Self-dual maps II: links and symmetry
Abstract
In this paper, we investigate representations of links that are either centrally symmetric in R3 or antipodally symmetric in S3. By using the notions of antipodally self-dual and antipodally symmetric maps, introduced and studied by the authors, we are able to present sufficient combinatorial conditions for a link L to admit such representations. The latter naturally arises sufficient conditions for L to be amphichiral. We also introduce another (closely related) method yielding again to sufficient conditions for L to be amphichiral. We finally prove that a link L, associated to a map G, is amphichiral if the self-dual pairing of G is not one of 6 specific ones among the classification of the 24 self-dual pairing Cor(G) Aut(G).
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