On a class of two-dimensional adjoint integral equations of Volterra type (Q656497)

The following two-dimensional integral equations of Volterra type with fixed singular kernels are studied \[ u(x,y)+\lambda\int\limits_{a}^{x}\frac{u(t,y)}{t-a}dt- \mu\int\limits_{y}^{b}\frac{u(x,s)}{b-s}ds+ \delta\int\limits_{a}^{x}\frac{dt}{t-a}\int\limits_y^b\frac{u(t,s)}{b-s}ds=f(x,y), \tag{1} \] and the adjoint equation \[ v(x,y)+\frac{\lambda}{x-a}\int\limits_{x}^{a_0}v(t,y)dt-\frac{\mu}{b-y}\int\limits_{b_0}^{y}v(x,s)ds+ \frac{\delta}{(x-a)(b-y)}\int\limits_{x}^{a_0}dt\int\limits_{b_0}^{y}v(t,s)ds=g(x,y), \tag{2} \] where \(a<x<a_0\), \(b_0<y<b\), \(f(x,y)\) and \(g(x,y)\) are given functions and \(\lambda,\mu,\delta\) are some constants. For various values of the parameters occurring in these equations, the authors prove their unique solvability and establish the asymptotic behavior of the obtained solution.