On an iterational method for the solution of the Cauchy problem for a quasi-linear differential-operator equation (Q1333679)

We consider an iterational process to find an approximate solution to the Cauchy problem for the equation \(u'+ A(t)u(t)+ {\mathcal F}u(t)= h(t)\), \(u(0)= 0\), \(0\leq t\leq T<\infty\), where \(A(t)\) is a linear operator with its range of definition independent of \(t\), and \(\mathcal F\) is a nonlinear operator subordinated to operator \(A(t)\) by an order smaller than 1. On every step the proposed iterational process leads to solving of a Cauchy problem for a linear differential-operator equation; in this situation, we do not assume that the nonlinear operator \(\mathcal F\) were a contracting one.