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dc.contributor.author蔡瓊萩en_US
dc.contributor.authorTsai,Chiung-chiouen_US
dc.contributor.author郭滄海en_US
dc.contributor.authorKao,Tsang-Haien_US
dc.date.accessioned2014-12-12T02:10:58Z-
dc.date.available2014-12-12T02:10:58Z-
dc.date.issued1992en_US
dc.identifier.urihttp://140.113.39.130/cdrfb3/record/nctu/#NT810507011en_US
dc.identifier.urihttp://hdl.handle.net/11536/57111-
dc.description.abstract令.OMEGA.為一個在■上的有界集合,而且其邊界.prtl..OMEGA. .in.■. 我們研究底下這個擬線性橢圓問題:■其中■.in.■,.lgvert.g(x,r,. xi.).lgvert..ltorsim.h.(.lgvert. r.lgvert.)(1+■),0.ltorsim.. theta..ltorsim.2,並且h是個局部有界函數.假設對所有(x,r,.xi.).in.. OMEGA.*R*■,g滿足■此處■和■是非負函數.當0.ltorsim..theta.. ltorsim.,我們可証得在■.intersection.■中u的強解存在性,並且若p> N/2時■.intersection.■中u的強解皆■有界.接下來我們考慮下列擬線 性橢圓特徵值問題:■其中■.in.■,且g.in.■.那麼對所有p,p. ltorsim.<.inf.,存在■使得當 0.ltorsim..lambda.<■此特徵值有解u. in.■.intersection.■. Let .OMEGA. be a bounded set in ■ with its boundary .prtl.. OMEGA..in.■. We study the following qualinear ellptic problem: ■ where ■.in.■,.lgvert.g(x,r,.xi.).lgvert..ltorsim.h(. lgvert. r.lgvert.)(1+■),0.ltorsim..theta..ltorsim.2 and h is a locally bounded function. Suppose that g satisfies the following condition: g(x,r,.xi.) sign r .ltorsim.■+■.lgvert.. xi..lgvert. for all (x,r,.xi.).in..OMEGA.*R*■where■and■are nonnegative constants. Whenever 0<.theta.<2,the existence of strong solutions u.in.■(.OMEGA.).intersection.■(.OMEGA.) is proved and all the solutions u.in.■(.OMEGA.).intersection.■(. OMEGA.) are ■ bounded for p>N/2. Consider the following quasilinear elliptic eigenvalue problem:■ where ■and■. Thus for each p,1.ltorsim.p<.inf.,there exists a ■>0 such that the eigenvalue problem has a solution u.in.■.intersection.■ whenever 0.ltorsim..lambda.<■.zh_TW
dc.language.isoen_USen_US
dc.subject擬線性; 橢圓型; 強解; 特徵值問題zh_TW
dc.subjectquasilinear;elliptic;strong solution;eigenvalue problemen_US
dc.title某些擬線性橢圓型問題其強解的存在性zh_TW
dc.titleExistence of Strong Solutions for Some Quasilinear Elliptic Problemen_US
dc.typeThesisen_US
dc.contributor.department應用數學系所zh_TW
Appears in Collections:Thesis