Hanging chain problem

The Hanging chain problem is concerned with finding a chain (of uniform density) of length suspendend between two points with minimal potential energy. (Problem taken from the COPS library)

Mathematical formulation

The problem is given by

Failed to parse (syntax error): \begin{array}{llcl} \displaystyle \min_{x, u} &x_2(t_f) \\[1.5ex] \mbox{s.t.} & \dot{x}_1 & = & u, \\ & \dot{x}_2 & = & x_1 (1+u^2)^{1/2}, \\ & \dot{x}_3 & = & (1+u^2)^{1/2), \\ & x(t_0) &=& (a,0,0)^T, \\ & x_1(t_f) &=& b, \\ & x_3(t_f) &=& Lp, \\ & x(t) &\in& [0,10], \\ & u(t) &\in& [-10,20]. \end{array}

Parameters

In this model the parameters used are \begin{array}{rcl} [t_0, t_f] &=& [0, 1],\\ (a,b) &=& (0.4, 0.2),\\ Lp &=& 4. \end{array}

Source Code

Model descriptions are available in

• AMPL/TACO code at Hanging chain problem (TACO)