| Form of presentation | Articles in international journals and collections |
| Year of publication | 2016 |
| Язык | английский |
|
Novikov Andrey Andreevich, author
|
| Bibliographic description in the original language |
Novikov A.A, Eskandarian Z., Inductive and projective limits of Banach spaces of measurable functions with order unities with respect to power parameter//Russian Mathematics. - 2016. - Vol.60, Is.10. - P.67-71. |
| Annotation |
We prove that a measurable function f is bounded and invertible if and only if there exist at least two equivalent norms by order unit spaces with order unities fα and fβ with α > β > 0. We show that it is natural to understand the limit of ordered vector spaces with order unities fα (α approaches to infinity) as a direct sum of one inductive and one projective limits. We also obtain some properties for the corresponding limit topologies. |
| Keywords |
inductive limit, projective limit, initial topology, final topology, order unit space, measurable functions, Banach space, Fréchet space, locally convex space |
| The name of the journal |
Russian Mathematics
|
| URL |
https://www.scopus.com/inward/record.uri?eid=2-s2.0-84988884463&partnerID=40&md5=8150a6bf326494a5ee084432b5217449 |
| Please use this ID to quote from or refer to the card |
https://repository.kpfu.ru/eng/?p_id=148082&p_lang=2 |
Full metadata record  |
| Field DC |
Value |
Language |
| dc.contributor.author |
Novikov Andrey Andreevich |
ru_RU |
| dc.date.accessioned |
2016-01-01T00:00:00Z |
ru_RU |
| dc.date.available |
2016-01-01T00:00:00Z |
ru_RU |
| dc.date.issued |
2016 |
ru_RU |
| dc.identifier.citation |
Novikov A.A, Eskandarian Z., Inductive and projective limits of Banach spaces of measurable functions with order unities with respect to power parameter//Russian Mathematics. - 2016. - Vol.60, Is.10. - P.67-71. |
ru_RU |
| dc.identifier.uri |
https://repository.kpfu.ru/eng/?p_id=148082&p_lang=2 |
ru_RU |
| dc.description.abstract |
Russian Mathematics |
ru_RU |
| dc.description.abstract |
We prove that a measurable function f is bounded and invertible if and only if there exist at least two equivalent norms by order unit spaces with order unities fα and fβ with α > β > 0. We show that it is natural to understand the limit of ordered vector spaces with order unities fα (α approaches to infinity) as a direct sum of one inductive and one projective limits. We also obtain some properties for the corresponding limit topologies. |
ru_RU |
| dc.language.iso |
ru |
ru_RU |
| dc.subject |
inductive limit |
ru_RU |
| dc.subject |
projective limit |
ru_RU |
| dc.subject |
initial topology |
ru_RU |
| dc.subject |
final topology |
ru_RU |
| dc.subject |
order unit space |
ru_RU |
| dc.subject |
measurable functions |
ru_RU |
| dc.subject |
Banach space |
ru_RU |
| dc.subject |
Fréchet space |
ru_RU |
| dc.subject |
locally convex space |
ru_RU |
| dc.title |
Inductive and projective limits of Banach spaces of measurable functions with order unities with respect to power parameter |
ru_RU |
| dc.type |
Articles in international journals and collections |
ru_RU |
|
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