Feasible set functions have small circuits

Arnold Beckmann; Sam Buss; Sy-David Friedman; Moritz Müller

doi:10.3233/COM-180096

Feasible set functions have small circuits

Arnold Beckmann
, Sam Buss
, Sy-David Friedman
, Moritz Müller

Department of Mathematics

Publications: Contribution to journal › Article › Peer Reviewed

Abstract

The Cobham Recursive Set Functions (CRSF) provide an analogue of polynomial time computation which applies to arbitrary sets. We give three new equivalent characterizations of CRSF. The first is algebraic, using subset-bounded recursion and a form of Mostowski collapse. The second is our main result: the CRSF functions are shown to be precisely the functions computed by a class of uniform, infinitary, Boolean circuits. The third is in terms of a simple extension of the rudimentary functions by transitive closure and subset-bounded recursion.

Original language	English
Pages (from-to)	67-98
Number of pages	32
Journal	Computability: The journal of the Association Computability in Europe
Volume	8
Issue number	1
DOIs	https://doi.org/10.3233/COM-180096
Publication status	Published - 2019

Austrian Fields of Science 2012

101013 Mathematical logic

Keywords

Cobham recursive set functions
Computational complexity
circuit complexity
primitive recursive set functions

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10.3233/COM-180096

Cite this

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abstract = "The Cobham Recursive Set Functions (CRSF) provide an analogue of polynomial time computation which applies to arbitrary sets. We give three new equivalent characterizations of CRSF. The first is algebraic, using subset-bounded recursion and a form of Mostowski collapse. The second is our main result: the CRSF functions are shown to be precisely the functions computed by a class of uniform, infinitary, Boolean circuits. The third is in terms of a simple extension of the rudimentary functions by transitive closure and subset-bounded recursion.",

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AU - Friedman, Sy-David

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AB - The Cobham Recursive Set Functions (CRSF) provide an analogue of polynomial time computation which applies to arbitrary sets. We give three new equivalent characterizations of CRSF. The first is algebraic, using subset-bounded recursion and a form of Mostowski collapse. The second is our main result: the CRSF functions are shown to be precisely the functions computed by a class of uniform, infinitary, Boolean circuits. The third is in terms of a simple extension of the rudimentary functions by transitive closure and subset-bounded recursion.

KW - Cobham recursive set functions

KW - Computational complexity

KW - circuit complexity

KW - primitive recursive set functions

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ER -

Feasible set functions have small circuits

Abstract

Austrian Fields of Science 2012

Keywords

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