Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section

Subject to: stage:1

2f+1.5b+e <= capacity

Stage:2 booking

Vars: sf1, sf2, sf3, sb1,...

S[s,c] <= demand[s,c] v c € section, s€scenarios

Linking stage 1 & stage 2 vars

Sf[s,c] <= f...

Stage 3: overbooking?

unclear if each no show have joint Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?

Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section

Subject to:

stage:1 designing

2f+1.5b+e <= capacity

Stage:2 booking

Vars: sf1, sf2, sf3, sb1,...

S[s,c] <= demand[s,c] v c € section, s€scenarios

Linking stage 1 & stage 2 vars

Sf[s,c] <= f...

Stage 3: overbooking?

unclear if each no show have joint Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?

Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section St: stage:1

2f+1.5b+e <= capacity

Stage:2 booking

Vars: sf1, sf2, sf3, sb1,...

S[s,c] <= demand[s,c] v c € section, s€scenarios

Linking stage 1 & stage 2 vars

Sf[s,c] <= f...

Stage 3: overbooking?

unclear if each no show have joint Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?

Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section

Subject to: stage:1

2f+1.5b+e <= capacity

Stage:2 booking

Vars: sf1, sf2, sf3, sb1,...

S[s,c] <= demand[s,c] v c € section, s€scenarios

Linking stage 1 & stage 2 vars

Sf[s,c] <= f...

Stage 3: overbooking?

unclear if each no show have joint Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?

Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section St: #stage:1 2f+1.5b+e <= capacity

stage:2 booking

Vars: sf1, sf2, sf3, sb1,... S[s,c] <= demand[s,c] v c € section, s€scenarios #Linking stage 1 & stage 2 vars Sf[s,c] <= f...

#stage 3: overbooking?

unclear if each no show have joint

Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?

Ok, Stage=1: design Capacity=200 Vars: f, b, e #or set of section St: stage:1

2f+1.5b+e <= capacity

Stage:2 booking

Vars: sf1, sf2, sf3, sb1,...

S[s,c] <= demand[s,c] v c € section, s€scenarios

Linking stage 1 & stage 2 vars

Sf[s,c] <= f...

Stage 3: overbooking?

unclear if each no show have joint Probability, like 0.33*0.33 (probs for Each scenario & no show) Also if tickets sold limited by seats then where is overbooking?