Abstract
In this paper, the monotone method is extended to nonlocal hyperbolic intial-boundary value problems of first order. A comparison principle is established, and linear convergence of monotone sequences of upper and lower solutions is shown.
*Research of this author was supported by LEQSF under the.grant LEQSF(1996-99)-RD-A-36
*Research of this author was supported by LEQSF under the.grant LEQSF(1996-99)-RD-A-36
Notes
*Research of this author was supported by LEQSF under the.grant LEQSF(1996-99)-RD-A-36