Lines Matching refs:cost

1125 and the cost function(s)
1128 \Psi_i(y_0,p) = \Phi_i(y_F,p) + \int_{t_0}^{t_F} r_i(y(t),p,t)dt \quad i=1,...,n_\text{cost}.
1153 One must create two arrays of $n_\text{cost}$ vectors
1168 where `numcost` denotes $n_\text{cost}$.
1187 If there is an integral term in the cost function, i.e. $r$ is
1212 Since the integral term is additive to the cost function, its gradient
1269 cost function
1292 After `TSAdjointSolve()`, the sensitivity of the cost function w.r.t.
1294 (at time $t_0$) directly. And the sensitivity of the cost function
1319   Theta methods for cost function with an integral term
1324   methods for cost function with an integral term