A convex quadratic programming model for unit commitment global optimization

Abstract: This paper presents a convex quadratic programming (CQP) model of the thermal unit commitment (UC) problem based on the recent advancement in mathematics. The proposed model employs convex transformation techniques and is able to achieve the global optimal solution. In the CQP model, the startup cost is represented by using two kinds of binary variables (0-1); the nonconvex constraints, namely the minimum up and down times, are expressed as equivalent linear constraints via a set of linear inequalities; then t… Show more

“… and it is the positive definite matrix; thus, the QP is a convex algorithm [28]. The objective function is considered as a convex function and satisfies the Karush–Kuhn–Tucker (KKT) condition [29].…”

DLMPCS‐based improved yaw stability control strategy for DDEV

“… and it is the positive definite matrix; thus, the QP is a convex algorithm [28]. The objective function is considered as a convex function and satisfies the Karush–Kuhn–Tucker (KKT) condition [29].…”

DLMPCS‐based improved yaw stability control strategy for DDEV

“…Although priority list constitutes the simplest and fastest method to UC, it possesses a weakness in concluding to a final solution which in many cases may stand out from the optimal [1]. Classified as linear [2], quadratic [3] or non-linear [4] programming, mixed-integer approaches are able to enhance the generation modelling accuracy though they require increased computational efforts to converge to the desired solution.…”

Enhanced Lagrange relaxation for the optimal unit commitment of identical generating units

Sensitivity analysis of the unit commitment problem to guide data acquisition investments in a small island developing state: A case study