Abstract Riemann integrability and measurability
We prove that the spectral sets of any positive abstract Riemann integrable function are measurable but (at most) a countable amount of them. In addition, the integral of such a function can be computed as an improper classical Riemann integral of the measures of its spectral sets under some weak continuity conditions which in fact characterize the integral representation.
Sortzailea
- de Amo, E.
- del Campo, R.
- M. Díaz
- Mariano Díaz
Gaia
- finitely additive integration
- localized convergence
- integral representation
- weak continuity conditions
- horizontal integration
Elementu mota
- model:article
Sortzailea
- de Amo, E.
- del Campo, R.
- M. Díaz
- Mariano Díaz
Gaia
- finitely additive integration
- localized convergence
- integral representation
- weak continuity conditions
- horizontal integration
Elementu mota
- model:article
Erakunde hornitzailea
Agregatzailea
Elementu honen baimenen egoera (besterik adierazi ezean)
- http://creativecommons.org/licenses/by-nc-sa/4.0/
Baimenak
- policy:public
Lekua-Unea
- 1123-1139
Iturria
- Czechoslovak Mathematical Journal | 2009 Volume:59 | Number:4
Identifikatzailea
- https://cdk.lib.cas.cz/client/handle/uuid:2a226ddb-2775-4317-8b05-2e8673baee6f
- uuid:2a226ddb-2775-4317-8b05-2e8673baee6f
- uuid:2a226ddb-2775-4317-8b05-2e8673baee6f
Formatua
- bez média
- svazek
Hizkuntza
- eng
- eng
Herrialde hornitzailea
- Czech Republic
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