[PDF] Top 20 A Novel Iteration Class for Solution of Nonlinear Equation

... Function f x ( ) usually has a continuous order first derivative is at least and an initial estimate of the root often have. Numerical methods for solution of equation (1) of the initial estimate uses and ... See full document

... Variational iteration method [16, 17, 20, 21] has been extensively worked out over a number of years by numerous ...Variational iteration method has been favorably applied to various kinds of ... See full document

... analytical solution which can be handled by semi-analytical or numerical ...exact solution of nonlinear differential equations, semi-analytical methods such as the Variational Iteration method ... See full document

... specific nonlinear partial differential equations. But, because of the nonlinear part that exists in most of these equations, a limited number of them have precise analytical solution and most of ... See full document

... Riccati equation plays a great role in blueprint and analysis the linear and nonlinear optimal control ...Numerical Solution of this equation has been acquired by applying Adomian’s ... See full document

... In the past decade, mathematicians have devoted effort to the study of explicit and numerical solutions to linear and nonlinear fraction differential equations [3-4]. An extensive amount of research has been done ... See full document

... [15] J.-L. Lions, On some questions in boundary value problems of mathematical physics, Contempo- rary Developments in Continuum Mechanics and Partial Differential Equations (Rio de Janeiro, 1977), North-Holland Math. ... See full document

... of nonlinear master equation is studied. We found that the nonlinear power term can introduce a novel solution of the equation, in which a possible invariant structure as an ... See full document

... Chidume and Aneke extended the notion of a K-pd operator to certain Banach spaces see 5. Later, in 2001, we also extended the class of K-pd operators to include the Fr´echet differentiable operators. A new ... See full document

... Moser’s iteration technique, we get the locally uniformly bounded property of the solution and the locally bounded property of the L p -norm of the ... See full document

... We study the existence of solutions for a class of fractional differential equations. Due to the singularity of the possible solutions, we introduce a new and proper concept of periodic boundary value conditions. ... See full document

... Spatially fractional order diffusion equations are generalizations of classical diffusion equations which are increasingly used in modeling practical super diffusive problems in fluid flow, finance and others areas of ... See full document

... Proof We must prove that the positive equilibrium point x ¯ of Equation (1.1) is both locally asymptotically stable and globally attractive. Theorem 3.5 has shown the local asymptotic stability of x. Hence, it ... See full document

... the solution u = u(x, t) upon the data ϕ(x) and f (x, t, ...similar iteration method is used with this kind of a local boundary condition for a nonlinear inverse coefficient problem for a parabolic ... See full document

... iterative solution algorithm on the assumption that for the discrete algebraic Riccati equations ...tight solution bound will only be required such as the stabilization of jump linear systems (Fang and ... See full document

... of nonlinear difference equations is of paramount importance not only in their own field but in understanding the behavior of their differential ...the solution for the following recursive ... See full document

... By applying the Krasnoselskii fixed point theorem, the Schauder fixed point theorem, the Sadovskii fixed point theorem and the Banach contraction principle, we obtain four existence results of uncountably many bounded ... See full document

... Variational iteration methods are calculated the homogeneous gas dy- namics ...(analytic) solution of the equation is calculated in the form of a series with easily computable components like to ... See full document

... fractional equation in terms of a special function see, ...a solution for the nonlinear fractional differential equation D α 0 u ft, u, where 0 < α < 1 and f : 0, a × R → R, 0 < a ≤ ... See full document

... Picard’s Iteration Method followed by Adomian Decomposition Method to solve a nonlinear Singular Cauchy Problem of Euler- Poisson- Darboux ...The solution of the problem is much simplified and ... See full document