TY - GEN
T1 - Fixed-parameter and approximation algorithms
T2 - 8th International Symposium on Parameterized and Exact Computation, IPEC 2013
AU - Chitnis, Rajesh
AU - Hajiaghayi, Mohammadtaghi
AU - Kortsarz, Guy
PY - 2013
Y1 - 2013
N2 - A Fixed-Parameter Tractable (FPT) ρ-approximation algorithm for a minimization (resp. maximization) parameterized problem P is an FPT algorithm that, given an instance (x, k) ∈ P computes a solution of cost at most k·ρ(k) (resp. k/ρ(k)) if a solution of cost at most (resp. at least) k exists; otherwise the output can be arbitrary. For well-known intractable problems such as the W[1]-hard Clique and W[2]-hard Set Cover problems, the natural question is whether we can get any FPT-approximation. It is widely believed that both Clique and Set-Cover admit no FPT ρ-approximation algorithm, for any increasing function ρ. However, to the best of our knowledge, there has been no progress towards proving this conjecture. Assuming standard conjectures such as the Exponential Time Hypothesis (ETH)[11] and the Projection Games Conjecture (PGC)[18], we make the first progress towards proving this conjecture by showing that Under the ETH and PGC, there exist constants F1, F2 > 0 such that the Set Cover problem does not admit a FPT approximation algorithm with ratio in time, where N is the size of the universe and M is the number of sets. Unless NP ⊆ SUBEXP, for every 1 > δ > 0 there exists a constant F(δ) > 0 such that Clique has no FPT cost approximation with ratio k1-δ in 2kF·poly(n) time, where n is the number of vertices in the graph. In the second part of the paper we consider various W[1]-hard problems such as Directed Steiner Tree, Directed Steiner Forest, Directed Steiner Network and Minimum Size Edge Cover. For all these problem we give polynomial time f(OPT)-approximation algorithms for some small function f (the largest approximation ratio we give is OPT2). Our results indicate a potential separation between the classes W[1] and W[2]; since no W[2]-hard problem is known to have a polynomial time f(OPT)-approximation for any function f. Finally, we answer a question by Marx [14] by showing the well-studied Strongly Connected Steiner Subgraph problem (which is W[1]-hard and does not have any polynomial time constant factor approximation) has a constant factor FPT-approximation.
AB - A Fixed-Parameter Tractable (FPT) ρ-approximation algorithm for a minimization (resp. maximization) parameterized problem P is an FPT algorithm that, given an instance (x, k) ∈ P computes a solution of cost at most k·ρ(k) (resp. k/ρ(k)) if a solution of cost at most (resp. at least) k exists; otherwise the output can be arbitrary. For well-known intractable problems such as the W[1]-hard Clique and W[2]-hard Set Cover problems, the natural question is whether we can get any FPT-approximation. It is widely believed that both Clique and Set-Cover admit no FPT ρ-approximation algorithm, for any increasing function ρ. However, to the best of our knowledge, there has been no progress towards proving this conjecture. Assuming standard conjectures such as the Exponential Time Hypothesis (ETH)[11] and the Projection Games Conjecture (PGC)[18], we make the first progress towards proving this conjecture by showing that Under the ETH and PGC, there exist constants F1, F2 > 0 such that the Set Cover problem does not admit a FPT approximation algorithm with ratio in time, where N is the size of the universe and M is the number of sets. Unless NP ⊆ SUBEXP, for every 1 > δ > 0 there exists a constant F(δ) > 0 such that Clique has no FPT cost approximation with ratio k1-δ in 2kF·poly(n) time, where n is the number of vertices in the graph. In the second part of the paper we consider various W[1]-hard problems such as Directed Steiner Tree, Directed Steiner Forest, Directed Steiner Network and Minimum Size Edge Cover. For all these problem we give polynomial time f(OPT)-approximation algorithms for some small function f (the largest approximation ratio we give is OPT2). Our results indicate a potential separation between the classes W[1] and W[2]; since no W[2]-hard problem is known to have a polynomial time f(OPT)-approximation for any function f. Finally, we answer a question by Marx [14] by showing the well-studied Strongly Connected Steiner Subgraph problem (which is W[1]-hard and does not have any polynomial time constant factor approximation) has a constant factor FPT-approximation.
UR - http://www.scopus.com/inward/record.url?scp=84893050848&partnerID=8YFLogxK
U2 - 10.1007/978-3-319-03898-8_11
DO - 10.1007/978-3-319-03898-8_11
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AN - SCOPUS:84893050848
SN - 9783319038971
T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)
SP - 110
EP - 122
BT - Parameterized and Exact Computation - 8th International Symposium, IPEC 2013, Revised Selected Papers
Y2 - 4 September 2013 through 6 September 2013
ER -