approximation algorithm: iterative rounding lecture 15: march 9
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Approximation Algorithm:
Iterative Rounding
Lecture 15: March 9
Lower bound and Approximation Algorithm
The key of designing a polytime approximation algorithm is to obtain a good (lower or upper) bound on the optimal solution.
For NP-complete problem, we can’t compute an optimal solution in polytime.
The general strategy (for a minimization problem) is:
lowerbound OPT SOL
SOL ≤ c · lowerbound SOL ≤ c · OPT
lowerbound OPT SOL
To design good approximation algorithm, we need a good lowerbound.
For example, if 100 · lowerbound ≤ OPT for some instance, then if we compare SOL to lowerbound to analyze the performance,we could not achieve anything better than an 100-approximation algorithm.
Lower bound and Approximation Algorithm
lowerbound OPT SOL
Goal: to find a lowerbound as close to OPT as possible.
Lower bound and Approximation Algorithm
In metric TSP and the minimum Steiner tree problem, we use minimum spanning tree as a lowerbound.
In general, it is often difficult to come up with a good lowerbound.
Linear Programming and Approximation Algorithm
lowerbound OPT SOL
Linear programming: a general method to compute a lowerbound in polytime.
LP
To computer an approximate solution,
we need to return an (integral) solution
close to an optimal LP (fractional) solution.
An Example: Vertex Cover
Vertex cover: find an minimum subset of vertices
which cover all the edges.
A linear programming relaxation of the vertex cover problem.
Clearly, LP is a lowerbound on the optimal vertex cover, because every vertex cover corresponds to a feasible solution of this LP.
An Example: Vertex Cover
How bad is this LP?
1
1
1 1
00.5
0.5
0.5 0.5
0.5
LP = 2.5
OPT = 4
LP = n/2
OPT = n-1
An Example: Vertex Cover
Integrality gap: =
Optimal integer solution.
Optimal fractional solution.
Over all instances.
In vertex cover, there are instances where this gap is almost 2.
Half-integrality
Theorem: For the vertex cover problem, every vertex (or basic) solution of the LP is half-integral, i.e. x(v) = {0, ½, 1}
There is a 2-approximation algorithm for the vertex cover problem.
The integrality gap of the vertex cover LP is at most 2.
Survivable Network Design
Input•An undirected graph G = (V,E),•A cost c(e) on each edge,•A connectivity requirement r(u,v) for each pair u,v.
Output•A minimum cost subgraph H of G which has r(u,v) edge-disjoint paths between each pair u,v. (That is, H satisfies all the connectivity requirements.)
Survivable Network Design
• Minimum spanning tree: r(u,v) = 1 for all pairs.
• Minimum Steiner tree: r(u,v) = 1 for all pair of required vertices.
• Hamiltonian path: r(u,v) = 2 for all pairs and every edge has cost 1.
• k-edge-connected subgraph: r(u,v) = k for all pairs.
• Minimum cost k-flow: r(s,t) = k for the source s and the sink t.
Survivable Network Design is NP-complete.
Linear Programming Relaxation
S
u vFor each set S separating u and v, there should be at least r(u,v) edges “crossing” S. Let f(S) = max{ r(u,v) | S separates u and v}.
At least r(u,v) edges crossing S
for each subset S of V
Special Case: Minimum Spanning Tree
for each subset S of V
How bad is this LP?
0.5
0.5
0.5 0.5
0.5 1
1
1
1
LP = 2.5
OPT = 4
LP = n/2
OPT = n-1
Cannot even solve minimum spanning tree!
Half-integrality
Does the LP has half-integral optimal solution?
Peterson Graph
Consider the minimum spanning tree problem, i.e. f(S)=1 for all S.
All 1/3 is a feasible solution and has cost 5.
Any half-integral solution having cost 5 must be a Hamitonian cycle.
But Peterson graph does not have an Hamitonian cycle!
So, no half-integral optimal solution!
Separation Oracle
for each subset S of V
There are exponentially many constraints, but this LP can
still be solved in polynomial time by the ellipsoid method.
The reason is that we can design a polynomial time
separation oracle to determine if x is a feasible solution of
the LP.
Separation Oracle
for each subset S of V
Remember: f(S) = max{ r(u,v) | S separates u and v}.
S
u v
At least r(u,v) edges crossing S Max-Flow Min-Cut
Every (u,v)-cut has at least r(u,v) edges if and only if
there are r(u,v) flows from u to v.
Separation oracle: check if each pair u,v has a flow of r(u,v)!
