Uniqueness Implies Existence on Time Scales

## Abstract We consider a singular anisotropic quasilinear problem with Dirichlet boundary condition and we establish two sufficient conditions for the uniqueness of the solution, provided such a solution exists. The proofs use elementary tools and they are based on a general comparison lemma combi

## Abstract For the __n__th order nonlinear differential equation, __y__^(__n__)^ = __f__(__x__, __y__, __y__′, …, __y__^(__n__−1)^), we consider uniqueness implies existence results for solutions satisfying certain (__k__ + __j__)‐point boundary conditions, 1 ⩽ __j__ ⩽ __n__ − 1, and 1 ⩽ __k__ ⩽ _

Linear and nonlinear Hamiltonian systems are studied on time scales . We unify symplectic flow properties of discrete and continuous Hamiltonian systems. A chain rule which unifies discrete and continuous settings is presented for our so-called alpha derivatives on generalized time scales. This chai

We consider the structure of the solution set of a nonlinear Sturm-Liouville boundary value problem defined on a general time scale. Using global bifurcation theory we show that unbounded continua of nontrivial solutions bifurcate from the trivial solution at the eigenvalues of the linearization, an