On Vector Lattice-Valued Measures
On Vector Lattice-Valued Measures
E. Hewitt [1] used the Daniell approach to define a real-valued measure function on a σ-algebra of the real line. He began by defining an arbitrary non-negative linear functional I on L ∞ ∞ (R), (the space of all complex-valued continuous functions on the real line R which vanish off …