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Analysis of the Parameter-Dependent Multiplicity of Steady-StateProles of a Strongly Nonlinear Mathematical Model Arising From the Chemical Reactor Theory
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نویسنده
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barikbin m. s. ,emamjomeh m. ,nabati m.
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منبع
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international journal of industrial mathematics - 2021 - دوره : 13 - شماره : 4 - صفحه:411 -418
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چکیده
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In this paper, we study the uniqueness and multiplicity of the solutions of a strongly nonlinear mathematical model arising from chemical reactor theory. the analysis is based on the reproducing kernel hilbert space method. the main aim of this work is to and how much information can be predicted using numerical computations. the dependence of the number of solutions on the parameters of the model is also studied. furthermore, the analytical approximations of all branches of solutions can be calculated by the proposed method. the convergence of the proposed method is proved. some numerical simulations are presented.
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کلیدواژه
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Multiple solutions; Reproducing kernel Hilbert space; Strongly nonlinear problem; Adia- batic tubular chemical reactor; Iterative technique; Convergence
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آدرس
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islamic azad university, takestan branch, department of mathematics, Iran, golpayegan university of technology, department of basic sciences, Iran, petroleum university of technology, abadan faculty of petroleum engineering, department of basic sciences, Iran
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Authors
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