The algorithm for this kind of problems is very popular and is known as the **Hungarian algorithm.** The similar problem solved with this kind of problem:

We consider an example where four jobs (J1, J2, J3, and J4) need to be
executed by four workers (W1, W2, W3, and W4), one job per worker. The
matrix below shows the cost of assigning a certain worker to a certain
job. The objective is to minimize the total cost of the assignment.

Source: http://www.hungarianalgorithm.com/examplehungarianalgorithm.php

Please note that the default hungarian algorithm finds the minimum cost but you can alter the program to make it work as maximizing the cost.

If the goal is to find the assignment that yields the maximum cost,
the problem can be altered to fit the setting by replacing each cost
with the maximum cost subtracted by the cost.

Source: http://en.wikipedia.org/wiki/Hungarian_algorithm

I've already implemented the Hungarian algorithm on my **Github**,
so feel free to use it and modify it to make it work as maximizing the cost.