Closure operator induced by orthogonality and orthomodular law

Rok, strany: 1993, 47 - 52

Orthogonality relation is the basic notion for the construction of two lattices of all closed sets and of all open sets, respectively. If these lattices are orthomodular then for any set contained in the intersection of these lattices, orthocomplementation in the lattice of closed sets and orthocomplementation in the lattice of open sets are equal. This condition is not sufficient.

ISO 690:

Konôpka, P. 1993. Closure operator induced by orthogonality and orthomodular law. In Tatra Mountains Mathematical Publications, vol. 3, no.2, pp. 47-52. 1210-3195.

APA:

Konôpka, P. (1993). Closure operator induced by orthogonality and orthomodular law. Tatra Mountains Mathematical Publications, 3(2), 47-52. 1210-3195.