AYLAJ, Bouchra; ELARBI ACHHAB, Mohamed; LAABISSI, Mohamed

doi:10.1093/imamci/dnl013

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AYLAJ, Bouchra
Tools of automatic control for scientific computing, Models and Methods in Biomathematics [ANUBIS]
Institut de Mathématiques de Bordeaux [IMB]

ELARBI ACHHAB, Mohamed

LAABISSI, Mohamed

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IMA Journal of Mathematical Control and Information. 2006-06-30, vol. 2, n° 24, p. 163 -175

Oxford University Press (OUP)

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We prove the global existence of the state trajectories for a class of non-linear systems arising from convection-dispersion-reaction processes. It is also shown that there is at least one steady state in the set of physically feasible states for such systems. The uniqueness and the stability analysis of this steady-state solution are discussed. Our approach is based on the analysis of a non-linear set of partial differential equations, using the upper and lower solutions, dissipativity properties, a subtangential condition and the positivity of the related C0-semigroup.< Leer menos

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dissipativity.

tubular reactor

non-linear distributed parameter systems

equilibrium profile

positive C0-semigroup

compact semigroup

dissipativity

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Asymptotic behaviour of state trajectories for a class of tubular reactor non-linear models

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