Super-exponential Complexity of Presburger Arithmetic

Fischer, Michael J.; Rabin, Michael O.

Author(s)

Fischer, Michael J.; Rabin, Michael O.

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Abstract

Lower bounds are established on the computational complexity of the decision problem and on the inherent lengths of proofs for two classical decidable theories of logic: the first order theory of the real numbers under addition, and Presburger arithmetic -- the first order theory of addition on the natural numbers. There is a fixed constant c > 0 such that for every (non-deterministic) decision procedure for determining the truth of sentences of real addition and for all sufficiently large n, there is a sentence of length n for which the decision procedure runs for more than 2 cn steps.

Date issued

1974-02

URI

https://hdl.handle.net/1721.1/148872

Series/Report no.

MIT-LCS-TM-043MAC-TM-043

Collections

LCS Technical Memos (1974 - 2003)
MAC Memos (1963 - 1974)