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¼ìË÷ºóûÓз¢ÏּǼ¡£ ¼ì²éÄúµÄ¼ìË÷ʽµÄƴд¡£ ½«ÄúµÄ¼ìË÷ʽÓë¼ìË÷Ò³ÃæÖеļìË÷ʾÀýÏà±È½Ï¡£ ʹÓÃͨÅä·û (*¡¢$¡¢?) ²éÕÒµ¥´Ê¸´ÊýºÍ²»Í¬Æ´Ð´ÐÎʽ¡£(È磬 graph*nanofib* ¿É¼ìË÷ʯīÄÉÃ×ÏËά)¡£ ʹÓöà¸ö´ÊÓï²éÕÒÀàËƵĸÅÄî¡£(È磬 cell* phone* OR mobile phone*)¡£ ¿¼ÂÇÇå³ý¼ìË÷±í¡£´ËÇ°µÄ¼ìË÷ʽ¿ÉÄܱ£´æÔÚÆäËû×Ö¶ÎÖС£ ʾÀý: oil spill* mediterranean ʾÀý: water consum* ʾÀý: O'Brian C* OR OBrian C* ʾÀý: A-1009-2008 OR 0000-0002-1553-596X ʾÀý: Smith JC OR Smith J* ʾÀý: Cancer* OR Journal of Cancer Research and Clinical Oncology ʾÀý: 10.1134/S1061920808010020 »ò 10.1134* ʾÀý: CERN ʾÀý: 2001 or 1997-1999 ʾÀý: Unilever SAME India ¼ìË÷ ʾÀý: oil spill* mediterranean ¼ìË÷·¶Î§ Ö÷Ìâ ±êÌâ ×÷Õß ×÷Õß±êʶ·û ±àÕß ÍÅÌå×÷Õß ³ö°æÎïÃû³Æ DOI ³ö°æÄê µØÖ· Existence of positive solutions of third-order boundary value problems with integral boundary conditions in Banach spaces Author(s): Fu, D (Fu, Dan)[ 1 ] ; Ding, W (Ding, Wei)[ 1 ] Source: ADVANCES IN DIFFERENCE EQUATIONS DOI: 10.1186/1687-1847-2013-65 Published: 2013 Times Cited: 0 (from Web of Science) Cited References: 31 [ view related records ] Citation Map Abstract: This paper deals with positive solutions of a third-order differential equation in ordered Banach spaces, (phi(-x ''(t)))' = f(t,x(t)), t is an element of J, subject to the following integral boundary conditions: x(0) = theta, x ''(0) = theta, x(1) = integral(1)(0) g(t)x(t)dt, where theta is the zero element of E, g is an element of L[0,1] is nonnegative, phi:R -> R is an increasing and positive homomorphism, and phi(0) = theta(1). The arguments are based upon the fixed-point principle in cone for strict set contraction operators. Meanwhile, as an application, we also give an example to illustrate our results. Accession Number: WOS:000317974600001 Document Type: Article Language: English Author Keywords: positive solutions; boundary-value problem; fixed-point principle; cone; measure of noncompactness KeyWords Plus: IMPULSIVE INTEGRODIFFERENTIAL EQUATIONS; DIFFERENTIAL-EQUATIONS; P-LAPLACIAN Reprint Address: Ding, W (reprint author) Shanghai Normal Univ, Dept Math, Shanghai 200234, Peoples R China. Organization-Enhanced Name(s) Shanghai Normal University Addresses: [ 1 ] Shanghai Normal Univ, Dept Math, Shanghai 200234, Peoples R China Organization-Enhanced Name(s) Shanghai Normal University E-mail Addresses: dingwei@shnu.edu.cn Funding: Funding Agency Grant Number NNSF of China 11271261 Natural Science Foundation of Shanghai 12ZR1421600 Shanghai municipal education commission 10YZ74 Shanghai Normal University DZW912 [Show funding text][Hide funding text] This work was supported by the NNSF of China under Grant (No. 11271261), Natural Science Foundation of Shanghai (No. 12ZR1421600), Shanghai municipal education commission (No. 10YZ74), and Shanghai Normal University Leading Academic Discipline project (No. DZW912). Publisher: SPRINGER INTERNATIONAL PUBLISHING AG, GEWERBESTRASSE 11, CHAM, CH-6330, SWITZERLAND Web of Science Categories: Mathematics, Applied; Mathematics Research Areas: Mathematics IDS Number: 131EG |
3Â¥2013-06-30 21:21:46
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