«Previous Article|Table of Contents|Next Article»

《南京师大学报（自然科学版）》[ISSN:1001-4616/CN:32-1239/N]

Issue:

2008年04期

Page:

44-49

Research Field:

数学

Publishing date:

Info

Title:

Existence of Explosive Solutions for a Class of Quasilinear Ordinary Differential Equations

Author(s):

Zhao Jianqing¹; ²

1.Department of Mathematics,Lianyungang Teacher’s College,Lianyungang 222000,China
2. School ofMathem atics and Com puter S cien ce, Nan jing Norm alUn iversity, Nan jing 210097, Ch ina

Keywords:

quasilinear ord inary d ifferentia l equa tion;  nonlinear boundary cond itions;  Nagum o condition;  exp lo sive solu tions

PACS:

O175

DOI:

-

Abstract:

By the quadrature m ethod, an exp los ive so lu tion for a c lass o f quasilinear ord inary d iffe rentia l equations w ith boundary conditions a re obta ined.

References:

[ 1] AnuradhaV, B rown C, Sh iva jiR. Explosive nonnegative so lutions to tw o po int boundary va lue prob lem [ J]. Nonlinea rAna,l1996, 26( 3): 613-630.
[ 2] W ang Shin Hw a. Ex istence and mu ltiplicity of boundary blow-up n inegative so lutions to two-po int boundary va lue prob lem s[ J] . NonlinearAna,l 2000, 42( 2): 139-162.
[ 3] D iaz G, Le telier R. Exp losive so lutions of quasilinear e lliptic equations, ex istence and un iqueness[ J]. Non linear Ana,l1993, 20( 3): 97-125.
[ 4] La zerA C, M cKenna P J. On a prob lem of B iebe rbach and Radem acher[ J]. Non linear Ana ly sis, 1993, 21( 5): 327-335
[ 5] La zer A C, M ckenna P J. On s ingu lar boundary va lue prob lem s for the M onge-Am pere Operator [ J]. JM ath Ana l App,l1996, 197( 2): 341-362.
[ 6] B ieberbach L. $u= eu und d ie autom orphen Funk tionen[ J]. M a th Ann ln, 1916( 77): 173-212.
[ 7] M arcusM, V eron L. Uniqueness o f so lutions w ith b iow-up a t the bounda ry fo r a c lass of nonlinear e lliptic equa tion[ J]. C RA cad Sc i Pa ris, 1993, 317: 559-563.
[ 8] Pohozaev S L. The D irich le t problem for the equa tion $u = u2 [ J]. Dok lAkad SSSR, 1960, 134: 769-772.
[ 9] PosteraroM R. On the so lutions o f the equa tion $u= eu blow ing up on the boundary[ J] . C R Acad Sc i Par is, 1996, 322:445-450.
[ 10] Radem ache rH. E inige besondere prob lem partie ller differentia l g le ichungen[M ] / / D ie D ifferen tia-l und Integra lg leichungende rM echanik und Physik .l 2nd ed. New Yo rk: Rosenberg, 1943: 838-845.
[ 11] Keller J B. On so lutions o f $u= f ( u ) [ J]. Commun Pure ApplM ath, 1957( 10): 503-510.
[ 12] Kondra t. ev V A, N ik ishken V A. A sym ptotics, near the boundary, o f a s ingu lar boundary-va lue prob lem fo r a sem ilineare lliptic equation[ J]. D iff Urav, 1990( 26): 465-468.
[ 13] Loew ne r C, N irenberg L. Partial d iffe rentia l equations invar iant under the confo rma l o r pro jective transfo rma tions[M ] . NewYork: A cadem ic Press, 1974: 245-272.
[ 14] Zhang Zh ijun. Ex istence of exp lo sive so lutions to two-po int bounda ry va lue prob lem s[ J]. App lied M athem atics Letters,2004( 17) : 1 033-1 037.
[ 15] YangH uisheng, Yang Zuodong. Ex istence o f exp losive nonnegative solutions for a c lass of quasilinea r ord inary d ifferential equations[J]. Journal o fN an jing Normal
Un iversity: N atural Sc ience Edition, 2004, 27( 2): 5-9.

Memo

Memo:

-

Common functions

Last Update: 2013-05-05