- http://id.loc.gov/authorities/names/no2010118652
- http://viaf.org/viaf/118446797
- http://viaf.org/viaf/141137765
- http://id.loc.gov/authorities/names/no2010118631
- http://viaf.org/viaf/164830929
- http://viaf.org/viaf/139860406
- http://id.loc.gov/authorities/names/n95080199
- http://id.loc.gov/authorities/names/no97020214

- "We describe a procedure for computing Floer and symplectic homology groups, with action filtration and algebraic operations, in a class of examples. Namely, we consider closed monotone symplectic manifolds with smooth symplectic divisors, Poincaré dual to a positive multiple of the symplectic form. We express the Floer homology of the manifold and the symplectic homology of the complement of the divisor, for a special class of Hamiltonians, in terms of absolute and relative Gromov--Witten invariants, and some additional Morse-theoretic information. As an application, we compute the symplectic homology rings of cotangent bundles of spheres, and compare our results with an earlier computation in string topology."@en

- "Filtered floer and symplectic homology via Gromov-Witten theory"@en