Complete divisibility problems for slowly utilized oracles (Q1083192)
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scientific article; zbMATH DE number 3976330
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Complete divisibility problems for slowly utilized oracles |
scientific article; zbMATH DE number 3976330 |
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Complete divisibility problems for slowly utilized oracles (English)
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1985
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The concept of NP-completeness relative to a slowly utilized oracle is introduced and shown to be useful for providing evidence of intractability of some problems that are not known to be NP-complete. One such problem is to decide if a sparse polynomial has a root in the integers (mod p) for prime p. Relationships between unrelativized complexity and complexity relative to a slowly utilized oracle are also given.
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polynomial divisibility
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NP-completeness relative to a slowly utilized oracle
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intractability
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sparse polynomial
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root
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unrelativized complexity
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complexity relative to a slowly utilized oracle
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0.86492044
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0.8574164
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0.84309596
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0.84268725
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0.8401928
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0.8372848
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