Geodesic
Fuzzy equality and convergences for $F$-observables in $F$-quantum spaces
Applications of Mathematics, Tome 36 (1991) no. 1, pp. 32-45

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MR Zbl
We introduce a fuzzy equality for $F$-observables on an $F$-quantum space which enables us to characterize different kinds of convergences, and to represent them by pointwise functions on an appropriate measurable space.
We introduce a fuzzy equality for $F$-observables on an $F$-quantum space which enables us to characterize different kinds of convergences, and to represent them by pointwise functions on an appropriate measurable space.
DOI : 10.21136/AM.1991.104442
Classification : 03E72, 04A72, 28A20, 28E10
Keywords: $F$-quantum space; $F$-state; $F$-observable; representation theorem of $F$-observables; convergence of $F$-observables; soft fuzzy $\sigma$-algebras; fuzzy equalities; fuzzy inequalities; fuzzy sets 
Chovanec, Ferdinand; Kôpka, František. Fuzzy equality and convergences for $F$-observables in $F$-quantum spaces. Applications of Mathematics, Tome 36 (1991) no. 1, pp. 32-45. doi: 10.21136/AM.1991.104442
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