sbv-14.1: SBVTestSuite/GoldFiles/pareto2.gold
Pareto front #1: Optimal model:
x = 0 :: Integer
y = 1 :: Integer
min_x = 0 :: Integer
max_y = 1 :: Integer
max_x_plus_y = 1 :: Integer
Pareto front #2: Optimal model:
x = 0 :: Integer
y = 2 :: Integer
min_x = 0 :: Integer
max_y = 2 :: Integer
max_x_plus_y = 2 :: Integer
Pareto front #3: Optimal model:
x = 0 :: Integer
y = 3 :: Integer
min_x = 0 :: Integer
max_y = 3 :: Integer
max_x_plus_y = 3 :: Integer
Pareto front #4: Optimal model:
x = 0 :: Integer
y = 5 :: Integer
min_x = 0 :: Integer
max_y = 5 :: Integer
max_x_plus_y = 5 :: Integer
Pareto front #5: Optimal model:
x = 0 :: Integer
y = 6 :: Integer
min_x = 0 :: Integer
max_y = 6 :: Integer
max_x_plus_y = 6 :: Integer
Pareto front #6: Optimal model:
x = 0 :: Integer
y = 7 :: Integer
min_x = 0 :: Integer
max_y = 7 :: Integer
max_x_plus_y = 7 :: Integer
Pareto front #7: Optimal model:
x = 0 :: Integer
y = 9 :: Integer
min_x = 0 :: Integer
max_y = 9 :: Integer
max_x_plus_y = 9 :: Integer
Pareto front #8: Optimal model:
x = 0 :: Integer
y = 8 :: Integer
min_x = 0 :: Integer
max_y = 8 :: Integer
max_x_plus_y = 8 :: Integer
Pareto front #9: Optimal model:
x = 0 :: Integer
y = 11 :: Integer
min_x = 0 :: Integer
max_y = 11 :: Integer
max_x_plus_y = 11 :: Integer
Pareto front #10: Optimal model:
x = 0 :: Integer
y = 13 :: Integer
min_x = 0 :: Integer
max_y = 13 :: Integer
max_x_plus_y = 13 :: Integer
Pareto front #11: Optimal model:
x = 0 :: Integer
y = 14 :: Integer
min_x = 0 :: Integer
max_y = 14 :: Integer
max_x_plus_y = 14 :: Integer
Pareto front #12: Optimal model:
x = 0 :: Integer
y = 15 :: Integer
min_x = 0 :: Integer
max_y = 15 :: Integer
max_x_plus_y = 15 :: Integer
Pareto front #13: Optimal model:
x = 0 :: Integer
y = 17 :: Integer
min_x = 0 :: Integer
max_y = 17 :: Integer
max_x_plus_y = 17 :: Integer
Pareto front #14: Optimal model:
x = 0 :: Integer
y = 19 :: Integer
min_x = 0 :: Integer
max_y = 19 :: Integer
max_x_plus_y = 19 :: Integer
Pareto front #15: Optimal model:
x = 0 :: Integer
y = 21 :: Integer
min_x = 0 :: Integer
max_y = 21 :: Integer
max_x_plus_y = 21 :: Integer
Pareto front #16: Optimal model:
x = 0 :: Integer
y = 22 :: Integer
min_x = 0 :: Integer
max_y = 22 :: Integer
max_x_plus_y = 22 :: Integer
Pareto front #17: Optimal model:
x = 0 :: Integer
y = 23 :: Integer
min_x = 0 :: Integer
max_y = 23 :: Integer
max_x_plus_y = 23 :: Integer
Pareto front #18: Optimal model:
x = 0 :: Integer
y = 25 :: Integer
min_x = 0 :: Integer
max_y = 25 :: Integer
max_x_plus_y = 25 :: Integer
Pareto front #19: Optimal model:
x = 0 :: Integer
y = 26 :: Integer
min_x = 0 :: Integer
max_y = 26 :: Integer
max_x_plus_y = 26 :: Integer
Pareto front #20: Optimal model:
x = 0 :: Integer
y = 28 :: Integer
min_x = 0 :: Integer
max_y = 28 :: Integer
max_x_plus_y = 28 :: Integer
Pareto front #21: Optimal model:
x = 0 :: Integer
y = 30 :: Integer
min_x = 0 :: Integer
max_y = 30 :: Integer
max_x_plus_y = 30 :: Integer
Pareto front #22: Optimal model:
x = 0 :: Integer
y = 32 :: Integer
min_x = 0 :: Integer
max_y = 32 :: Integer
max_x_plus_y = 32 :: Integer
Pareto front #23: Optimal model:
x = 0 :: Integer
y = 34 :: Integer
min_x = 0 :: Integer
max_y = 34 :: Integer
max_x_plus_y = 34 :: Integer
Pareto front #24: Optimal model:
x = 0 :: Integer
y = 36 :: Integer
min_x = 0 :: Integer
max_y = 36 :: Integer
max_x_plus_y = 36 :: Integer
Pareto front #25: Optimal model:
x = 0 :: Integer
y = 37 :: Integer
min_x = 0 :: Integer
max_y = 37 :: Integer
max_x_plus_y = 37 :: Integer
Pareto front #26: Optimal model:
x = 0 :: Integer
y = 39 :: Integer
min_x = 0 :: Integer
max_y = 39 :: Integer
max_x_plus_y = 39 :: Integer
Pareto front #27: Optimal model:
x = 0 :: Integer
y = 40 :: Integer
min_x = 0 :: Integer
max_y = 40 :: Integer
max_x_plus_y = 40 :: Integer
Pareto front #28: Optimal model:
x = 0 :: Integer
y = 41 :: Integer
min_x = 0 :: Integer
max_y = 41 :: Integer
max_x_plus_y = 41 :: Integer
Pareto front #29: Optimal model:
x = 0 :: Integer
y = 43 :: Integer
min_x = 0 :: Integer
max_y = 43 :: Integer
max_x_plus_y = 43 :: Integer
Pareto front #30: Optimal model:
x = 0 :: Integer
y = 44 :: Integer
min_x = 0 :: Integer
max_y = 44 :: Integer
max_x_plus_y = 44 :: Integer
*** Note: Pareto-front extraction was terminated as requested by the user.
*** There might be many other results!