On a class of functional difference equations: explicit solutions, asymptotic behavior and applications

Abstract

For ∈[0,1] and a complex parameter σ, Re\, σ>0, we discuss a linear inhomogeneous functional difference equation with variable coefficients on a complex plane z∈C: \[ (a1σ+a2σ)Y(z+β,σ)-(z)Y(z,σ)= F(z,σ), β∈R,\, β≠ 0, \] where (z) and F(z) are given complex functions, while a1 and a2 are given real non-negative numbers. Under suitable conditions on the given functions and parameters, we construct explicit solutions of the equation and describe their asymptotic behavior as |z| +∞. Some applications to the theory of functional difference equations and to the theory of boundary value problems governed by subdiffusion in nonsmooth domains are then discussed.