[PDF] Top 20 Solution of fractional differential equations via \(\alpha \psi\) Geraghty type mappings

... where M = sup ξ ∈I 0 1 G(ξ , ζ ) dζ . Also, suppose that conditions (ii)–(iv) from Theorem 2.3 are satisfied, where G(ξ , ζ ) is given in (14). Then problem (13) has at least one solution. Proof By Lemma 2.5 y ∈ ... See full document

... the solution of multi-order fractional differential equations with initial ...algebraic equations which can be solved more easier. In this work, the fractional derivatives are ... See full document

... methods have been used to solve fractional differential equations. There are some further method, such as operational method,the Adomian decomposition method(ADM)[6], the homotopy perturbation ... See full document

... stochastic fractional differential equations with approximate solutions which converge rapidly to accurate ...the differential equation ... See full document

... fuzzy differential certain and incompletely specified systems, ...equations. Differential equations which arise in real-word physical problems are often too com- plicated to solve ...act ... See full document

... stochastic fractional differential equations with approximate solutions which converge rapidly to accurate ...the differential equation ... See full document

... It is well-known that existence theory plays a very important role in establishing accurate mathematical models and designing reasonable control systems. So, for the past few years, many people studied the existence ... See full document

... We present simple methods of solution of some classes of fractional differential equations, namely those with constant coefficients standard I and those with power type coefficients with[r] ... See full document

... on fractional calculus are devoted to the solvability of linear initial fractional differential equations on terms of special ...of solution to the nonlinear fractional ... See full document

... nonlinear fractional differential equations do not have analytic solutions, so approximations and numerical techniques must be used [9-12 ...approximation solution to linear and non linear ... See full document

... Dirichlet type problem for the corresponding ...generalized solution in these chapters is understood as a limit of approximating solutions taken from the domain of the operators − D a ( ν +∗ ) and − D a ( ν ... See full document

... denotes the Euler gamma function, provided that the right side is point wise defined on (, +∞). The existence result of a sign-changing solution is given by topological degree theory and fixed point index theory. ... See full document

... contraction mappings with respect to w-distances in complete metric spaces by using the concept of an altering distance ...the solution for nonlinear Fredholm integral equations and Volterra integral ... See full document

... the upper and lower solutions method, the existence and uniqueness of solutions were established. On the other hand, fractional system have been investigated extensively, see [29–38]. In [33], the authors ... See full document

... of fractional derivative of order γ in the Caputo for FCSs and show that this matrix with the Tau method are utilized to reduce the solution of some fractional -order differential ... See full document

... contraction mappings with respect to w-distances in complete metric ...the solution for nonlinear integral equations and nonlinear fractional differential equations of Caputo ... See full document

... Caputo fractional derivative even does not ...of fractional differential ...using fractional derivative ...The fractional Brinkman type fluid model with ... See full document

... We see that the operator F : U → C([, T ], R ) is continuous and completely continuous. From the choice of U, there is no u ∈ ∂U such that u = νFu for some ν ∈ (, ). Conse- quently, by the nonlinear alternative of ... See full document

... time-space fractional differential Equation has been ...the fractional complex transformation has been implemented to convert nonlinear partial fractional differential Equations ... See full document

... Hilfer fractional differential equations , ...of solution of nonlinear Hilfer fractional differential equations, ... See full document