I have a table (called *base*) like this:

Itinerary | Leg1 | Leg2 | Bus | Demand | Price |
---|---|---|---|---|---|

A-B | A-B | - | Bus1 | 10 | 20 |

A-B | A-B | - | Bus2 | 10 | 30 |

A-B-C | A-B | B-C | Bus1 | 20 | 60 |

A-B-C | A-B | B-C | Bus2 | 30 | 100 |

A-B-D | A-B | B-D | Bus1 | 20 | 50 |

A-B-D | A-B | B-D | Bus2 | 30 | 40 |

I have to run an optimization where I have to maximize revenue (passenger * Price) with two constraints. First, passenger number on each 'Itinerary' has to be less than 'Demand' - this one I know how to implement. The second one is: the sum of passengers on each leg has to be less than the leg capacity. Leg capacity is presented in an auxiliary table like this:

Leg | LegCapacity |
---|---|

A-B | 40 |

B-C | 50 |

B-D | 60 |

So my expected outcome would be:

Itinerary | Leg1 | Leg2 | Bus | Demand | Price | Passengers |
---|---|---|---|---|---|---|

A-B | A-B | - | Bus1 | 10 | 20 | |

A-B | A-B | - | Bus2 | 10 | 30 | |

A-B-C | A-B | B-C | Bus1 | 20 | 60 | 10 |

A-B-C | A-B | B-C | Bus2 | 30 | 100 | 30 |

A-B-D | A-B | B-D | Bus1 | 20 | 50 | |

A-B-D | A-B | B-D | Bus2 | 30 | 40 |

Passengers number are less than demand and within the leg capacity (in this specific example all itineraries include leg A-B which is not true in my real data - have hundreds of combinations of legs. Also the same leg can be on column Leg1 or Leg2 and the constraint applies disregard which column it is in).

How can I implement it?

My code as of right now is (only with the demand constraint):

```
prob = lp.LpProblem("testproblem", lp.LpMaximize)
xs = [lp.LpVariable('{}'.format(i+1), lowBound = 0, upBound = base.loc[i,'Capacity']) for i in range(len(base))]
prob += lp.lpSum(x * bv for x,bv in zip(xs, base["Price"]))
prob.solve()
```