J.O. Fatokun  , 
    Continuous Approach for Deriving Self-Starting Multistep Methods for Initial Value Problems in Ordinary Differential Equations,
    Journal of Engineering and Applied Sciences,
    Volume 2,Issue 3,
    2007,
    Pages 504-508,
    ISSN 1816-949x,
    jeasci.2007.504.508,
    (https://makhillpublications.co/view-article.php?doi=jeasci.2007.504.508)
    Abstract: This study presents a continuous approach for the derivation of self-starting multistep methods for the numerical treatment of ordinary differential equations. The popular k-step Adams Moulton class requires single step methods to obtain the (k-1) starting values. In this paper we consider a collocation approach at the various interpolation points to obtain a set of k-multistep methods. The set of methods are of uniform order and A-stable. Two examples are presented here.
    Keywords: Self-starting multistep methods;legendre polynomial and functions;kerturbation term;convergence;block methods;hybrid methods