Matemaatika- ja mehaanika-alaseid töid. Functional analysis and theory of summability
dc.contributor.author | Tartu Ülikool | |
dc.contributor.editor | Kolk, Enno, toimetaja | |
dc.date.accessioned | 2013-09-23T14:58:26Z | |
dc.date.available | 2013-09-23T14:58:26Z | |
dc.date.issued | 1993 | |
dc.description.tableofcontents | • Table of contents • Z. Balanov, V. Ayevski. On the solutions of nonlinear systems of elliptic equations with group symmetries • S. Baron, H. Tistz. Produktsatze für Potenzreihenverfahren und verallgemeinerte Nõrlund-Mittel • J. Boon, Т. Leigor. Weak wedge spaces and theorem of Mazur-Orlicz type • Kokk. Almost commutativity of spectrally bounded algebras • K. Kolk. On strong boundedness and summability with respect to a sequence of moduli • L. Loone, B.Tohver. On cores of summability methods generated by weighted means • I.J. Haddox. A class of dual sequence spaces • K. Oja. A note on M-ldeals of compact operators • V.Soomer. Inclusion theorems for strong summability • T. Sõrmus. Eine universale Beweismethode für Tauber-Sätze • A.Tall. Convexity conditions for families of summability methods • F.Vichmann. On the inclusion of the Poisson-Abel type methods for integrals • Yanetz. Summability factors and Tauberian theorems for double series | |
dc.description.uri | http://tartu.ester.ee/record=b1076175~S1*est | et |
dc.identifier.other | Per.A-1169 | |
dc.identifier.uri | http://hdl.handle.net/10062/33346 | |
dc.language | German | |
dc.language | Estonian | |
dc.language.iso | en | et |
dc.publisher | Tartu Riiklik Ülikool | et |
dc.relation.ispartofseries | Tartu Ülikooli toimetised;vihik 960 | |
dc.relation.ispartofseries | Tartu Ülikooli toimetised. Matemaatika- ja mehaanikaalaseid töid; | |
dc.subject | jätkväljaanded | et |
dc.subject | Tartu Ülikool | et |
dc.subject | funktsionaalanalüüs | et |
dc.subject | summeeruvusteooria | et |
dc.subject | artiklikogumikud | et |
dc.title | Matemaatika- ja mehaanika-alaseid töid. Functional analysis and theory of summability | et |
dc.type | Book | et |