Kernelization of Counting Problems
We introduce a new framework for the analysis of preprocessing routines for parameterized counting problems. Existing frameworks that encapsulate parameterized counting problems permit the usage of exponential (rather than polynomial) time either explicitly or by implicitly reducing the counting problems to enumeration problems. Thus, our framework is the only one in the spirit of classic kernelization (as well as lossy kernelization). Specifically, we define a compression of a counting problem P into a counting problem Q as a pair of polynomial-time procedures: ππΎπ½ππΌπΎ and π ππΏπ. Given an instance of P, ππΎπ½ππΌπΎ outputs an instance of Q whose size is bounded by a function f of the parameter, and given the number of solutions to the instance of Q, π ππΏπ outputs the number of solutions to the instance of P. When P=Q, compression is termed kernelization, and when f is polynomial, compression is termed polynomial compression. Our technical (and other conceptual) contributions concern both upper bounds and lower bounds.
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