General Cauchy-Lipschitz theory for shifted and non shifted ∆-Cauchy problems on time scales
- Löıc Bourdin, Emmanuel Trélat
In the paper, we prove the existence of solutions and Carathéodory’s type solutions of the dynamic Cauchy problem x(t) = f(t, x(t)), t ∈ T, x(0) = x0, where T denotes an unbounded time scale (a nonempty closed subset of R and such that there exists a sequence (xn) in T and xn → ∞) and f is continuous or satisfies Carathéodory’s conditions and some conditions expressed in terms of measures of noncompactness. The Sadovskii fixed point theorem and Ambrosetti’s lemma are used to prove the main result. The results presented in the paper are new not only for Banach valued functions, but also for real-valued functions.