Uniform asymptotic solutions of second order linear ordinary differential equations with turning points
- 1 May 1970
- journal article
- research article
- Published by Wiley in Communications on Pure and Applied Mathematics
- Vol. 23 (3) , 379-408
- https://doi.org/10.1002/cpa.3160230310
Abstract
No abstract availableKeywords
This publication has 12 references indexed in Scilit:
- On the asymptotic integration of second order linear ordinary differential equations with polynomial coefficientsJournal of Mathematical Analysis and Applications, 1966
- Simplification of turning point problems for systems of linear differential equationsTransactions of the American Mathematical Society, 1963
- On the Asymptotic Solutions of a Class of Ordinary Differential Equations of the Fourth Order: I. Existence of Regular Formal SolutionsTransactions of the American Mathematical Society, 1960
- The asymptotic solution of linear differential equations of the second order in a domain containing one transition pointPhilosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences, 1956
- On the Asymptotic Forms of the Solutions of Ordinary Linear Differential Equations of the Third Order in a Region Containing a Turning PointTransactions of the American Mathematical Society, 1955
- The Solutions of Second Order Linear Ordinary Differential Equations About a Turning Point of Order TwoTransactions of the American Mathematical Society, 1955
- The solutions of second order linear ordinary differential equations about a turning point of order twoTransactions of the American Mathematical Society, 1955
- On the asymptotic forms of the solutions of ordinary linear differential equations of the third order in a region containing a turning pointTransactions of the American Mathematical Society, 1955
- Uniform asymptotic formulae for functions with transition pointsTransactions of the American Mathematical Society, 1950
- The asymptotic solutions of ordinary linear differential equations of the second order, with special reference to a turning pointTransactions of the American Mathematical Society, 1949