Facebook Instagram Twitter RSS Feed PodBean Back to top on side

Product of lattice-valued measures on topological spaces

In: Mathematica Slovaca, vol. 58, no. 3
Surjit Singh Khurana
Detaily:
Rok, strany: 2008, 309 - 314
Kľúčové slová:
tight measure, $\tau$-smooth measure, Dedekind complete vector lattice, weakly \mbox{$\sigma$-distributive} vector lattice, Baire set
O článku:
$X1$ and $X2$ are completely regular Hausdorff spaces, $E1$, $E2$ and $F$ are Dedekind complete Banach lattices, $\langle·, · \langle: E1 × E2 \to F$ is a bilinear mapping, and $μ1$ and $μ2$ are, respectively, $ E1 $ and $E2$ valued positive, countably additive Baire or Borel measures (countable additivity relative to order convergence) on $X1$ and $X2$. Under certain conditions the existence and uniqueness of the \mbox{$F$-valued}, positive, product measure is proved.
Ako citovať:
ISO 690:
Khurana, S. 2008. Product of lattice-valued measures on topological spaces. In Mathematica Slovaca, vol. 58, no.3, pp. 309-314. 0139-9918.

APA:
Khurana, S. (2008). Product of lattice-valued measures on topological spaces. Mathematica Slovaca, 58(3), 309-314. 0139-9918.