The solution in a class of singular functions of Cauchy type bisingular integral equations (Q1386646)

The paper deals with bisingular integral equations of the first kind \[ \frac{1}{\pi^2} \int_{-1}^1 \int_{-1}^1 \frac {\gamma(\xi,\eta) d\xi d\eta}{(\xi-x) (\eta-y)}= f(x,y)\tag{1} \] on the square \(I_0^2= (-1,1)\times (-1,1)\). The authors give explicit solutions of (1) in the class \(H_q^*(x,y)\) containing all functions which may be written in the form \[ \varphi(x,y)+ \psi(x,y)/ (q-x), \] where \(\varphi, \psi\) are Hölder continuous on all compact regions of \(I_0^2\) and are absolutely integrable over \(I_0^2\).