# How to prove correctness of PTAS?

P2||Cmax problem is as follow:

Given n tasks, vector p - keeps times of working for each task, 2 identical machines. Assign each task to one of the machines to minimize completion time of the machine which works longer than another one. If both machines finish their work at the same time then a solution is the optimal one (note: it's not true in the opposite way)

How to prove the following algorithm is PTAS for P2||Cmax problem?

1. Sort all the n tasks in the descending order.
2. Assign first k tasks in the optimal way (ignoring the rest) using a brute force algorithm.
3. Assign each of the rest n-k tasks sequentially to that machine which is available earlier.

k < n, k > 0, n > 0

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What is P2||Cmax problem? –  Saeed Amiri Jan 7 '12 at 20:33
It's a task scheduling problem. Given n tasks, vector p - keeps times of working for each task, 2 identical machines. Assign each task to one of the machines to minimize completion time of the machine which works longer than another one. If both machines finish their work at the same time then a solution is the optimal one (note: it's not true in the opposite way). –  kisielot Jan 7 '12 at 21:24
Is processing speed of two machine equal? Also what is `k` here? –  Saeed Amiri Jan 7 '12 at 21:41
Sounds like homework. –  EmeryBerger Jan 7 '12 at 22:08
Yes, processing speed of two machine is equal. k is a parameter of PTAS, it's a positive integer and it's smaller then n. The accuracy of PTAS increases while k increases. –  kisielot Jan 7 '12 at 22:11