Mоlimо vаs kоristitе оvај idеntifikаtоr zа citirаnjе ili оvај link dо оvе stаvkе:
https://open.uns.ac.rs/handle/123456789/16879
Pоljе DC-а | Vrеdnоst | Јеzik |
---|---|---|
dc.contributor.advisor | Pilipović Stevan | - |
dc.contributor.advisor | Prangoski Bojan | - |
dc.contributor.author | Jakšić Smiljana | - |
dc.contributor.other | Teofanov Nenad | - |
dc.contributor.other | Pilipović Stevan | - |
dc.contributor.other | Prangoski Bojan | - |
dc.contributor.other | Seleši Dora | - |
dc.contributor.other | Mitrović Slobodanka | - |
dc.date.accessioned | 2020-12-13T11:10:21Z | - |
dc.date.available | 2020-12-13T11:10:21Z | - |
dc.date.issued | 2016-09-28 | - |
dc.identifier.uri | https://open.uns.ac.rs/handle/123456789/16879 | - |
dc.description.abstract | <p>We study the expansions of the elements in <em>S</em>(ℝ<sub>+</sub><sup>d</sup>) and <em>S</em>'(ℝ<sub>+</sub><sup>d</sup>) with respect to the Laguerre orthonormal basis. As a consequence, we obtain the Schwartz kernel theorem for <em>S</em>(ℝ<sub>+</sub><sup>d</sup>) and <em>S</em>'(ℝ<sub>+</sub><sup>d</sup>). Also we give the extension theorem of Whitney type for <em>S</em>(ℝ<sub>+</sub><sup>d</sup>). Next, we consider the G-type spaces i.e. the spaces <em>G</em><sub><em>α</em></sub><sup><em>α</em></sup>(ℝ<sub>+</sub><sup>d</sup>), α≥1 and their dual spaces which can be described as analogous to the Gelfand-Shilov spaces and their dual spaces. Actually, we show the exist-ence of the topological isomorphism between the <em>G</em>-type spaces and the subspaces of the Gelfand-Shilov spaces <em>S</em><sub>α/2</sub><sup>α/2</sup>(ℝ<sup>d</sup>), α≥1 consisting of "even" functions. Next, we show that the Fourier Laguerre coecients of the elements in the <em>G</em>-type spaces and their dual spaces characterize these spaces through the exponential and sub-exponentia l growth of the coecients. We provide the full topological description and the kernel theorem is proved. Also two structural theorems for the dual spaces of <em>G</em>-type spaces are obtained. Furthemore, we dene the new class of the Weyl pseudo-dierential operators with radial symbols belonging to the G-type spaces and their dual spaces. The continuity properties of this class of pseudo-dierential operators over the Gelfand-Shilov type spaces and their duals are proved. In this way the class of the Weyl pseudo-dierential operators is extended to the one with the radial symbols with the exponential and sub-exponential growth rate.</p> | en |
dc.description.abstract | <p>Proučavamo razvoje elemenata iz <em>S</em>(ℝ<sub>+</sub><sup>d</sup>) i <em>S</em>'(ℝ<sub>+</sub><sup>d</sup>) preko Lagerove ortonormirane baze. Kao posledicu dobijamo Švarcovu teoremu o jezgru za preko Lagerove ortonormirane baze. Kao posledicu dobijamo Švarcovu teoremu o jezgru za <em>S</em>(ℝ<sub>+</sub><sup>d</sup>) i <em>S</em>'(ℝ<sub>+</sub><sup>d</sup>). Takođe, pokazujemo i Teoremu Vitnijevog tipa za <em>S</em>(ℝ<sub>+</sub><sup>d</sup>) . Zatim, posmatramo prostore G-tipa i.e. prostore <em>G</em><sub>α</sub><sup>α</sup>(ℝ<sup>d</sup>), α ≥ 1 i njihove duale koji su analogni sa Geljfand-Šilovim prostorima i njihovim dualima. Zapravo, pokazujemo da postoji topološki izomorfizam između prostora <em>G</em>-tipa i potprostora Geljfand-Šilovih prostora <em>S</em><sub>α/2</sub><sup>α/2</sup>(ℝ<sup>d</sup>), α ≥ 1 koji sadrže "parne" funkcije. Dalje, dokazujemo da Furije Lagerovi koeficijenti elemenata iz prostora <em>G</em>-tipa i njihovih duala karakterišu ove prostore kroz eksponencijalni i sub-eksponencijalni rast tih koeficijenata. Opisujemo topološku strukturu ovih prostora i dajemo Švarcovu teoremu o jezgru. Takođe, dve strukturalne teoreme za duale prostora <em>G</em>-tipa su dobijene. Dalje, definišemo novu klasu Vejlovih pseudo-diferencijalnih operatora sa radijalnim simbolima koji se nalaze u prostorima <em>G</em>-tipa i njihovim dualima. Pokazana je neprekidnost ove klase Vejlovih pseudo-diferencijalnih operatora na prostorima Geljfand-Šilova i na njihovim dualima. Na ovaj način klasa Vejlovih pseudo-diferencijalnih operatora je proširena na radijalne simbole koji imaju eksponencijalni i sub-eksponencijalni rast.</p> | sr |
dc.language.iso | en | - |
dc.publisher | Univerzitet u Novom Sadu, Prirodno-matematički fakultet u Novom Sadu | sr |
dc.publisher | University of Novi Sad, Faculty of Sciences at Novi Sad | en |
dc.source | CRIS UNS | - |
dc.source.uri | http://cris.uns.ac.rs | - |
dc.subject | Laguerre Expansions, Hermite expansions, Ultradistributions over R+d , Gelfand-Shilov spaces, Pseudo-dierential operators with Radial Symbols | en |
dc.subject | Lagerov razvoj, Ermiteov razvoj, Ultradistribucije na R+d , Gefand-Šilovi prostori, Pseudo-diferencijalni operatori sa radijalnim simbolima | sr |
dc.title | Distributions and ultradistributions on R+d through Laguerre expansions with applications to pseudo-diferential operators with radial symbols | en |
dc.title | Distributions and ultradistributions on R+d through Laguerre expansionswith applications to pseudo-dierential operators with radial symbols | sr |
dc.type | Thesis | en |
dc.identifier.url | https://www.cris.uns.ac.rs/DownloadFileServlet/Disertacija146796682108167.pdf?controlNumber=(BISIS)101443&fileName=146796682108167.pdf&id=6331&source=BEOPEN&language=en | en |
dc.identifier.url | https://www.cris.uns.ac.rs/record.jsf?recordId=101443&source=BEOPEN&language=en | en |
dc.identifier.externalcrisreference | (BISIS)101443 | - |
dc.source.institution | Prirodno-matematički fakultet u Novom Sadu | sr |
item.fulltext | No Fulltext | - |
item.grantfulltext | none | - |
Nаlаzi sе u kоlеkciјаmа: | PMF Teze/Theses |
Prеglеd/i stаnicа
8
Prоtеklа nеdеljа
1
1
Prоtеkli mеsеc
0
0
prоvеrеnо 10.05.2024.
Google ScholarTM
Prоvеritе
Stаvkе nа DSpace-u su zаštićеnе аutоrskim prаvimа, sа svim prаvimа zаdržаnim, оsim аkо nije drugačije naznačeno.