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A Projection Argument for Differential Inclusions, with Applications to Persistence of Mass-Action Kinetics
Репозиторій DSpace/Manakin
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- Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)
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- Symmetry, Integrability and Geometry: Methods and Applications, 2013, том 9
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A Projection Argument for Differential Inclusions, with Applications to Persistence of Mass-Action Kinetics
Інший ID:
2010 Mathematics Subject Classification: 34A60; 80A30; 92C45; 37B25; 34D23; 37C10; 37C15; 92E20; 92C42; 54B30; 18B30
DOI: http://dx.doi.org/10.3842/SIGMA.2013.025
DOI: http://dx.doi.org/10.3842/SIGMA.2013.025
Посилання:
A Projection Argument for Differential Inclusions, with Applications to Persistence of Mass-Action Kinetics / M. Gopalkrishnan, E. Miller, A. Shiu // Symmetry, Integrability and Geometry: Methods and Applications. — 2013. — Т. 9. — Бібліогр.: 22 назв. — англ.
Підтримка:
MG was supported by a Ramanujan fellowship from the Department of Science and Technology,
India, and, during a semester-long stay at Duke University, by the Duke MathBio RTG grant
NSF DMS-0943760. EM had support from NSF grant DMS-1001437. AS was supported by an
NSF postdoctoral fellowship DMS-1004380. The authors thank David F. Anderson, Gheorghe
Craciun, and Casian Pantea for helpful discussions, and Duke University where many of the
conversations occurred. The authors also thank the two referees, whose perceptive and insightful
comments improved this work.
Дата:
2013
Переглядів:
441
Завантажень:
199
Анотація:
Motivated by questions in mass-action kinetics, we introduce the notion of vertexical family of differential inclusions. Defined on open hypercubes, these families are characterized by particular good behavior under projection maps. The motivating examples are certain families of reaction networks – including reversible, weakly reversible, endotactic, and strongly endotactic reaction networks – that give rise to vertexical families of mass-action differential inclusions. We prove that vertexical families are amenable to structural induction. Consequently, a trajectory of a vertexical family approaches the boundary if and only if either the trajectory approaches a vertex of the hypercube, or a trajectory in a lower-dimensional member of the family approaches the boundary. With this technology, we make progress on the global attractor conjecture, a central open problem concerning mass-action kinetics systems. Additionally, we phrase mass-action kinetics as a functor on reaction networks with variable rates.
