Analytic approximation of solutions of the forced Duffing equation with integral boundary conditions

This paper investigates the forced Duffing equation with integral boundary conditions. Its approximate solution is developed by combining the homotopy perturbation method (HPM) and the reproducing kernel Hilbert space method (RKHSM). HPM is based on the use of the traditional perturbation method and

This paper presents an analytical approach based on the power series method for determining the periodic solutions of the forced undamped Duffing's oscillator. The time variable is first transformed into a new harmonically oscillating time which transforms the governing differential equation into a

This paper is devoted to the discussion of the number of T -periodic solutions for the forced Duffing equation, x + kx + g t x = s 1 + h t , with g t x being a continuous function by using the degree theory, upper and lower solutions method, and the twisting theorem.

The quasilinearization method is used for nonlinear ordinary differential equations with nonlinear boundary conditions. Given are sufficient conditions when corresponding monotone sequences converge to the unique solution and this convergence is quadratic. (~ 2004 Elsevier Ltd. All rights reserved.

Let S=[z # C: |Im(z)|<;] be a strip in the complex plane. H q , 1 q< , denotes the space of functions, which are analytic and 2?-periodic in S, real-valued on the real axis, and possess q-integrable boundary values. Let + be a positive measure on [0, 2?] and L p (+) be the corresponding Lebesgue spa

A two-parameter integral ,equation of the first kind with a difference periodic kernel, to which a wide range of periodic problems of the mechanics of continua with mixed boundary conditions can be reduced, is investigated. For the two main versions it is converted to a singular integral equation, w