Let's say I have N taxis, and N customers waiting to be picked up by the taxis. The initial positions of both customers and taxis are random/arbitrary.

Now I want to assign each taxi to exactly one customer.

The customers are all stationary, and the taxis all move at identical speed. For simplicity, let's assume there are no obstacles, and the taxis can move in straight lines to assigned customers.

I now want to minimize the time until the last customer enters his/her taxi.

Is there a standard algorithm to solve this? I have tens of thousands of taxis/customers. Solution doesn't have to be optimal, just ‘good’.

The problem can almost be modelled as the standard “Assignment Problem”, solvable using the Hungarian algorithm (the Kuhn–Munkres algorithm or Munkres assignment algorithm). However, I want to minimize the cost of the costliest assignment, not minimize the sum of costs of the assignments.