Initial-boundary problem with conjugation conditions for composite-type equations with two breakdown coefficients

In this paper we study the solvability of an initial-boundary value problem with conjugation conditions for two nonclassical differential equations of composite type. We describe the case when the coefficients of each equation under consideration have a discontinuity of the first kind at the point zero. The field of research is given in the form of a band, due to the presence of a discontinuity point consisting of two subregions. Thus, the investigated equations are considered in two different areas. To prove the existence and uniqueness of regular solutions (which have all the generalized derivatives entering into the equations) of the initial-boundary value problem, we use the method of continuation with respect to a parameter, which has a wide application in the theory of boundary value problems. Using the maximum principle, the presence of all necessary a priori estimates for the solutions of the problem being studied is established.