Abstract
A singular boundary value problem (BVP) for a second-order
nonlinear differential equation is studied. This BVP is a model in
hydrodynamics as well as in nonlinear field theory and especially in the
study of the symmetric bubble-type solutions (shell-like theory). The
obtained solutions (ground states) can describe the relationship between
surface tension, the surface mass density, and the radius of the spherical
interfaces between the fluid phases of the same substance. An interval of
the parameter, in which there is a strictly increasing and positive
solution defined on the half-line, with certain asymptotic behavior is
derived. Some numerical results are given to illustrate and verify our
results. Furthermore, a full investigation for all other types of solutions
is exhibited. The approach is based on the continuum property
(connectedness and compactness) of the solutions funnel (Knesser's theorem),
combined with the corresponding vector field's ones.