The Word Problem and Power Problem in 1-Relator Groups is Elementary,

Cannonito, F. B.; Gatterdam, R. W.

The Word Problem and Power Problem in 1-Relator Groups is Elementary,

Active / Technical Report | Accession Number: AD0741894 |

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Abstract:

The work extends the study of the solvability level of the word problem in finitely generated groups with respect to the Grzegorczyk hierarchy. In particular, the paper presents a proof of the elementary decidability of the word problem, order problem, and power problem in finitely generated groups presentable on 1 defining relator. The magnus theorem proof is used to show that the algorithm giving the solution to the word problem can always be realized as a function in the third level of the Grzegorczyk hierarchy. These are the so-called Kalmar elementary functions. Author

Author(s):

Cannonito, F. B. ; Gatterdam, R. W.

Author Organization(s):

CALIFORNIA UNIV IRVINE DEPT OF MATHEMATICS

Supplementary Note:

Prepared in cooperation with Wisconsin Univ., Kenosha.

Pagination:

0017

Security Markings

DOCUMENT & CONTEXTUAL SUMMARY

Distribution:

Approved For Public Release

RECORD

Collection: TR

Identifying Numbers

Report Number(s):

AFOSR-TR-72-1033

Contract/Grant Number(s):

AF-AFOSR-1321-67

Project Number(s):

AF-9769

Monitor Series:

TR-72-1033

Subject Terms

Communities of Interest:

No COI(s) Identified

Descriptor(s):

(*GROUPS(MATHEMATICS), MATHEMATICAL LOGIC), ALGEBRA, SET THEORY, RECURSIVE FUNCTIONS, THEOREMS

Field(s)/Group(s):

Theoretical Mathematics

Keyword(s):

WORD PROBLEM, GROUP THEORY

Report Date:

1972 May 04