The objective function is given by:
(1) | E = \sum_{p=1}^{N_{\rm prod}} \left[ R_O \cdot q^{\uparrow}_{O, p} + R_G \cdot q^{\uparrow}_{G, p} \right] - \sum_{p=1}^{N_{\rm prod}} C_L \cdot q^{\uparrow}_{L, p} - \sum_{p=1}^{N_{\rm prod}} C_O \cdot q^{\uparrow}_{O, p} - \sum_{p=1}^{N_{\rm prod}} C_G \cdot q^{\uparrow}_{G, p} - \sum_{p=1}^{N_{\rm prod}} C_W \cdot q^{\uparrow}_{W, p} - \sum_{i=1}^{N_{W, \rm inj}} C_{W, \rm inj} \cdot q^{\downarrow}_{W, i} - \sum_{j=1}^{N_{G, \rm inj}} C_{G, \rm inj} \cdot q^{\downarrow}_{G, i} |
See Also
Petroleum Industry / Upstream / Production / Field Development Plan
Subsurface Production / Well & Reservoir Management / [ Production Targets ]
Subsurface E&P Disciplines / Production Technology