Abstract
In this paper we establish extension theorems for additive mappings ϕ : A+ × B+ → C+, where A, B are Riesz spaces (lattice ordered spaces or vector lattices) and C is an order complete Riesz space, to the whole of A × B, thereby extending well-known results for additive mappings between Riesz spaces. We prove, in particular, that when A, B and C are order complete Riesz spaces, the ordered vector space Bb(A × B,C) of all order bounded bilinear mappings has the structure of a lattice space.
Citation
Rusen Yilmaz. "LATTICE OPERATIONS OF POSITIVE BILINEAR MAPPINGS." Taiwanese J. Math. 12 (1) 39 - 49, 2008. https://doi.org/10.11650/twjm/1500602487
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