By using the cone theory and non-symmetry iteration method, it is studied the existence and uniqueness of solutions of increasing operator equations without continuity and compactness conditions.
利用锥理论和非对称迭代方法,讨论了不具有连续性和紧性条件的增算子方程解的存在唯一性。
In this paper, we retains the cone P normal cone, increasing operator A weaken the weakly continuous operator, space E weaken the weak complete space.
保留锥P为正规锥,将增算子A减弱为弱连续。空间E减弱为弱完备,在条件减弱的情况下,仍然得到了增算子不动点的存在性。
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