In: Tatra Mountains Mathematical Publications, vol. 3, no. 2
Mirko Navara
Details:
Year, pages: 1993, 27 - 30
About article:
Lewt $A$ be a Boolean algebra and $m$ a (group-valued) measure on $A$. Then the kernel Ker $m$ is a concrete logic (= set-representable orthomodular poset). We exhibit the efficiency of this technique in constructions of concrete logics with special properties, e.g., the Jauch-Piron property.
How to cite:
ISO 690:
Navara, M. 1993. Kernel logics. In Tatra Mountains Mathematical Publications, vol. 3, no.2, pp. 27-30. 1210-3195.
APA:
Navara, M. (1993). Kernel logics. Tatra Mountains Mathematical Publications, 3(2), 27-30. 1210-3195.