Extending the Kantorovich theory for solving equations

The famous Kantorovich theorem is an important result in numerical analysis and in Nonlinear Functional Analysis, where it is also used as a semilocal result for establishing the existence of a solution of a nonlinear equation in an abstract space. This chapter presents two different improvements of the convergence criteria for the Newton’s method by using the modified Newton’s method and a tight majorizing sequence for the Newton’s method.