Abstract
We study the relationship between the category of R-modules (CR-M) and the category of intuitionistic fuzzy modules (CR−IFM). We construct a category CLat(R−IFM) of complete lattices corresponding to every object in CR−M and then show that, corresponding to each morphism in CR−M, there exists a contravariant functor from CR−IFM to the category CLat (=union of all CLat(R−IFM), corresponding to each object in CR−M) that preserve infima. Then, we show that the category CR−IFM forms a top category over the category CR−M. Finally, we define and discuss the concept of kernel and cokernel in CR−IFM and show that CR−IFM is not an Abelian Category.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)