE: Birth-Death Process")
Catalyst developers are active on the Julia Discourse, and the Julia Slack channels #sciml-bridged and #sciml-sysbio. For bugs or feature requests open an issue.