Results 151 to 160 of about 2,135 (188)

Nonequilibrium facilitated oxygen transport in hemoglobin solution. [PDF]

Biophys J, 1970
Kutchai H, Jacquez JA, Mather FJ.
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Generalized quasilinearization and quasilinear elliptic problems

Nonlinear Analysis: Theory, Methods & Applications, 2001
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Lakshmikantham, V., Leela, S.
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Soft quasilinear operators in soft normed quasilinear spaces

Journal of Intelligent & Fuzzy Systems, 2023
In this study, we define soft quasilinear functionals on soft normed quasilinear spaces and we examine some of its qualities. By using the soft quasilinear operator defined in [6] we specify and prove some theorem related to the continuity and boundedness of soft quasilinear operators and functionals.
Onat Bulak, Fatma, Bozkurt, Hacer
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Quasilinear varieties of semigroups

Semigroup Forum, 2009
A semigroup variety \(\mathcal V\) is called `quasilinear' if for each word \(w\) there is a linear word \(w'\) such that \(\mathcal V\) satisfies \(w\approx w'\). If for each word \(w\) we have a unique \(w'\) then we obtain the notion of a `linear' variety of semigroups.
Dolinka, Igor, Đapić, Petar
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Quasilinear Control

2010
This is a textbook and reference for readers interested in quasilinear control (QLC). QLC is a set of methods for performance analysis and design of linear plant or nonlinear instrumentation (LPNI) systems. The approach of QLC is based on the method of stochastic linearization, which reduces the nonlinearities of actuators and sensors to quasilinear ...
ShiNung Ching, Yongsoon Eun, Cevat Gokcek, Pierre T. Kabamba, Semyon M. Meerkov   +4 more
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Quasilinearization and approximate quasilinearization for lidstone boundary value problems

International Journal of Computer Mathematics, 1992
Quasilinearization technique has been applied to a general nonlinear Lidstone boundary value problem for the construction of a sequence of its approximate solutions {xn (t)}. Sufficient conditions for the linear as well as quadratic convergence of {xn (t)} to the unique solution x ∗(t) of the boundary value problem have been provided.
Ravi P Agarwal, Patricia J.Y. Wong
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Generalized Quasilinearization for Quasilinear Parabolic Equations with Nonlinearities of DC Type

Journal of Optimization Theory and Applications, 2001
The authors consider an initial-boundary value problem for a class of quasilinear parabolic equations whose lower-order nonlinearity is of d.c. function type (difference of two convex functions) with respect to the dependent variable. Combining the method of quasilinearization with the well-known method of upper and lower solutions together with the ...
Carl, S., Lakshmikantham, V.
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General Quasilinear Schrödinger Equation

2009
In this chapter we shall study the local solvability of the initial value problem (IVP) associated with the general quasilinear Schrodinger equation.
Felipe Linares, Gustavo Ponce
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Quasilinear sequence transformations

Numerical Algorithms, 1997
\(p>0\) and \(k\geq 0\) are integers. The elements of \(E\equiv\mathbb{R}^p\) are represented as column vectors. \({\mathfrak G}{\mathfrak L}(E)\) is the linear isomorphism group over \(E\) and \(I\) is its unit member. \(E(p,k)\) is \(E\times\cdots\times E\) (\(k+1\) times).
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Quasilinear Heat Flow

Journal of Fluids Engineering, 1958
Abstract The influence of variation (with temperature) of thermal conductivity, density, and heat capacity at constant pressure on the solutions of the heat-conduction equation is considered. Several problems are solved by analog computation, for materials whose properties vary linearly with temperature, and the solutions of these are ...
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