2 p.m. - 3 p.m. Location: FN 2.102
Voronezh State University, Russia
On M.A.Krasnoselskii and I.G. Malkin bifurcations
Different problems of bifurcation of periodic solutions in differential equations are analyzed via the theory of condensing maps. The proposed method permits us to consider the cases where there is only strong continuity in the bifurcation parameter and the uniform continuity doesn’t hold. In this talk I will consider a differential equation of neutral type with a delay viewed as a bifurcation parameter. Some results about bifurcations in abstract parabolic equations in Banach spaces will be discussed. A non-smooth situation will be treated as well.
Sponsored by the Department of Mathematical Sciences