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Nonlinear decomposition principle and fundamental matrix solutions for dynamic compartmental systems
Department of Mathematics, University of Georgia, Athens, GA 30602, USA 
A decomposition principle for nonlinear dynamic compartmental systems is introduced in the present paper. This theory is based on the mutually exclusive and exhaustive, analytical and dynamic, novel system and subsystem partitioning methodologies. A deterministic mathematical method is developed for the dynamic analysis of nonlinear compartmental systems based on the proposed theory. The dynamic method enables tracking the evolution of all initial stocks, external inputs, and arbitrary intercompartmental flows as well as the associated storages derived from these stocks, inputs, and flows individually and separately within the system. The transient and the dynamic direct, indirect, acyclic, cycling, and transfer ($\texttt{diact}$) flows and associated storages transmitted along a given flow path or from one compartmentdirectly or indirectlyto any other are then analytically characterized, systematically classified, and mathematically formulated. Thus, the dynamic influence of one compartment, in terms of flow and storage transfer, directly or indirectly on any other compartment is ascertained. Consequently, new mathematical system analysis tools are formulated as quantitative system indicators. The proposed mathematical method is then applied to various models from literature to demonstrate its efficiency and wide applicability.
References:
[1] 
D. Anderson, Compartmental Modeling and Tracer Kinetics, Lecture Notes in Biomathematics, 50. SpringerVerlag, Berlin, 1983. doi: 10.1007/9783642518614. Google Scholar 
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[8] 
B. Hannon, The structure of ecosystems, Journal of Theoretical Biology, 41 (1973), 535546. Google Scholar 
[9] 
P. W. Hippe, Environ analysis of linear compartmental systems: The dynamic, timeinvariant case, Ecological Modelling, 19 (1983), 126. Google Scholar 
[10] 
J. Jacquez and C. Simon, Qualitative theory of compartmental systems, SIAM Review, 35 (1993), 4379. doi: 10.1137/1035003. Google Scholar 
[11] 
W. O. Kermack and A. G. McKendrick, A contribution to the mathematical theory of epidemics, Proceedings of the Royal Society of London A: Mathematical, Physical and Engineering Sciences, 115 (1927), 700–721, http://rspa.royalsocietypublishing.org/content/115/772/700.Google Scholar 
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W. W. Leontief, Quantitative input and output relations in the economic systems of the united states, The Review of Economic Statistics, 18 (1936), 105125. Google Scholar 
[13] 
W. W. Leontief, Inputoutput Economics, Oxford University Press on Demand, New York, 1986.Google Scholar 
[14] 
B. C. Patten, Systems approach to the concept of environment, Ohio Journal of Science, 78 (1978), 206222. Google Scholar 
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J. Szyrmer and R. E. Ulanowicz, Total flows in ecosystems, Ecological Modelling, 35 (1987), 123136. Google Scholar 
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L. J. Tilly, The structure and dynamics of Cone Spring, Ecological Monographs, 38 (1968), 169197. Google Scholar 
show all references
References:
[1] 
D. Anderson, Compartmental Modeling and Tracer Kinetics, Lecture Notes in Biomathematics, 50. SpringerVerlag, Berlin, 1983. doi: 10.1007/9783642518614. Google Scholar 
[2] 
R. M. Anderson and R. M. May, Population biology of infectious diseases: Part i, Nature, 280 (1979), 361367. doi: 10.1038/280361a0. Google Scholar 
[3] 
H. Coskun, Dynamic Ecological System Analysis, Osfpreprints, 2018. doi: 10.31219/osf.io/35xkb. Google Scholar 
[4] 
H. Coskun, Dynamic Ecological System Measures, Osfpreprints, 2018. doi: 10.31219/osf.io/j2pd3. Google Scholar 
[5] 
H. Coskun, Static ecological system analysis, Theoretical Ecology, 2019, 1–36, https://doi.org/10.31219/osf.io/zqxc5. doi: 10.1007/s1208001904218. Google Scholar 
[6] 
H. Coskun, Static ecological system measures, Theoretical Ecology, 2019, 1–26, https://doi.org/10.31219/osf.io/g4xzt. doi: 10.1007/s1208001904227. Google Scholar 
[7] 
L. EdelsteinKeshet, Mathematical Models in Biology, Classics in Applied Mathematics, 46. Society for Industrial and Applied Mathematics (SIAM), Philadelphia, PA, 2005. doi: 10.1137/1.9780898719147. Google Scholar 
[8] 
B. Hannon, The structure of ecosystems, Journal of Theoretical Biology, 41 (1973), 535546. Google Scholar 
[9] 
P. W. Hippe, Environ analysis of linear compartmental systems: The dynamic, timeinvariant case, Ecological Modelling, 19 (1983), 126. Google Scholar 
[10] 
J. Jacquez and C. Simon, Qualitative theory of compartmental systems, SIAM Review, 35 (1993), 4379. doi: 10.1137/1035003. Google Scholar 
[11] 
W. O. Kermack and A. G. McKendrick, A contribution to the mathematical theory of epidemics, Proceedings of the Royal Society of London A: Mathematical, Physical and Engineering Sciences, 115 (1927), 700–721, http://rspa.royalsocietypublishing.org/content/115/772/700.Google Scholar 
[12] 
W. W. Leontief, Quantitative input and output relations in the economic systems of the united states, The Review of Economic Statistics, 18 (1936), 105125. Google Scholar 
[13] 
W. W. Leontief, Inputoutput Economics, Oxford University Press on Demand, New York, 1986.Google Scholar 
[14] 
B. C. Patten, Systems approach to the concept of environment, Ohio Journal of Science, 78 (1978), 206222. Google Scholar 
[15] 
J. Szyrmer and R. E. Ulanowicz, Total flows in ecosystems, Ecological Modelling, 35 (1987), 123136. Google Scholar 
[16] 
L. J. Tilly, The structure and dynamics of Cone Spring, Ecological Monographs, 38 (1968), 169197. Google Scholar 
$\texttt{diact}$  flow distribution matrix  flows 
$\texttt{d}$  
$\texttt{i}$  
$\texttt{a}$  
$\texttt{c}$  
$\texttt{t}$ 
$\texttt{diact}$  flow distribution matrix  flows 
$\texttt{d}$  
$\texttt{i}$  
$\texttt{a}$  
$\texttt{c}$  
$\texttt{t}$ 
$\texttt{diact}$  flow and storage distribution matrices  flows  storages  
$\texttt{d}$  

$\texttt{i}$  
$\texttt{a}$  
$\texttt{c}$  
$\texttt{t}$ 
$\texttt{diact}$  flow and storage distribution matrices  flows  storages  
$\texttt{d}$  

$\texttt{i}$  
$\texttt{a}$  
$\texttt{c}$  
$\texttt{t}$ 
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