Group-like small cancellation theory for rings

A. Atkarskaya; A. Kanel-Belov; E. Plotkin; E. Rips

doi:10.1142/S0218196723500522

Group-like small cancellation theory for rings

A. Atkarskaya^*
, A. Kanel-Belov
, E. Plotkin
, E. Rips

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

In this paper, we develop a small cancellation theory for associative algebras with a basis of invertible elements. Namely, we study quotients of a group algebra of a free group and introduce three axioms for the corresponding defining relations. We show that the obtained ring is non-trivial. Moreover, we show that this ring enjoys a global filtration that agrees with relations, find a basis of the ring as a linear space and establish the corresponding structure theorems. We also provide a revision of a concept of Gröbner basis for our rings and establish a greedy algorithm for the Ideal Membership Problem.

Original language	English
Pages (from-to)	1269-1487
Number of pages	219
Journal	International Journal of Algebra and Computation
Volume	33
Issue number	7
DOIs	https://doi.org/10.1142/S0218196723500522
State	Published - 1 Nov 2023
Externally published	Yes

Bibliographical note

Publisher Copyright:
© World Scientific Publishing Company.

Keywords

Dehn’s algorithm
Gröbner basis
Small cancellation ring
defining relations in rings
filtration
greedy algorithm
group algebra
multi-turn
small cancellation group
tensor products
turn

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10.1142/S0218196723500522

Cite this

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AU - Kanel-Belov, A.

AU - Plotkin, E.

AU - Rips, E.

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PY - 2023/11/1

Y1 - 2023/11/1

N2 - In this paper, we develop a small cancellation theory for associative algebras with a basis of invertible elements. Namely, we study quotients of a group algebra of a free group and introduce three axioms for the corresponding defining relations. We show that the obtained ring is non-trivial. Moreover, we show that this ring enjoys a global filtration that agrees with relations, find a basis of the ring as a linear space and establish the corresponding structure theorems. We also provide a revision of a concept of Gröbner basis for our rings and establish a greedy algorithm for the Ideal Membership Problem.

AB - In this paper, we develop a small cancellation theory for associative algebras with a basis of invertible elements. Namely, we study quotients of a group algebra of a free group and introduce three axioms for the corresponding defining relations. We show that the obtained ring is non-trivial. Moreover, we show that this ring enjoys a global filtration that agrees with relations, find a basis of the ring as a linear space and establish the corresponding structure theorems. We also provide a revision of a concept of Gröbner basis for our rings and establish a greedy algorithm for the Ideal Membership Problem.

KW - Dehn’s algorithm

KW - Gröbner basis

KW - Small cancellation ring

KW - defining relations in rings

KW - filtration

KW - greedy algorithm

KW - group algebra

KW - multi-turn

KW - small cancellation group

KW - tensor products

KW - turn

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EP - 1487

JO - International Journal of Algebra and Computation

JF - International Journal of Algebra and Computation

IS - 7

ER -

Group-like small cancellation theory for rings

Abstract

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Keywords

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