An O(n 3 L) primal interior point algorithm for convex quadratic programming

We present a primal interior point method for convex quadratic programming which is based upon a logarithmic barrier function approach. This approach generates a sequence of problems, each of which is approximately solved by taking a single Newton step. It is shown that the method requires iterations and O(n^3.5L) arithmetic operations. By using modified Newton steps the number of arithmetic operations required by the algorithm can be reduced to O(n³L).This research was supported in part by NSF Grant DMS-85-12277 and ONR Contract N-00014-87-K0214. It was presented at the Meeting on Mathematische Optimierung, Mathematisches Forschungsinstitut, Oberwolfach, West Germany, January 3–9, 1988.