Closure of knitted surfaces and surface-links
Abstract
A knitted surface is a surface with or without closed components smoothly properly embedded in D2 × B2, which is a generalization of a braided surface. A knitted surface is called a 2-dimensional knit if its boundary is the closure of a trivial braid. From a 2-dimensional knit S, we obtain a surface-link in R4 by taking the closure of S. We show that any surface-link is ambient isotopic to the closure of some 2-dimensional knit. Further, we consider another type of the closure of a knitted surface, called the plat closure. It is known that any trivial surface-knot is ambient isotopic to the plat closure of a knitted surface of degree 2. We show that the plat closure of any knitted surface of degree 2 is a trivial surface-link, and any trivial surface-link is ambient isotopic to the plat closure of a knitted surface of degree 2. We also show the same result for the closure of 2-dimensional knits of degree 2.
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