Showing changes from revision #1 to #2:
Added | Removed | Changed
Whenever editing is allowed on the nLab again, this article should be ported over there.
In measure theory, a measure on a $\sigma$-frame or more generally a $\sigma$-complete distributive lattice is a valuation with
representing the mutually disjoint elements condition and the denumerably/countably additive condition.
In measure theory, a measure on a $\sigma$-frame or more generally a $\sigma$-complete distributive lattice is a valuation such that the elements are mutually disjoint and the probability valuation is denumerably/countably additive
In measure theory, a measure on a $\sigma$-frame or more generally a $\sigma$-complete distributive lattice is a valuation with
representing the mutually disjoint elements condition and the denumerably/countably additive condition.