Publications-全部

Showing 1-25 of 61

Date▼ Title Type  Full Text
2018-07 Mathematical model for the enterprise competitive ability and performance through a particular Emden-Fowler Equation u″-n-q-1u(n)q=0 article (207)
2017-08 Applications of linear ordinary differential equations and dynamic system to economics – an example of Taiwan stock index TAIEX article (264)
2016-04 Nonexistence of global solutions of Emden-Fowler type semilinear wave equations with non-positive energy article (410)
2016 Nonexistence of positive global solutions to the differential equation article (137)
2015-09 A mathematical model of enterprise competitive ability and performance through Emden-Fowler equation for some enterprises article (952)
2015-09 A mathematical model of enterprise mathematical model of enterprise competitive Emden-Fowler equation for some enterprises article (404)
2015-06 EXISTENCE AND UNIQUENESS OF LOCAL WEAK SOLUTIONS FOR THE EMDEN-FOWLER WAVE EQUATION IN ONE DIMENSION article (474)
2015-03 The solution to an elliptic partial differential equation for facilitating exact volume integral transformation in the 3D BEM analysis article (738)
2015-02 A comparative study of flux limiters using new numerical methods in unsteady supersonic flows article (1235)
2014.04 TAIEX index option model by using nonlinear differential equation article (899)
2014-10 The space-jump model of the movement of tumor cells and health cells, article (957)
2013.12 Asymptotic behavior of positive solutions of the nonlinear differential equation t²u''= u{^n},1 < n article (568)
2013-12 On the positive solution of nonlinear differential equation t²u''= u{^n}1 < n article (436)
2013 一維 Emden-Fowler 型半線性波方程式解之存在區間之估計 report (207)
2012 一維 Emden-Fowler 型半線性波方程式 report (349)
2011.08 PARABOLA METHOD IN ORDINARY DIFFERENTIAL EQUATION article (514)
2011-12 The flux model of the movement of tumor cells and healthy cells using a system of nonlinear heat equations article (616)
2011 非線性擾動下高維有界域半線性波方式爆炸解之穩定性研究(I) report (433)
2010-07 On the Emden-Fowler equation u″(t)u(t) = c1 + c2u'(t)2 with c1 ≥ 0, c2 ≥ 0 article (524)
2010 非線性擾動下三維有界域半線性波方式爆炸解之穩定性研究 report (518)
2009.11 Analysis on numerical results for stage separation with different exhaust holes article (1103)
2009.08 Numerical treatment of contact discontinuity with multi-gasas article (980)
2009 非線性擾動下二維有界域半線性波方式爆炸解之穩定性研究 (II) report (553)
2009 Numeric treatment of contact discontinuity with multi-gases. article (270)
2008.06 Blow-up solutions to the nonlinear second order differential equation u article (483)