Linear Autonomous Pool Models (LAPM)¶
LAPM is a simple Python package to deal with linear autonomous pool models of the form
\[\frac{d}{dt}\,x(t) = B\,x(t) + u.\]
It provides symbolic and numerical computation of
steady state content
steady state release
transit time, system age, pool age
density
(cumulative distribution function)
mean
standard deviation
variance
higher order moments
(Laplace transforms)
Table of Contents¶
Module for phase-type distribution. |
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Module for linear autonomous pool models. |
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Module for discrete-time Markov chains (DTMCs). |
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Example linear autonomous pool models. |
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Example: Emanuel’s model |
Important Note¶
\(\bf{B}=(b_{ij})\) has always to be an invertible compartmental matrix:
\(b_{ii}<0\) for all \(i\)
\(b_{ij}\geq 0\) for \(i\neq j\)
\(\sum\limits_{i=1}^d b_{ij}\leq 0\) for all \(j\)