A predictor-corrector phase-fitted method for y″ = f(x, y)

We search for the modiÿcation of the stability properties of a P-stable multistep algorithm with an order greater than two when this is reformulated on the basis of the exponential ÿtting. We e ectively construct the exponential-ÿtting version of the fourth-order two-step algorithm of Chawla (BIT 21

A systematic investigation is undertaken here on the possible practical consequences of the fact that the linear four step methods for y" = f(x, y) form a family with a certain structure. The mentioned property is found to be surprisingly rich in consequences, and three of them are of particular imp

A new algorithm is presented for solving nonlinear second-order coupled equations of the form y" = f(r, y). This method consists of a predictor, a corrector and a modifier so that it does not require iteration or matrix inversion. The method retains both the advantages of exponentially fitted two-st

A numerical method is proposed for solving linear differential equations of second order without first derivatives. The new method is superior to de Vogelaere's for this class of equations, and for non-linear equations it becomes an implicit extension of de Vogelaere's method. The global truncation