We study the existence of periodic solutions u(.) for a class of nonlinear ordinary differential equations depending on a real parameter s and obtain the existence of closed connected branches of solution pairs (u, s) to various classes of problems, including some cases, like the superlinear one, where there is a lack of a priori bounds. The results are obtained as a consequence of a new continuation theorem for the coincidence equation Lu. = N(u, s) in normed spaces. Among the applications, we discuss also an example of existence of global branches of periodic solutions for the Ambrosetti-Prodi type problem u" + g(u) = s + p(t), with g satisfying some asymmetric conditions.

Continuation theorems for Ambrosetti-Prodi type periodic problems

/pdf/a-note-on-continuation-problems-3lp2itsqln.pdf

A note on continuation problems

Using a homotopy-theoretical approach via 0-epi maps, we study the connectivity properties and the topological dimension of the solution set of a parametrized family of compact vector fields

Nonlinear multiparametric equations, structure and topological dimension of global branches of solutions

Dati due spazi di Banach E ed F, un operatore di Fredholm di indice zero L: E→F ed un'applicazione compatta h: E→F, si prova che se il grado di Brouwer del campo vettoriale v: Ker L→coKer L, definito dalla composizione Ker
 e non nullo, allora l'equazione Lx=λh(x) ammette un connesso ⌆ di soluzioni (λ, x) eR×E i cui sottoinsiemi ⌆−=(λ,x) e ⌆: λ 0 sono entrambi non limitati, e che per λ=0 interseca E in un sottoinsieme non vuoto di v−1(0) ⊂Ker L. Si estende cosI, al caso di risonanza, un noto risultato di P. H. Rabinowitz in cui L e un isomorfismo.

/pdf/co-bifurcating-branches-of-solutions-for-nonlinear-pikd1hdm6i.pdf

Co-bifurcating Branches of solutions for nonlinear eigenvalue problems in Banach spaces

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A note on continuation problems

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Continuation theorems for Ambrosetti-Prodi type periodic problems

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Nonlinear multiparametric equations, structure and topological dimension of global branches of solutions

Co-bifurcating Branches of solutions for nonlinear eigenvalue problems in Banach spaces

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