Monoid algebras and graph products

Wilfried Imrich; Igor Klep; Daniel Smertnig

doi:10.26493/2590-9770.1816.e85

Monoid algebras and graph products

Wilfried Imrich
, Igor Klep
, Daniel Smertnig

University of Ljubljana
University of Primorska

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

Abstract

n this note, we extend results about unique nth roots and cancellation of finite disconnected graphs with respect to the Cartesian, the strong and the direct product, to the rooted hierarchical products, and to a modified lexicographic product. We show that these results also hold for graphs with countably many finite connected components, as long as every connected component appears only finitely often (up to isomorphism). The proofs are via monoid algebras and generalized power series rings.

Original language	English
Article number	P1.11
Number of pages	18
Journal	Art of Discrete and Applied Mathematics
Volume	2025
Issue number	Vol. 8 No. 1
DOIs	https://doi.org/10.26493/2590-9770.1816.e85
Publication status	Published - 22 Apr 2025

Bibliographical note

Keywords

cancellation property
Graph products
monoid algebras
power series rings
uniqueness of roots

Access to Document

10.26493/2590-9770.1816.e85

Cite this

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AU - Imrich, Wilfried

AU - Klep, Igor

AU - Smertnig, Daniel

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N2 - n this note, we extend results about unique nth roots and cancellation of finite disconnected graphs with respect to the Cartesian, the strong and the direct product, to the rooted hierarchical products, and to a modified lexicographic product. We show that these results also hold for graphs with countably many finite connected components, as long as every connected component appears only finitely often (up to isomorphism). The proofs are via monoid algebras and generalized power series rings.

AB - n this note, we extend results about unique nth roots and cancellation of finite disconnected graphs with respect to the Cartesian, the strong and the direct product, to the rooted hierarchical products, and to a modified lexicographic product. We show that these results also hold for graphs with countably many finite connected components, as long as every connected component appears only finitely often (up to isomorphism). The proofs are via monoid algebras and generalized power series rings.

KW - cancellation property

KW - Graph products

KW - monoid algebras

KW - power series rings

KW - uniqueness of roots

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Monoid algebras and graph products

Abstract

Bibliographical note

Keywords

Access to Document

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Cite this