Problems with mixed boundary conditions in Banach spaces (Q1653302)

Summary: Using Leray-Schauder degree or degree for \(\alpha\)-condensing maps we obtain the existence of at least one solution for the boundary value problem of the following type: \(\left(\varphi \left(u'\right)\right)' = f \left(t, u, u'\right)\), \(u(T) = 0 = u'(0)\), where \(\varphi : X \rightarrow X\) is a homeomorphism with reverse Lipschitz constant such that \(\varphi(0) = 0\), \(f : \left[0, T\right] \times X \times X \rightarrow X\) is a continuous function, \(T\) is a positive real number, and \(X\) is a real Banach space.