VTC/sup O/: a second-order theory for TC/sup 0/

Nguyen, Phuong Minh; Cook, Stephen A.

doi:10.1109/lics.2004.1319632

Cited by 2 publications

(3 citation statements)

References 26 publications

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“…It was pointed out to us that ''substitution'' is not the standard designation for this scheme. This is the reason why we are using the more traditional epithet ''replacement'' ( [1], [10] and [15]).…”

Section: Theory For Counting Arithmetic (Tca)mentioning

confidence: 99%

“…Apropos bounded arithmetic theories related with counting, we should also mention the systems C 0 3 , C 0 2 and D b 1 -CR ( [10], [11]) by Johannsen and Pollett and the system VTC 0 ( [14], [15], [16]) by Phuong Nguyen and Stephen Cook. All these systems were developed in order to capture the computational power of particular classes of thresholds circuits.…”

Section: Introductionmentioning

confidence: 99%

“…D b 1 -CR is a ''minimal'' first-order theory to TC 0 . Another way to characterize TC 0 via formal systems is considering the finitely axiomatizable second-order theory VTC 0 (see [14], [15], [16]). It is known that VTC 0 is RSUV-isomorphic to D b 1 -CR and the former system appears to be weaker than D 0 1 ([16]).…”

Section: Introductionmentioning

confidence: 99%

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The counting hierarchy in binary notation

Ferreira¹

2009

Port. Math.

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We present a new recursion-theoretic characterization of FCH, the hierarchy of counting functions, in binary notation. Afterwards we introduce a theory of bounded arithmetic, TCA, that can be seen as a reformulation, in the binary setting, of Jan Johannsen and Chris Pollett's system D 0 2 . Using the previous inductive characterization of FCH, we show that a strategy similar to the one applied to D 0 2 can be used in order to characterize FCH as the class of functions provably total in TCA.

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Section: Theory For Counting Arithmetic (Tca)mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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The counting hierarchy in binary notation

Ferreira¹

2009

Port. Math.

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Theories for TC0 and Other Small Complexity Classes

Nguyen¹,

Cook²

2006

Logical Methods in Computer Science

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Abstract. We present a general method for introducing finitely axiomatizable "minimal" two-sorted theories for various subclasses of P (problems solvable in polynomial time). The two sorts are natural numbers and finite sets of natural numbers. The latter are essentially the finite binary strings, which provide a natural domain for defining the functions and sets in small complexity classes. We concentrate on the complexity class TC 0 , whose problems are defined by uniform polynomial-size families of bounded-depth Boolean circuits with majority gates. We present an elegant theory VTC 0 in which the provably-total functions are those associated with TC 0 , and then prove that VTC 0 is "isomorphic" to a differentlooking single-sorted theory introduced by Johannsen and Pollet. The most technical part of the isomorphism proof is defining binary number multiplication in terms a bit-counting function, and showing how to formalize the proofs of its algebraic properties.

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VTC/sup O/: a second-order theory for TC/sup 0/

Cited by 2 publications

References 26 publications

The counting hierarchy in binary notation

The counting hierarchy in binary notation

Theories for TC0 and Other Small Complexity Classes

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