Linear Programming Relaxation
for each subset S of V
What is the integrality gap of this LP?
Moment of Inspiration
All 1/3 is a feasible solution.
But this is not a vertex solution!
Thick edges have value 1/2;
Thin edges have value 1/4.
This is a vertex solution.
Structural Result of the LP
Kamal Jain
Theorem. Every vertex solution has an edge with value at least 1/2
Corollary. There is a 2-approximation algorithm for survivable network design.
Iterative Rounding
Initialization: H = , f’ = f.
While f’ ≠ 0 do:
o Find a vertex solution, x, of the LP with function f’.
o Add every edge with x(e) ≥ 1/2 into H.
o Update f’: for every set S, set
Output H.
A new vertex solution is computed in each
iteration
Guaranteed to exist
Update the connectivity
requirements.
Analysis
Corollary. There is a 2-approximation algorithm for survivable network design.
Intuitive reason: we only pick an edge when the LP picks at least half.
Proof: Let say we pick an edge e.
Key: LP-c(e)x(e) is a feasible solution for the next iteration.
cost(H) = c(e) + cost(H’) ≤ 2·c(e)x(e) + cost(H’)
≤ 2·c(e)x(e) + 2(LP-c(e)x(e)) ≤ 2LP
≤ 2OPT.
Some Remarks
1. The iterative rounding algorithm performs very well in practice.
2. No combinatorial algorithm has an performance ratio better than O(log n).
Spanning Tree with Degree Constraints
Input
•An undirected graph G = (V,E),
•A degree upper bound k.
Output
•A spanning tree with degree at most k.
NP-complete (Hamiltonian path when k=2).
Spanning Tree with Degree Constraints
Motivation: to find a spanning tree in which there is no “overloaded” vertices.
[Furer and Raghavachari ’92]
Given k, there is a polynomial time algorithm which does the following:
Either the algorithm
(i) Show that there is no spanning tree with maximum degree at most k.
(ii) Find a spanning tree with maximum degree at most k+1.
In other words, there is an +1 algorithm for this problem!
Minimum Spanning Tree with Degree Constraints
Input•An undirected graph G = (V,E),•A cost c(e) on each edge e,•A degree upper bound k.
Output
•A minimum spanning tree with degree at most k.
Question: Is there a +1 algorithm for this problem as well?
That is, a polytime algorithm which returns a
minimum spanning tree with maximum degree at most k+1.
Conjecture
Let OPT be the minimum cost of a spanning tree with maximum degree k.
[Goemans]
Conjecture: Given k, there is a polynomial time algorithm which returns a
spanning tree with cost at most OPT and maximum degree at most k+1.
Note that we do not restrict ourselves to MST.
Previous Work
Reference Cost Guarantee Degree
Furer and Raghavachari ‘92 Unweighted Case k+1
∞ k
Konemann, Ravi ’01 ’02 O(1) O(k+log n)
CRRT ’05 ’06 O(1) O(k)
Ravi, S. 06 MST k+p (p=#distinct costs)
Goemans ’06 1 k+2
Our Result
Theorem: Given k, there is a polynomial time algorithm which returns a
spanning tree with cost at most OPT and maximum degree at most k+1.
[Singh Lau 07]
Mohit Singh
Technique:
Adaptation of iterative rounding,
but we do not round.
Spanning Tree Polytope
• Formulate a linear programming relaxation.
min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe ≤ |S|-1
xe ≥ 0
E(S): set of edges with both endpoints in S.• Separation oracle [Cunningham ’84] ) Optimization in poly time
for each subset S of V
Any tree has n-1 edges
Cycle elimination constraints
min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe ≤ |S|-1
xe ≥ 0
Spanning Tree Polytope
Recall: A vertex solution is the unique solution of m
linearly independent tight inequalities, where
m denotes the number of variables.
min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe ≤ |S|-1
xe ≥ 0
Spanning Tree Polytope
If there is an edge of 0, delete it.
If there exists a leaf vertex v,
then include the edge
incident at v in and remove v
from G.
min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe ≤ |S|-
1
xe ≥ 0
Spanning Tree Polytope
Claim: A vertex solution of the LP must have a leaf vertex.
Theorem: There are at most n-1
linearly independent tight
inequalities of this type, where
n denotes the number of vertices.
If there is no leaf vertex,
then every vertex has degree 2,
and hence there are at least 2n/2=n edges,
a contradiction to the above theorem.
