Convergence Criteria for Fixed Point Problems and Differential Equations

SOFONEA, MIRCEA; TARZIA, DOMINGO A.

Mathematics

Multidisciplinary Digital Publishing Institute (MDPI)

Año: 2024 vol. 12 p. 1 - 19

We consider a Cauchy problem for differential equations in a Hilbert space X. The problem is stated in a time interval I, which can be finite or infinite. We use a fixed point argument for history-dependent operators to prove the unique solvability of the problem. Then, we establish convergence criteria for both a general fixed point problem and the corresponding Cauchy problem. These criteria provide the necessary and sufficient conditions on a sequence (Formula presented.), which guarantee its convergence to the solution of the corresponding problem, in the space of both continuous and continuously differentiable functions. We then specify our results in the study of a particular differential equation governed by two nonlinear operators. Finally, we provide an application in viscoelasticity and give a mechanical interpretation of the corresponding convergence result.