An extended symmetric union with multiple tangle regions and its Alexander polynomial

Abstract

The authors recently introduced a new construction of a knot as an extended symmetric union of a knot with a single tangle region. In this paper, we generalize the construction to include multiple tangle regions. The constructed knot K with a partial knot K and multiple tangle regions satisfies the following two properties: its Alexander polynomial is the product of the Alexander polynomials of the numerators of these tangles and the square of the Alexander polynomial of the partial knot K, and there exists a surjective homomorphism from the knot group of K to that of K which maps the longitude of K to the trivial element.