An Enhanced Numerical Discretization Method for Transient Stability Constrained Optimal Power Flow

“…The dynamic constraint expressed by Equation (10) is a common practice in transient-stability constrained optimal power flows [15].…”

“…The aims of this case are to show an application of the model and to evaluate its performance. Figure 2 shows all non-synchronous generators and the location of the fault, which is a direct 3-phase short circuit at bus 16 cleared after 300 ms by the disconnection of line [15][16]. A GAMS model corresponding to this case is provided as a separate file in [33].…”

“…Given the size and complexity of TSCOPF optimization models, the necessary trade-off between model detail and computational time has produced a number of different approaches [13]. Numerical methods that incorporate the discretized differential equations defining the dynamics of the power system into the formulation of the OPF [14,15] have several advantages, such as being able to robustly handle unstable systems with different constraints [13]. However, they produce large models with a number of variables and equality constraints that is impractical for large or medium-size systems.…”

Optimal Curtailment of Non-Synchronous Renewable Generation on the Island of Tenerife Considering Steady State and Transient Stability Constraints

“…The dynamic constraint expressed by Equation (10) is a common practice in transient-stability constrained optimal power flows [15].…”

“…The aims of this case are to show an application of the model and to evaluate its performance. Figure 2 shows all non-synchronous generators and the location of the fault, which is a direct 3-phase short circuit at bus 16 cleared after 300 ms by the disconnection of line [15][16]. A GAMS model corresponding to this case is provided as a separate file in [33].…”

“…Given the size and complexity of TSCOPF optimization models, the necessary trade-off between model detail and computational time has produced a number of different approaches [13]. Numerical methods that incorporate the discretized differential equations defining the dynamics of the power system into the formulation of the OPF [14,15] have several advantages, such as being able to robustly handle unstable systems with different constraints [13]. However, they produce large models with a number of variables and equality constraints that is impractical for large or medium-size systems.…”

Optimal Curtailment of Non-Synchronous Renewable Generation on the Island of Tenerife Considering Steady State and Transient Stability Constraints

“…Equation (7) gives a measure of the dynamic security of the system at each time step. An example of (7) is the separation of generator rotor angles that has been extensively as a dynamic security criterion in the literature [4], [11], [22].…”

Dynamic security constrained optimal power flow using finite difference sensitivities

“…During the past decade, TSC-OPF techniques have received increasing attention, with clearly differentiated approaches for representing and assessing the problem of transient stability [1,4]. In the traditional TSC-OPF methods, transient stability constraints are formulated as rotor angle swing equations [1,[5][6][7][8][9][10][11][12][13]. The differential equations used in the dynamic models of synchronous machines are converted to algebraic form, using implicit numerical integration methods, such as the trapezoidal rule and are included in the optimisation model [5].…”

Advanced application of transient stability constrained‐optimal power flow to a transmission system including an HVDC‐LCC link