Please use this identifier to cite or link to this item:
https://open.uns.ac.rs/handle/123456789/30753| DC Field | Value | Language |
|---|---|---|
| dc.contributor.advisor | Pilipović Stevan | - |
| dc.contributor.advisor | Vindas Jasson | - |
| dc.contributor.author | Димовски Павел | - |
| dc.contributor.other | Teofanov Nenad | - |
| dc.contributor.other | Pilipović Stevan | - |
| dc.contributor.other | Vindas Jasson | - |
| dc.contributor.other | Nedeljkov Marko | - |
| dc.contributor.other | Kostić Marko | - |
| dc.date.accessioned | 2020-12-14T18:51:41Z | - |
| dc.date.available | 2020-12-14T18:51:41Z | - |
| dc.date.issued | 2015-04-21 | - |
| dc.identifier.uri | https://open.uns.ac.rs/handle/123456789/30753 | - |
| dc.description.abstract | <p>We use common notation ∗ for distribution (Scshwartz), (M<sub>p</sub>) (Beurling) i {M<sub>p</sub>} (Roumieu) setting. We introduce and study new (ultra) distribution spaces, the test function spaces <em>D<sup>∗</sup><sub>E</sub></em> and their strong duals <em>D<sup><span style="font-size: 10px;">'</span>∗</sup><sub>E’*</sub></em>.These spaces generalize the spaces <em>D<sup>∗</sup><sub>L<sup>q</sup></sub> , D'<sup>∗</sup><sub>L<sup>p</sup></sub> , B’*</em> and their weighted versions. The construction of our new (ultra)distribution spaces is based on the analysis of a suitable translation-invariant Banach space of (ultra)distribution <em>E</em> with continuous translation group, which turns out to be a convolution module over the Beurling algebra <em>L<sup>1</sup><sub>ω</sub></em>, where the weight ω is related to the translation operators on <em>E</em>. The Banach space <em>E</em><sup>’</sup><sub>∗</sub> stands for <em>L<sup>1</sup><sub>ωˇ</sub> ∗ E</em>’. We apply our results to the study of the convolution of ultradistributions. The spaces of convolutors <em>O<span style="font-size: 12px;">’<sup>∗</sup></span><span style="font-size: 8.33333px;">C</span></em><span style="font-size: 12px;"><em> (</em><strong>R</strong><em><sup>n</sup>)</em> </span>for tempered ultradistributions are analyzed via the duality with respect to the test function<br />spaces<span style="font-size: 12px;"> <em>O<sup>∗</sup><sub>C</sub> (</em><strong>R</strong><em><sup>n</sup>)</em>, </span>introduced in this thesis. Using the properties of translationinvariant<br />Banach space of ultradistributions <em>E</em> we obtain a full characterization of<br />the general convolution of Roumieu ultradistributions via the space of integrable<br />ultradistributions is obtained. We show: The convolution of two Roumieu ultradistributions <span style="font-size: 12px;"><em>T, S ∈ D’<sup>{Mp}</sup> (</em><strong>R</strong><em><sup>n</sup>) </em> exists if and only if <em>(</em></span><em>φ</em><span style="font-size: 12px;"><em> ∗ Š) T ∈ D<sup>’{Mp}</sup><sub>L<sup>1</sup></sub>(</em><strong>R</strong><em><sup>n</sup>)</em> for every </span><em>φ</em><span style="font-size: 12px;"><em> ∈ D <sup>{Mp}</sup> (</em><strong>R</strong><em><sup>n</sup>)</em>. </span>We study boundary values of holomorphic functions defined in tube domains. New edge of the wedge theorems are obtained. The results<br />are then applied to represent<span style="font-size: 12px;"> <em>D’<sub>E’*</sub></em></span><span style="font-size: 12px;"> </span>as a quotient space of holomorphic functions.<br />We also give representations of elements of<span style="font-size: 12px;"> <em>D’<sub>E’*</sub></em></span><span style="font-size: 12px;"> </span>via the heat kernel method.</p> | en |
