Abstract
This chapter discusses certain applications of the theory of singular integral equations. Hubert's problem can be formulated to find a function which is analytic in the region D if the values of its real part are given on some parts of the contour, and the imaginary part is given on the remainder. The Schwarz kernel for the half-plane is easy to construct. The chapter also discusses the problem of two elastic half-planes in contact, and the problem of two elastic half-planes in contact. In the case when there are several stamps on the half-plane, the problem is solved in just the same way, in principle, as in the case of a single stamp; the calculations, however, are rather more complicated.
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