... n), and the proof iscomplete. The following theorem deals with the continuous dependence of the solution of (26)and (27) on the functions F1, F2and the initial value f (m), g(n).Theorem ... g(m, n) ≡ 0,q =1,p ≥ 1, then Theorem 2.1 reduces to [[13], Theorem 1].Following a similar process as the proof of Theorem 2.1, we have the following threetheorems.Theorem 2.2.Supposeu, a, ... is decreasing in the second variable” in Theorem 2.5, thenTheorem 2.5 reduces to [[14], Theorem 7]. Furthermore, if g(m, n ) ≡ 0, q =1,p ≥ 1,then Theorem 2.5 reduces to [[13], Theorem 3].Following...