Department of Mathematics Directory

  • Kristen Hendricks
  • Profile Image
  • Associate Professor of Mathematics
  • TTF
  • Faculty, Research
  • Geometry and Topology
  • Specialty Area: Low-dimensional topology, symplectic topology, knot theory
  • Click for Website
  • Email:
  • Location:


  • Office Hours Custom:

    Office hours take place at Zoom Meeting ID 570 840 4797, with passcode cycle.

  • Campus: online
  • Office hours - 1:

    W 12:00pm 1:00pm

  • Campus (2): online
  • Office hours - 2:

    F 1:00pm 2:00pm

  • Research Interests: Low-dimensional topology, symplectic topology, knot theory
  • Publications:

    Kristen Hendricks, A rank inequality for the knot Floer homology of double branched covers. Algebraic & Geometric Topology 12 (2012), 2127 - 2178. (Published version) (arXiv link)

    Kristen Hendricks, Localization and the the link Floer homology of doubly-periodic knots. Journal of Symplectic Geometry, 13 (2015), 545-608. (Published version) (arXiv link)

    Kristen Hendricks, A spectral sequence for the Floer cohomology of symplectomorphisms of trivial polarization class. International Mathematics Research Notices, 2017 (2017), No. 2, 509-528. (Published version) (arXiv link)

    Kristen Hendricks and Ciprian Manolescu, Involutive Heegaard Floer homology. Duke Mathematical Journal, 166 (2017), No. 7, 1211-1299. (Published version) (arXiv link)

    Kristen Hendricks, Robert Lipshitz, and Sucharit Sarkar, A flexible construction of equivariant Floer cohomology and applications. Journal of Topology, 9 (2016), No. 4, 1153-1236. (Published version) (arXiv link)

    Kristen Hendricks, Ciprian Manolescu, and Ian Zemke, A connected sum formula for involutive Heegaard Floer homology. Selecta Mathematica, 24 (2018), No. 2, 1183-1245. (Published version) (arXiv link).

    Kristen Hendricks, Robert Lipshitz, and Sucharit Sarkar, A simplicial construction of G-equivariant Floer homology. Submitted. (arXiv link)

    Kristen Hendricks and Robert Lipshitz, Involutive bordered Floer homology. Transactions of the American Mathematical Society, 372 (2019), No. 1, 389-424. (Published version) (arXiv link)

    Kristen Hendricks and Jennifer Hom, A note on knot concordance and involutive knot Floer homology. Proceedings of the Georgia International Topology Conference. 102 (2019). (Published version) (arXiv link)

    Kristen Hendricks, Jennifer Hom, and Tye Lidman, Applications of involutive Heegaard Floer homology. Journal of the Institute of Mathematics of Jussieu. (Published version) (arXiv link)

  • Research Description:

    I am a low-dimensional and symplectic topologist. Most of my work deals with equivariant versions of invariants arising from Floer theory.

  • Class Details:

    Currently teaching Math 540: Introduction to Algebraic Topology I