A topos view of the type-2 fuzzy truth value algebra

Abstract

It is known that fuzzy set theory can be viewed as taking place within a topos. There are several equivalent ways to construct this topos, one is as the topos of \'etal\'e spaces over the topological space Y=[0,1) with lower topology. In this topos, the fuzzy subsets of a set X are the subobjects of the constant \'etal\'e X× Y where X has the discrete topology. Here we show that the type-2 fuzzy truth value algebra is isomorphic to the complex algebra formed from the subobjects of the constant relational \'etal\'e given by the type-1 fuzzy truth value algebra I=([0,1],,,,0,1). More generally, we show that if L is the lattice of open sets of a topological space Y and X is a relational structure, then the convolution algebra LX is isomorphic to the complex algebra formed from the subobjects of the constant relational \'etal\'e given by X in the topos of \'etal\'e spaces over Y.