摘要
研究了具有曲率和挠率的二维弦引力模型,在定态情况下证明了世界面时空上运动方程和极值曲线的可积性,发现具有质量的点粒子的运动速度可由标量场方程的首次积分表示;另外,还研究了场方程的数值解,分析了弦耦合对奇点附近粒子运动速度的影响.
The two-dimensional string gravity model with curvature and torsion is studied in this paper. In the stationary case, it is proved that equations of the motion and extremal curves are integrable. It is found that the velocity of a massive point-like particle can be expressed by the first integrals of these equations. Moreover, the numerical solutions of the field equation are inverstigated, and the influence of string coupling on the motion velocity of the particle is also analyzed.
出处
《四川师范大学学报(自然科学版)》
CAS
CSCD
2004年第6期626-629,共4页
Journal of Sichuan Normal University(Natural Science)
关键词
二维弦引力模型
运动性质
弦耦合
Two-dimensional string gravity model
Motion character
String coupling
