Emptiness Problems for Integer Circuits

Dominik Barth; Moritz Beck; Titus Dose; Christian Glaßer; Larissa Michler; Marc Technau

Emptiness Problems for Integer Circuits

Dominik Barth, Moritz Beck, Titus Dose, Christian Glaßer, Larissa Michler, Marc Technau

Research output: Contribution to journal › Article

Abstract

We study the computational complexity of emptiness problems for circuits over sets of natural numbers with the operations union, intersection, complement, addition, and multiplication. For most settings of allowed operations we precisely characterize the complexity in terms of completeness for classes like NL, NP, and PSPACE. The case where intersection, addition, and multiplication is allowed turns out to be equivalent to the complement of polynomial identity testing (PIT).

Our results imply the following improvements and insights on problems studied in earlier papers. We improve the bounds for the membership problem MC(+ ) studied by McKenzie and Wagner 2007 and for the equivalence problem EQ(+ ) studied by Glaßer et al. 2010. Moreover, it turns out that the following problems are equivalent to PIT, which shows that the challenge to improve their bounds is just a reformulation of a well-studied, major open problem in algebraic computing complexity:

1. membership problem MC(+ ) studied by McKenzie and Wagner 2007

2. integer membership problems MCZ(+ ), MCZ(+ ) studied by Travers 2006

3. equivalence problem EQ(+ ) studied by Glaßer et al. 2010

Original language	English
Number of pages	48
Journal	Electronic Colloquium on Computational Complexity
Volume	2017
Issue number	12
Publication status	Published - 2017
Externally published	Yes

Cite this

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title = "Emptiness Problems for Integer Circuits",

abstract = "We study the computational complexity of emptiness problems for circuits over sets of natural numbers with the operations union, intersection, complement, addition, and multiplication. For most settings of allowed operations we precisely characterize the complexity in terms of completeness for classes like NL, NP, and PSPACE. The case where intersection, addition, and multiplication is allowed turns out to be equivalent to the complement of polynomial identity testing (PIT).Our results imply the following improvements and insights on problems studied in earlier papers. We improve the bounds for the membership problem MC(+ ) studied by McKenzie and Wagner 2007 and for the equivalence problem EQ(+ ) studied by Gla{\ss}er et al. 2010. Moreover, it turns out that the following problems are equivalent to PIT, which shows that the challenge to improve their bounds is just a reformulation of a well-studied, major open problem in algebraic computing complexity:1. membership problem MC(+ ) studied by McKenzie and Wagner 20072. integer membership problems MCZ(+ ), MCZ(+ ) studied by Travers 20063. equivalence problem EQ(+ ) studied by Gla{\ss}er et al. 2010",

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T1 - Emptiness Problems for Integer Circuits

AU - Barth, Dominik

AU - Beck, Moritz

AU - Dose, Titus

AU - Glaßer, Christian

AU - Michler, Larissa

AU - Technau, Marc

PY - 2017

Y1 - 2017

N2 - We study the computational complexity of emptiness problems for circuits over sets of natural numbers with the operations union, intersection, complement, addition, and multiplication. For most settings of allowed operations we precisely characterize the complexity in terms of completeness for classes like NL, NP, and PSPACE. The case where intersection, addition, and multiplication is allowed turns out to be equivalent to the complement of polynomial identity testing (PIT).Our results imply the following improvements and insights on problems studied in earlier papers. We improve the bounds for the membership problem MC(+ ) studied by McKenzie and Wagner 2007 and for the equivalence problem EQ(+ ) studied by Glaßer et al. 2010. Moreover, it turns out that the following problems are equivalent to PIT, which shows that the challenge to improve their bounds is just a reformulation of a well-studied, major open problem in algebraic computing complexity:1. membership problem MC(+ ) studied by McKenzie and Wagner 20072. integer membership problems MCZ(+ ), MCZ(+ ) studied by Travers 20063. equivalence problem EQ(+ ) studied by Glaßer et al. 2010

AB - We study the computational complexity of emptiness problems for circuits over sets of natural numbers with the operations union, intersection, complement, addition, and multiplication. For most settings of allowed operations we precisely characterize the complexity in terms of completeness for classes like NL, NP, and PSPACE. The case where intersection, addition, and multiplication is allowed turns out to be equivalent to the complement of polynomial identity testing (PIT).Our results imply the following improvements and insights on problems studied in earlier papers. We improve the bounds for the membership problem MC(+ ) studied by McKenzie and Wagner 2007 and for the equivalence problem EQ(+ ) studied by Glaßer et al. 2010. Moreover, it turns out that the following problems are equivalent to PIT, which shows that the challenge to improve their bounds is just a reformulation of a well-studied, major open problem in algebraic computing complexity:1. membership problem MC(+ ) studied by McKenzie and Wagner 20072. integer membership problems MCZ(+ ), MCZ(+ ) studied by Travers 20063. equivalence problem EQ(+ ) studied by Glaßer et al. 2010

UR - https://eccc.weizmann.ac.il/report/2017/012

M3 - Article

SN - 1433-8092

VL - 2017

JO - Electronic Colloquium on Computational Complexity

JF - Electronic Colloquium on Computational Complexity

IS - 12

ER -

Emptiness Problems for Integer Circuits

Abstract

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