Singular braids, singular links and subgroups of camomile type
Abstract
In this paper we find a finite set of generators and defining relations for the singular pure braid group SPn, n ≥ 3, that is a subgroup of the singular braid group SGn. Using this presentation, we prove that the center of SGn (which is equal to the center of SPn for n ≥ 3) is a direct factor in SPn but it is not a direct factor in SPn. We introduce subgroups of camomile type and prove that the singular pure braid group SPn, n ≥ 5, is a subgroup of camomile type in SGn. Also we construct the fundamental singquandle using a representation of the singular braid monoid by endomorphisms of free guandle. For any singular link we define some family of groups which are invariants of this link.
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