In: Tatra Mountains Mathematical Publications, vol. 49, no. 2
Reinhard Börger
Details:
Year, pages: 2011, 49 - 58
Keywords:
sequential space, weakly Hausdorff sequential orthomodular poset (WHSOP), sequentially
convex space, polymeasure, tensor product, sequentially convex algebra,
idempotent, multiplicative measure, involution
About article:
We investigate measures on sequential orthomodular posets with values in a vector space or a (not necessarily commutative) algebra with reasonable sequential topologies, using a universal property. Unfortunately, the universal measure and the universal multiplicative measure need not coincide any more as in the commutative situation. This may have applications in quantum physics.
How to cite:
ISO 690:
Börger, R. 2011. Measures and idempotents in the non-commutative situation. In Tatra Mountains Mathematical Publications, vol. 49, no.2, pp. 49-58. 1210-3195.
APA:
Börger, R. (2011). Measures and idempotents in the non-commutative situation. Tatra Mountains Mathematical Publications, 49(2), 49-58. 1210-3195.