In this paper, following the slid product construction for loops with inverses of Pasotti and Zizioli [J Geom 100(1–2):129–145, 2011], we present the general setting in order to build up a new loop (L, ⊕) starting from loops (K, +) equipped with a well ordering “<=”, (P, +) and (P, +) with the same neutral element. The results established in the aforementioned note are generalized as well. Moreover we investigate the nuclei of L, the normality of subloops isomorphic to (K, +) and (P, +) and discuss some examples.

Slid product of loops: a generalization

PASOTTI, Stefano;ZIZIOLI, Elena
2014-01-01

Abstract

In this paper, following the slid product construction for loops with inverses of Pasotti and Zizioli [J Geom 100(1–2):129–145, 2011], we present the general setting in order to build up a new loop (L, ⊕) starting from loops (K, +) equipped with a well ordering “<=”, (P, +) and (P, +) with the same neutral element. The results established in the aforementioned note are generalized as well. Moreover we investigate the nuclei of L, the normality of subloops isomorphic to (K, +) and (P, +) and discuss some examples.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11379/268303
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