Abstract
The dual of the strictly convex quadratic programming problem with unit bounds is posed as a linear $\ell_1$ minimization problem with quadratic terms. A smooth approximation to the linear $\ell_1$ function is used to obtain a parametric family of piecewise-quadratic approximation problems. The unique path generated by the minimizers of these problems yields the solution to the original problem for finite values of the approximation parameter. Thus, a finite continuation algorithm is designed. Results of extensive computational experiments are reported.
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