1 Introduction
Uniqueness of the solution
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3 Uniqueness of the solutionTo prove the uniqueness of solution, we use the ideas formulated in [?]. Thus, we first deduce an integral representation equivalent to (6). Integrating the equation (1) from the problem over the domain and using (2)-(6), we find (27) For simplicity considered in (27), case , . Under assumptions of Theorem 2, (1)-(6) has a unique solution. Proof. First, we shall show that uniqueness holds in some . Then it will be shown that . Let and be solutions of problem (1)-(6) and, in addition, let . For each group of solutions, the representation (27). Considering the difference, we find (28) where are solutions between and , i.e. By the Theorem 2 we have For the difference , , problems are obtained (29) where , , , . From (29), by the maximum principle, we find (30) (31) We now estimate the components of relation (28): where , . Let . Then and we have (32) Dividing (32) by , we get (33) For the function , in view of (30) and (31), we now obtain: or (34) where Using (34) for we have The integral term can be estimated as follows: Consider an auxiliary problem whence, by the maximum principle, we get We introduce the function This enables us to write By the maximum principle, we find Since , we conclude that Therefore, If we pass to the limit as in (33), then the right-hand side of (33) tends to zero, and we arrive at a contradiction. Therefore, and, in addition, , , . We establish the uniqueness of solution of the problem for any as follows: Let . If , then the problem is solved. Otherwise, we assume that the parameter is bounded and repeat the reasoning presented above in the interval . As a result, we again arrive at a contradiction. Theorem 3 is proved. Download 96.71 Kb. Do'stlaringiz bilan baham: 
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