Projective cone

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In computer science, in particular in the study of approximation algorithms, an L-reduction ("linear reduction") is a transformation of optimization problems which linearly preserves approximability features. L-reductions in studies of approximability of optimization problems play a similar role to that of polynomial reductions in the studies of computational complexity of decision problems.

The term L reduction is sometimes used to refer to log-space reductions, by analogy with the complexity class L, but this is a different concept.

Definition

Let A and B be optimization problems and cA and cB their respective cost functions. A pair of functions f and g is an L-reduction if all of the following conditions are met:

  • functions f and g are computable in polynomial time,
  • if x is an instance of problem A, then f(x) is an instance of problem B,
  • if y is a solution to f(x), then g(y) is a solution to x,
  • there exists a positive constant α such that
OPTB(f(x))αOPTA(x),
  • there exists a positive constant β such that for every solution y to f(x)
|OPTA(x)cA(g(y))|β|OPTB(f(x))cB(y)|.

Properties

Let a (1±ε)-approximation algorithm f for a problem A be such that cA(f(x)) is at most εOPTA(x) away from OPTA(x), for every instance x. (In this notation, + implicitly means a minimization problem, and means a maximization problem.)

The main point of an L-reduction is the following: given a (f,g,α,β) L-reduction from problem A to problem B, and a (1±ε)-approximation algorithm for B, we obtain a polynomial-time (1±δ)-approximation algorithm for A where δ=αβε.[1][2] This implies that if B has a polynomial-time approximation scheme then so does A.

See also

References

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  • Pierluigi Crescenzi: A Short Guide to Approximation Preserving Reductions. In: Proceedings of the Twelfth Annual IEEE Conference on Computational Complexity, June 24-27, 1997, Ulm, Germany. Pages 262-273. IEEE Computer Society Press, 1997. ISBN 0-8186-7907-7
  • G. Ausiello, P. Crescenzi, G. Gambosi, V. Kann, A. Marchetti-Spaccamela, M. Protasi. Complexity and Approximation. Combinatorial optimization problems and their approximability properties. 1999, Springer. ISBN 3-540-65431-3

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