@article {Kedem:1980:0022-2526:119,
title = "The Solutions of a Model Nonlinear Singular Perturbation Problem Having A Continuous Locus of Singular Points",
journal = "Studies in Applied Mathematics",
parent_itemid = "infobike://bpl/sapm",
publishercode ="bp",
year = "1980",
volume = "63",
number = "2",
publication date ="1980-10-01T00:00:00",
pages = "119-146",
itemtype = "ARTICLE",
issn = "0022-2526",
eissn = "1467-9590",
url = "https://www.ingentaconnect.com/content/bpl/sapm/1980/00000063/00000002/art00003",
doi = "doi:10.1002/sapm1980632119",
author = "Kedem, Gershon and Parter, Seymour V. and Steuerwalt, Michael",
abstract = "Consider the boundary value problem y =(y
2 t
2)y, 1 t0, y(1) = A, y(0) = B. We discuss the multiplicity of solutions and their limiting behavior as +0+
for certain choices of A and B. In particular, when A = 1, B = 0, a bifurcation analysis gives a detailed and fairly complete analysis. The interest here arises from the complexity of the set of "turning points."",
}