Caratheodory's solution of the Cauchy problem and question Z.Grande

Abstract

It is shown that for a function f: R2 R which is measurable with respect to the first variable and upper semicontinuous quasicontinuous and increasing with respect to the second variable there exists a Caratheodory's solution y(x)=y0+∫x0xf(t,y(t))dμ(t) of the Cauchy problem y'(x)=f(x,y(x)) with the initial condition y(x0)=y0. There are constructed examples which indicate to essentiality of condition of increasing and give the negative answer to a question of Z.~Grande.