| dc.description.abstract | <p>Koristimo oznaku ∗ za distribuciono (Svarcovo), (Mp) (Berlingovo) i {Mp} (Roumieuovo) okruženje. Uvodimo i prouavamo nove (ultra)distribucione prostore, test funkcijske prostore <em>D</em><sup>∗</sup><sub>E</sub> i njihove duale <em>D<sup>'</sup></em><sup>∗</sup><sub><em>E'*</em></sub>. Ovi prostori uopštavaju <br />prostore <em>D</em><sup>∗</sup><sub>Lq</sub> , <em>D</em><sup>'∗</sup><sub>Lp</sub> , <em>B<sup>'</sup></em><sup>∗</sup> i njihove težinske verzije. Konstrukcija naših novih <br />(ultra)distribucionih prostora je zasnovana na analizi odgovarajuićh translaciono <br />- invarijantnih Banahovih prostora (ultra)distribucija koje označavamo sa <em>E</em>. Ovi prostori imaju neprekidnu grupu translacija, koja je konvolucioni modul nad Beurlingovom algebrom L<sup>1</sup><sub>ω</sub>, gde je težina ω povezana sa operatorima translacije <br />prostora <em>E</em>. Banahov prostor <em>E<sup>'</sup></em><sub>∗ </sub>označava prostor <em>L</em><sup>1</sup><sub>ω˅</sub> ∗ <em>E<sup>'</sup></em>. Koristeći dobijene <br />rezultata proučavamo konvoluciju ultradistribucija. Prostori konvolutora <em>O<sup>'</sup></em><sup>∗</sup><sub><em>C </em></sub>(<strong>R</strong><sup>n</sup>) temperiranih ultradistribucija, analizirani su pomoću dualnosti <br />test funkcijskih prostora <em>O</em><sup>∗</sup><sub><em>C</em></sub> (<strong>R</strong><sup>n</sup>), definisanih u ovoj tezi. Koristeći svojstva <br />translaciono - invarijantnih Banahovih prostora temperiranih ultradistribucija, <br />opet označenih sa <em>E</em>, dobijamo karakterizaciju konvolucije Romuieu-ovih ultradistribucija, preko integrabilnih ultradistribucija. Dokazujemo da: konvolucija <br />dve Roumieu-ove ultradistribucija <em>T</em>, <em>S</em> ∈ <em>D<sup>'</sup></em><sup>{Mp} </sup>(<strong>R</strong><sup>n</sup>) postoji ako i samo ako (φ ∗ <em>S</em>ˇ)<em>T</em> ∈ <em>D<sup>'</sup></em><sup>{Mp} </sup><sub>L<sup>1</sup></sub> (<strong>R</strong><sup>n</sup>) za svaki φ ∈ <em>D</em><sup>{Mp}</sup>(<strong>R</strong><sup>n</sup>). Takođe, proučavamo granične vrednosti holomorfnih funkcija definisanih na tubama. Dokazane su nove teoreme ”otrog klina”. Rezultati se zatim koriste za prezentaciju <em>D<sup>'</sup><sub>E<sup>'</sup></sub></em><sub>∗ </sub>preko faktor prostora holomorfnih funkcija. Takođe, data je prezentacija elemente <em>D</em><sup>'</sup><sub><em>E<sup>'</sup></em>∗ </sub>koristeći heat kernel metode.</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 | Tempered distributions; Tempered ultradistributions; Translation-invariant; Convolution of distributions; Convolution of ultradistributions; Convo-lutors; Beurling algebra; Parametrix | en |
| dc.subject | Temperirane distribucije; Temperirane ultradistribucije; Translaciono-invarijantan; Konvolucija distribucija; Konvolucija ultradistribucija; Konvolutore; Berling algebra; Parametriks | sr |
| dc.title | Translation invariant Banach spaces of distributions and boundary values of integral transform | en |
| dc.title | Translaciono invarijantni Banahovi prostori distribucija i granične vrednosti preko integralne transformacije | sr |
| dc.type | Thesis | en |
| dc.identifier.url | https://www.cris.uns.ac.rs/DownloadFileServlet/Disertacija144171089728453.pdf?controlNumber=(BISIS)93767&fileName=144171089728453.pdf&id=4262&source=BEOPEN&language=en | en |
| dc.identifier.url | https://www.cris.uns.ac.rs/record.jsf?recordId=93767&source=BEOPEN&language=en | en |
| dc.identifier.externalcrisreference | (BISIS)93767 | - |
| dc.source.institution | Prirodno-matematički fakultet u Novom Sadu | sr |
| item.grantfulltext | none | - |
| item.fulltext | No Fulltext | - |
| Appears in Collections: | PMF Teze/Theses | |
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