GENERALIZED LINEAR DIFFERENTIAL EQUATIONS IN A BANACH SPACE: CONTINUOUS DEPENDENCE ON A PARAMETER

This paper deals with integral equations of the form x(t) = (x) over tilde x +integral(t)(a) d [A] x + f (t) - f (a), t is an element of [a, b], in a Banach space X, where -infinity < a < b < infinity, <(x)over tilde> is an element of X, f : [a; b] -> X is regulated on [a, b], and A (t) is for each t is an element of [a; b] a linear bounded operator on X, while the mapping A : [a, b] -> L (X) has a bounded variation on [a, b]. Such equations are called gener alized linear differential equations. Our aim is to present new results on the continuous dependence of solutions of such equations on a parameter. Furthermore, an application of these results to dynamic equations on time scales is given. (AU)