Skip to main content Accessibility help

We use cookies to distinguish you from other users and to provide you with a better experience on our websites. Close this message to accept cookies or find out how to manage your cookie settings.

Close cookie message
×
  1. Home
  2. Search

Refine search

Refine search

Access:
Content type:
Publication date:
Apply   From and To filters
Subject: Show more
Journals Show more
Publishers: Show more
Societies Show more
Series: Show more
Collections: Show more

Actions for selected content:

Select all | Deselect all
  • View selected items
  • Export citations
  • Download PDF (zip)
  • Save to Kindle
  • Save to Dropbox
  • Save to Google Drive

Save Search

You can save your searches here and later view and run them again in "My saved searches".

Please provide a title, maximum of 40 characters.
Cancel
×

3 results

  • Yet Another Solution to the Burnside Problem for Matrix Semigroups

  • Benjamin Steinberg
  • Journal:
    Canadian Mathematical Bulletin / Volume 55 / Issue 1 / 01 March 2012
    Published online by Cambridge University Press:
    20 November 2018, pp. 188-192
    Print publication:
    01 March 2012
    • Article
      • You have access
    • PDF
    • Export citation

  • We use the kernel category to give a finiteness condition for semigroups. As a consequence we provide yet another proof that finitely generated periodic semigroups of matrices are finite.

  • Engel-4 groups of exponent 5

  • M Vaughan-Lee
  • Journal:
    Proceedings of the London Mathematical Society / Volume 74 / Issue 2 / March 1997
    Published online by Cambridge University Press:
    01 March 1997, pp. 306-334
    Print publication:
    March 1997

  • We show that if $G$ is a group of exponent 5, and if $G$ satisfies the Engel-4 identity $[x,y,y,y,y]=1$, then $G$ is locally finite. By a result of Traustason, this implies that Engel-4 5-groups are locally finite. We also show that a group of exponent 5 is locally finite if and only if it satsifies the identity

    $$[x,[y,z,z,z,z],[y,z,z,z,z]]=1.$$

    This result implies that a group of exponent 5 is locally finite if its three generator subgroups are finite.

    1991 Mathematics Subject Classification: 20D15, 20F45, 20F50.