2013
DOI: 10.1016/j.compchemeng.2012.09.021
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Numerical evaluation of the stability of stationary points of index-2 differential-algebraic equations: Applications to reactive flash and reactive distillation systems

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Cited by 6 publications
(6 citation statements)
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“…The topological form of the bifurcation shapes of this work is of type " " such as typically displayed in continuous stirred tank chemical reactor and reactive flash. This is supported by other studies (Rodríguez et al [7], Ruiz et al [8], Alvarez-Ramirez [27], Jaime-Leal et al [9], and Harney et al [26]).…”
Section: Resultssupporting
confidence: 80%
See 1 more Smart Citation
“…The topological form of the bifurcation shapes of this work is of type " " such as typically displayed in continuous stirred tank chemical reactor and reactive flash. This is supported by other studies (Rodríguez et al [7], Ruiz et al [8], Alvarez-Ramirez [27], Jaime-Leal et al [9], and Harney et al [26]).…”
Section: Resultssupporting
confidence: 80%
“…Jaime-Leal et al [9] introduced a new approach and conditions to identify input multiplicity in reactive flash, based on the application of reaction-invariant composition variables. Finally, Harney et al [26] demonstrate that dynamic behavior of reactive flash and reactive distillation represented by index-2 system of differential algebraic equations (DAEs) can be reduced to an ordinary differential equations system (ODE) by single differentiation; the resulting Jacobian matrix will have a null eigenvalue at every steady state with multiplicity of at least the dimension y. These null eigenvalues must be accounted for when determining the stability of a steady state.…”
Section: Introductionmentioning
confidence: 99%
“…Hence, the interconnection among the subsystems in ( 29) is power-preserving. 7 The system conformed by ( 29) and ( 31) is an index-2 differential algebraic system in Hessenberg form (see, e.g., [49]). Based on [49], the time derivative of the algebraic constraint (29c) can be computed once to explicitly obtain z K in terms of xE and x∆ as follows:…”
Section: B Interconnection Structurementioning
confidence: 99%
“…On the basis of the ideas of Chang and Sahinidis and Harney et al, we developed a new method to addresses the robust steady-state optimization of index-2 DAE systems under parametric uncertainty. Because the Lyapunov linearization theorem cannot be applied to DAE systems, the matrix pencil and Routh–Hurwitz test are used to formulate the stability constraints.…”
Section: Introductionmentioning
confidence: 99%
“…A high-index problem can be caused by the wrong choice of input variables, internal state constraint equations (e.g., reaction equilibrium and phase equilibrium), or submodels interconnection. 18 Recently, Harney et al 19 used the matrix pencil of the linearized system to directly evaluate the stability of the stationary points of index-2 DAE systems and performed bifurcation analyses of reactive flash and reactive distillation systems. They also showed that the index-reduced system by differentiation is not guaranteed to possess the same stability characteristics as that of the original system.…”
Section: Introductionmentioning
confidence: 99%