{"id":23746,"date":"2019-03-01T14:42:55","date_gmt":"2019-03-01T10:42:55","guid":{"rendered":"http:\/\/www.imm.az\/exp\/?page_id=23746"},"modified":"2019-03-01T14:52:14","modified_gmt":"2019-03-01T10:52:14","slug":"orucova-aygun-tofiq-qizi","status":"publish","type":"page","link":"https:\/\/www.imm.az\/exp\/%c9%99m%c9%99kdaslar\/orucova-aygun-tofiq-qizi\/","title":{"rendered":"Orucova Ayg\u00fcn Tofiq q\u0131z\u0131"},"content":{"rendered":"

\u018fsas elmi nailiyy\u0259tl\u0259ri<\/strong><\/p>\n

\u018fsas elmi istiqam\u0259t funksional f\u0259zalarda daxilolma teoreml\u0259rinin al\u0131nmas\u0131na h\u0259sr olunub. Ba\u015fqa s\u00f6zl\u0259, yeni parametrli Morri tipli f\u0259zalar daxil olunur. Bu f\u0259zalardan olan funksiyalar\u0131n diferensial v\u0259 diferensial-f\u0259rq xass\u0259l\u0259rini \u00f6yr\u0259nm\u0259k m\u0259qs\u0259dil\u0259 daxil olunmu\u015f f\u0259zalarda inteqral g\u00f6st\u0259rili\u015fi \u00fcsulu il\u0259 h\u0259m daxilolma, h\u0259m d\u0259 interpolyasiya tipli teoreml\u0259r isbat olunur. H\u0259m\u00e7inin bu f\u0259zalardan olan funksiyalar\u0131n \u00fcmumil\u0259\u015fmi\u015f qar\u0131\u015f\u0131q t\u00f6r\u0259m\u0259l\u0259rinin H\u00f6lder sinfin\u0259 daxil olmas\u0131 isbat olunur. Onu da qeyd ed\u0259k ki, parametrli halda hamarl\u0131l\u0131q g\u00f6st\u0259ricisinin klassik haldak\u0131ndan daha y\u00fcks\u0259k olmas\u0131 isbat olunur. Al\u0131nm\u0131\u015f n\u0259z\u0259ri n\u0259tic\u0259l\u0259r effektiv \u015f\u0259kild\u0259 uy\u011fun x\u00fcsusi t\u00f6r\u0259m\u0259li diferensial t\u0259nlikl\u0259rin h\u0259ll\u0259rinin varl\u0131\u011f\u0131, yegan\u0259liyi v\u0259 h\u0259llin hamarl\u0131l\u0131q m\u0259s\u0259l\u0259sin\u0259 t\u0259tbiq olunur. Ba\u015fqa s\u00f6zl\u0259, hamarl\u0131l\u0131q g\u00f6st\u0259ricisinin y\u00fcks\u0259k olmas\u0131 bax\u0131lan t\u0259nlikl\u0259rin \u00fcmumil\u0259\u015fmi\u015f h\u0259ll\u0259rinin klassik h\u0259ll\u0259r\u0259 daha da yax\u0131n olmas\u0131na imkan yarad\u0131r.<\/p>\n

Son be\u015f ild\u0259 \u00e7ap olunmu\u015f \u0259sas elmi i\u015fl\u0259rinin siyah\u0131s\u0131<\/strong><\/p>\n

    \n
  1. On Riesz-Thorin type theorems in Besov-Morrey spaces and its applications, American Journal of Mathematics and Mathematical Sciences vol.1, No.2, 2012,pp.139-154.(h\u0259mm\u0259llif A.M.Najafov).<\/li>\n
  2. On properties of generalized spaces Besov – Morrey, with dominant mixed derivatives, Proceeding of Institute of Mathematics and Mechanics, vol. 41, \u21161. Pp.3-15. Baku-2015 (h\u0259mm\u0259llif A.M.Najafov).<\/li>\n
  3. Interpolation theorems of the generalized Besov- Morrey type spaces with dominant mixed derivatives, Transactions of NAS of Azerbaijan, Issue Mathematics, 35 (4), 131-142 (2015).<\/li>\n
  4. On solutions of one class of partial differential equations, Electron. Jour. Qual. Theory Differ. Equ. 2017, No. 44, 1-9. IF.0,926 (Q1)TR https:\/\/doi.org\/10.14232\/ejqtde.2017.1.44 (h\u0259mm\u0259llif A.M.Najafov).<\/li>\n
  5. Interpolation theorems on the Nikolskii-Morrey type spaces, Caspian Journal of Applied Mathematics, Ecology and Economics, 6(1) July,2018, pp-111-121.(h\u0259mm\u00fc\u0259llif Mustafayeva F.F.)<\/li>\n
  6. On embedding theorems in Sobolev-Morrey type spaces Journal of Contemporary Applied Mathematics, Vol. 8, no2, 2018, http:\/\/journalcam.com\/wp-content\/uploads\/2018\/09\/2.pdf\u00a0(h\u0259mm\u00fc\u0259llif R.F. Babayev)<\/li>\n<\/ol>\n","protected":false},"excerpt":{"rendered":"

    \u018fsas elmi nailiyy\u0259tl\u0259ri \u018fsas elmi istiqam\u0259t funksional f\u0259zalarda daxilolma teoreml\u0259rinin al\u0131nmas\u0131na h\u0259sr olunub. Ba\u015fqa s\u00f6zl\u0259, yeni parametrli Morri tipli f\u0259zalar daxil olunur. Bu f\u0259zalardan olan funksiyalar\u0131n diferensial v\u0259 diferensial-f\u0259rq xass\u0259l\u0259rini \u00f6yr\u0259nm\u0259k m\u0259qs\u0259dil\u0259 daxil olunmu\u015f f\u0259zalarda inteqral g\u00f6st\u0259rili\u015fi \u00fcsulu il\u0259 h\u0259m daxilolma, h\u0259m d\u0259 interpolyasiya tipli teoreml\u0259r isbat olunur. H\u0259m\u00e7inin bu f\u0259zalardan olan funksiyalar\u0131n \u00fcmumil\u0259\u015fmi\u015f qar\u0131\u015f\u0131q […]<\/p>\n","protected":false},"author":6,"featured_media":0,"parent":260,"menu_order":0,"comment_status":"closed","ping_status":"closed","template":"","meta":{"footnotes":""},"_links":{"self":[{"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/pages\/23746"}],"collection":[{"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/pages"}],"about":[{"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/types\/page"}],"author":[{"embeddable":true,"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/users\/6"}],"replies":[{"embeddable":true,"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/comments?post=23746"}],"version-history":[{"count":2,"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/pages\/23746\/revisions"}],"predecessor-version":[{"id":23748,"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/pages\/23746\/revisions\/23748"}],"up":[{"embeddable":true,"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/pages\/260"}],"wp:attachment":[{"href":"https:\/\/www.imm.az\/exp\/wp-json\/wp\/v2\/media?parent=23746"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}