Chapter 3 Restriction

1. Chapter 3 Restriction (2) Greedy k-restricted Steiner tree Ding-Zhu Du

2. A general result on greedy algorithm With non-integer potential function Consider a monotone increasing, submodular function Consider the following problem: where is a nonnegative cost function

3. Greedy Algorithm G

4. Theorem Suppose in Greedy Algorithm G, selected x always satisfies Then its p.r. where

5. Proof. Let be obtained by Greedy Algorithm G. Denote be an optimal solution. Let Denote

7. Note that There exists i such that

8. Let Let Note that So

9. Note Hence,

10. Consider where is the length of MST on P after terminals in each connected component of H are contracted into a point. Consider the set of all full component of size at most k. Theorem. is a monotone increasing submodular function on

13. consider each For k >2, as a set of edges in a spanning tree on terminals. For

14. iff iff i.e.,

15. For k=2, is the length of a longest edge in the path connecting two endpoints of , in MST(A). x

17. x x x x y

18. x x x y

19. Greedy Algorithm G is Theorem -approximation for . Greedy Algorithm G produces approximation solution for SMT with length at most

20. Loss(T)

21. Loss(T)

22. Operation

23. Function

24. Lemma

25. Function

26. Lemma Proof.

27. Greedy Algorithm

28. Lemma Proof

29. Greedy Algorithm

30. Robin-Zelikvosky

31. What is ?

32. Lemma