NewEvery arXiv paper, its researchers & institutions — mapped.
paper

The diffeotopy group of S^1 \times S^2 via contact topology

arXiv:0903.1488 · doi:10.1112/S0010437X09004606

Abstract

As shown by H. Gluck in 1962, the diffeotopy group of S^1 \times S^2 is isomorphic to Z_2 + Z_2 + Z_2. Here an alternative proof of this result is given, relying on contact topology. We then discuss two applications to contact topology: (i) it is shown that the fundamental group of the space of contact structures on S^1 \times S^2, based at the standard tight contact structure, is isomorphic to the integers; (ii) inspired by previous work of M. Fraser, an example is given of an integer family of Legendrian knots in S^1 \times S^2 # S^1 \times S^2 (with its standard tight contact structure) that can be distinguished with the help of contact surgery, but not by the classical invariants (topological knot type, Thurston-Bennequin invariant, and rotation number).

17 pages, 10 figures; v2: simplified proof of Lemma 6 (and extension to higher dimensions)