• No 1-edge ) many fractional edges
• Vertex Solution with few constraints ) few fractional edges
• Derive contradiction
Spanning Tree Polytope
So a vertex solution must have an edge of 0 or a leaf vertex,
in either case we can finish by induction.
This proves that the linear program has integer optimal solution.
• Extend spanning tree polyhedron
OPT = min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe · |S|-1
e2 (v) xe · Bv 8 v 2 W
xe ≥ 0
A Simple +2 Algorithm
for each subset S of V
The degree constraint of each vertex could be different
Goal: Find a spanning tree with cost at most OPT
and degree is violated by at most 2.
Initialize F=
While F is not a spanning tree
1. Solve LP to obtain vertex solution x*.
2. Remove all edges e s.t. x*e=0.
3. If there is a leaf vertex v with edge {u,v}, then include {u,v} in F. Decrease Bu by 1. Delete v from G.
• If algorithm works then we solve the problem optimally!
• Cannot pick an edge with 1 > xe¸ ½ : lose optimality of the cost.
First Try
Initialize F=
While F is not a spanning tree
1. Solve LP to obtain extreme point x*.
2. Remove all edges e s.t. x*e=0.
3. If there is a leaf vertex v with edge {u,v}, then include {u,v} in F. Decrease Bu by 1. Delete v from G.
4. If there is a vertex v2 W such that degE(v) ≤ Bv+2, then remove the degree constraint of v.
A Simple +2 Algorithm
Removing Degree Constraints
If there is a vertex v2 W such that degE(v) ≤
Bv+2, then remove the degree constraint
of v.
This is only done one, and the degree constraint is violated by at most +2!
Bv=1
1/3
1/3
1/3
Bv=1
1
1
1
Lemma: For any vertex solution x, one of the following is true:
1) Either there is a leaf vertex v.
2) Or there is a vertex with degree constraint such that degE(v)·Bv+2
Initialize F=
While F is not a spanning tree
1. Solve LP to obtain extreme point x*.
2. Remove all edges e s.t. x*e=0.
3. If there is a leaf vertex v with edge {u,v}, then include {u,v} in F. Decrease Bu by 1. Delete v from G.
4. If there is a vertex v2 W such that degE(v) ≤ Bv+2, then remove the degree constraint of v.
A Simple +2 Algorithm
OPT = min e2 E ce xe
s.t. e2 E(V) xe= |V|-1
e2 E(S) xe · |S|-1
e2 (v) xe · Bv 8 v 2 W
xe ≥ 0
Theorem: There are at most n-1
linearly independent tight
inequalities of this type, where
n denotes the number of vertices.
Analysis
Proof of the Lemma: Suppose not.
Every vertex has degree at least 2.
Every vertex in W has degree at least 4.
|E| ≥ ½*(2(n-|W|)+4|W|)= n+|W|
The set of tight constraints :
|E| ≤ n-1+|W|
A contradiction.
A Simple +2 Algorithm
A quick summary:
Find a leaf vertex v, add the only edge at v and remove v.
- Don’t lose the cost optimality and the degree
bound.
Find a vertex with at most Bv+2 neighbours and has a
degree
constraint, remove the degree constraint.
- Violate the degree bound by at most +2.
By the Lemma, one of the two possibilities must hold.
Obtaining +1 algorithmObtaining +1 algorithm
Initialize F=Initialize F=
While F is not a spanning treeWhile F is not a spanning tree
1.1. Solve LP to obtain extreme point x*.Solve LP to obtain extreme point x*.
2.2. Remove all edges e s.t. x*Remove all edges e s.t. x*ee=0.=0.
3.3. If there exists a leaf vertex v with edge {u,v}, then If there exists a leaf vertex v with edge {u,v}, then include {u,v} in F. Decrease Binclude {u,v} in F. Decrease Buu by 1. Delete v from G. by 1. Delete v from G.
4.4. If there exists a vertex vIf there exists a vertex v22 W such that deg W such that degEE(v)(v)·· B Bvv+2, +2,
then remove the degree constraint of v.then remove the degree constraint of v.
Replace by Bv+1
v leaf ) x{u,v}=1Why not pick any e s.t. xe=1 ?
Concluding Remarks
1. No combinatorial algorithm has a good performance ratio.
2. Similar techniques can be used for more general problems, e.g. minimum maximum degree k-ec subgraph
3. Can deal with lower and upper bounds.
4. A unifying framework for network design problems.
5. Proofs are based on uncrossing techniques in combinatorial optimiation.