An intermediate value theorem in ordered Banach spaces
Abstract
We consider a monotone increasing operator in an ordered Banach space having u- and u+ as a strong super- and subsolution, respectively. In contrast with the well studied case u+ < u-, we suppose that u- < u+. Under the assumption that the order cone is normal and minihedral, we prove the existence of a fixed point located in the ordered interval [u-,u+].
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