A prime decomposition theorem for string links in a thickened surface

Vladimir Tarkaev

Published 2024-03-19Version 1

We prove a prime decomposition theorem for string links in a thickened surface. Namely, we prove that any non-braid string link $\ell \subset \Sigma \times I$, where $\Sigma$ is a compact orientable (not necessarily closed) surface other than $S^2$, can be written in the form $\ell =\ell_1 \# \ldots \# \ell_m$, where $\ell_j,j=1,\ldots,m,$ is prime string link defined up to braid-equivalence, and the decomposition is unique up to permuting the order of factors in its right-hand side.