Tensorial decomposition of concept lattices

Building and maintaining the class hierarchy has been recognized as an important but one of the most difficult activities of object-oriented design. Concept (or Galois) lattices and related structures are presented as a framework for dealing with the design and maintenance of class hierarchies. Beca

The q, t-Macdonald polynomials are conjectured by Garsia and Haiman to have a representation theoretic interpretation in terms of the S n -module M + spanned by the derivatives of a certain polynomial 2 + (x 1 , x 2 , ..., x n ; y 1 , y 2 , ..., y n ). The diagonal action of a permutation \_ # S n o

We study the primary decomposition of lattice basis ideals. These ideals are binomial ideals with generators given by the elements of a basis of a saturated integer lattice. We show that the minimal primes of such an ideal are completely determined by the sign pattern of the basis elements, while th

We propose two processes to obtain L-fuzzy concepts based on finite L-fuzzy contexts and the theory of Cousot and Cousot [Pacific J. Math. 82 (1979) 43]. The first algorithm calculates the L-fuzzy concepts derived from an L-fuzzy set and the second one constructs the whole L-fuzzy concept lattice. W