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Bartholomew DJ, Forbes AF, McLean SI. Statistical techniques for manpower planning. 2nd ed, Wiley, New York. 1979.Search in Google Scholar
Berman A, Neumann M, Stern RJ. Nonnegative matrices in dynamic systems. Vol. 3. Wiley-Interscience. 1989.Search in Google Scholar
Brown RF. Biomedical systems analysis via compartmental concept. CRC Press; 1985.Search in Google Scholar
Caccetta L, Rumchev VG. A survey of reachability and controllability for positive linear systems. Annals of Operations Research. 2000:101-22.Search in Google Scholar
Cáceres MO, Cáceres-Saez I. Random Leslie matrices in population dynamics. Journal of Mathematical Biology. 2011;63:519-56.Search in Google Scholar
Chase RB, Aquilano NJ. Production and Operations Management, Richard D. Irwin, Chicago, IL. 1992.Search in Google Scholar
Coxson PG, Shapiro H. Positive input reachability and controllability of positive systems. Linear Algebra and its Applications. 1987:1;94:35-53.Search in Google Scholar
Doak D, Kareiva P, Klepetka B. Modeling population viability for the desert tortoise in the western Mojave Desert. Ecological applications. 1994 Aug;4(3):446-60.Search in Google Scholar
Farina L, Rinaldi S. Positive linear systems: theory and applications. John Wiley & Sons; 2000 Jul 3.Search in Google Scholar
Guiver C, Hodgson D, Townley S. Positive state controllability of positive linear systems. Systems & Control Letters. 2014:1;65: 23-9.Search in Google Scholar
Kalman RE, Ho YC, Narendra KS. Controllability of linear dynamical systems. In Contributions to Differential Equations. 1962;1: 189–213.Search in Google Scholar
Kaczorek T. Positive 1D and 2D systems. Springer Science & Business Media; 2012 Dec 6.Search in Google Scholar
Krasnoselskii MA, Lifshitz EA, Sobolev AV. Positive Linear Systems, Nauka, Moscow, in Russian. 1985.Search in Google Scholar
Lubben J, Tenhumberg B, Tyre A, Rebarber R. Management recommendations based on matrix projection models: the importance of considering biological limits. Biological Conservation. 2008; 1;141(2):517-23.Search in Google Scholar
Luenberger DG. Theory, models and applications. Stanford University. John Wiley & Sons Inc; 1979.Search in Google Scholar
Ouyadri M, Laabissi M, Achhab ME. Positive output controllability of linear discrete–time invariant systems. Control and Cybernetics. 2021 Oct 1;50(4):521-39.Search in Google Scholar
Rantzer A, Valcher ME. A tutorial on positive systems and large scale control. In 2018 IEEE Conference on Decision and Control (CDC). 2018:3686-3697.Search in Google Scholar
Rumchev VG, Konin AL. Decision support systems for manpower planning: Mathematical Models. Radio and Communication Press, Moscow. 1984.Search in Google Scholar
Sethi SP, Thompson GL. Optimal Control Theory: Applications to Management Sciences. Martinus Nijhoff, Boston. 1981.Search in Google Scholar
Valcher ME. Controllability and reachability criteria for discrete time positive systems. International Journal of Control. 1996:1;65(3): 511-36.Search in Google Scholar
Vollmann TE, Berry WL, Whybark DC. Manufacturing planning and control systems. Irwin/McGraw-Hill. 1997.Search in Google Scholar