1 / 7

References

References. This talk is based primarily on joint work with E. G. Goodaire, which may be found in the following articles: Bol loops of nilpotence class 2, O. Chein and E.G. Goodaire, Canadian Journal of Mathematics, to appear.

maja
Download Presentation

References

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. References

  2. This talk is based primarily on joint work with E. G. Goodaire, which may be found in the following articles: • Bol loops of nilpotence class 2, O. Chein and E.G. Goodaire, Canadian Journal of Mathematics, to appear. • A new construction of Bol loops of order 8m, O. Chein and Edgar G. Goodaire, J. Algebra, 287 (1) (2005), 103-122. • Bol loops with a unique nonidentity commutator/associator, O. Chein and Edgar G. Goodaire, submitted. A new construction of Bol loops: The "odd" case, O. Chein and Edgar G. Goodaire, submitted.

  3. Loops Whose Loop Rings are Alternative, O. Chein and E. G. Goodaire, Comm. In Algebra, 14 (1986), pp.293-310. • Moufang Loops with Limited Commutativity and One Commutator, O. Chein and E. G. Goodaire, Arch. der Math. 51 (1988), pp. 92-96. • Moufang Loops with a Unique Nonidentity Commutator (Associator, Square), O. Chein and E. G. Goodaire, J. Algebra 130 (1990), pp. 369-384. • Code Loops are RA2 Loops, O. Chein and E. G. Goodaire, J. Algebra 130 (1990), pp. 385-387. • Loops Whose Loop Rings in Characteristic 2 are Alternative, O. Chein and E. G. Goodaire, Comm. in Algebra 18 (1990), pp. 659-688.

  4. Minimally nonassociative commutative Moufang loops, O. Chein and E. G. Goodaire, Results in Mathematics 39 (2001), pp. 11-17. • Minimally nonassociative Moufang loops with a unique nonidentity commutator are ring alternative, O. Chein and E. G. Goordaire, Commentationes Mathematicae Universitatis Carolinae 43 (2002), pp. 1-8. • Minimally nonassociative nilpotent Moufang loops, O. Chein and E. G. Goodaire, J. Algebra 268(1) (2003), 327-342.

  5. When is an L(B,m,n,r,s,t,z,w) loop SRAR, O. Chein and Edgar G. Goodaire, submitted. SRAR loops with more than two commutator/associators, O. Chein and Edgar G. Goodaire, submitted.

More Related