Physics – High Energy Physics – High Energy Physics - Theory
Scientific paper
1996-09-20
J.Phys.A30:4651-4664,1997
Physics
High Energy Physics
High Energy Physics - Theory
15 pages
Scientific paper
10.1088/0305-4470/30/13/016
Boundary equations for the relativistic string with masses at ends are formulated in terms of geometrical invariants of world trajectories of masses at the string ends. In the three--dimensional Minkowski space $E^1_2$, there are two invariants of that sort, the curvature $K$ and torsion $\kappa$. Curvatures of trajectories of the string ends with masses are always constant, $K_i = \gamma/m_i (i =1,2,)$, whereas torsions $\kappa_i(\tau)$ obey a system of differential equations with deviating arguments. For these equations with periodic $\kappa_i(\tau+n l)=\kappa(\tau)$, constants of motion are obtained (part I) and exact solutions are presented (part II) for periods $l$ and $2l$ where $l$ is the string length in the plane of parameters $\tau$ and $\sigma \ (\sigma_1 = 0, \sigma_2 =l)$.
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