Abstract
Inspired by Andrei's approach of combining the conjugate gradient parameters convexly, a hybridization of the Hestenes–Stiefel and Dai-Yuan conjugate gradient methods is proposed. The hybridization parameter is determined by using the ellipsoid norm as an extension of the Euclidean norm, in a least-squares framework. Efficiency of the suggested hybrid conjugate gradient method in the sense of the Dolan–Moré performance profile is depicted as well.