Type of overbooking # overtime resources Cost levels(3) | Arrival probabilities \( {\boldsymbol{p}}_{\boldsymbol{i}}^{\mathbf{IP}}=\mathbf{0.80} \) e \( {\boldsymbol{p}}_{\boldsymbol{i}}^{\mathbf{EP}} \) = 0.20 | |||||
---|---|---|---|---|---|---|
Optimal | P1 | P2(1) | P3 | P4 | P5(2) | |
Double overbooking | ||||||
1 resource | ||||||
Baseline level ($) | 656.56 (141.34) | 832.58 (170.72) | 758.82 (161.60) | 866.45 (171.92) | 923.30 (189.28) | 754.50* (141.25) |
Low level ($) | 324.96 (70.70) | 407.52 (85.61) | 378.27 (81.18) | 432.05 (86.26) | 466.04 (92.80) | 371.85* (71.10) |
High level ($) | 969.74 (212.71) | 1258.75 (258.59) | 1126.33 (242.66) | 1319.41 (257.27) | 1387.52 (283.22) | 1118.28* (213.98) |
2 resources | ||||||
Baseline level ($) | 586.69 (140.54) | 783.24 (171.00) | 668.53* (161.44) | 815.19 (174.62) | 868.99 (205.47) | 716.37 (141.86) |
Low level ($) | 292.47 (70.08) | 398.07 (84.96) | 344.99* (80.13) | 418.19 (86.15) | 434.20 (101.38) | 353.85 (72.03) |
High level ($) | 882.31 (208.00) | 1195.90 (254.48) | 1015.75* (239.29) | 1261.63 (258.62) | 1282.50 (307.69) | 1071.53 (214.38) |
Flight overbooking | ||||||
1 resource | ||||||
Baseline level ($) | 738.81 (152.76) | 954.45 (176.59) | 851.64 (169.44) | 996.46 (177.74) | 1058.32 (190.40) | 820.62* (151.04) |
Low level ($) | 372.66 (76.82) | 483.94 (87.03) | 421.22 (84.62) | 493.10 (88.76) | 534.36 (94.74) | 416.52* (75.68) |
High level ($) | 1116.08 (223.58) | 1432.55 (270.45) | 1261.66 (255.89) | 1494.57 (265.11) | 1595.45 (285.36) | 1258.85* (224.34) |
2 resources | ||||||
Baseline level ($) | 663.58 (151.39) | 927.70 (174.66) | 751.88* (168.71) | 953.99 (180.40) | 1006.81 (212.10) | 818.11 (147.15) |
Low level ($) | 339.78 (74.50) | 464.97 (88.97) | 381.60* (85.50) | 482.96 (89.88) | 498.59 (105.10) | 400.68 (74.42) |
High level ($) | 993.97 (220.90) | 1378.43 (262.20) | 1143.96* (254.86) | 1442.79 (269.03) | 1507.36 (314.48) | 1213.41 (226.83) |