(Just a remark: this has not been updated in some time.)
Several of my talks are available online:
“An introduction to embedded contact homology” is an expository talk which could be of interest to researchers wanting to know more about embedded contact homology.
“Volume in Seiberg-Witten theory and the existence of two Reeb orbits”
is a talk on my joint work about volume in Seiberg-Witten theory and the existence of two Reeb orbits.
“Symplectic embeddings from concave toric domains into convex ones” is a talk I gave on my work on symplectic embeddings of toric domains.
“Symplectic embeddings of products” is a talk on my joint work on higher dimensional symplectic embedding problems.
“From symplectic geometry to combinatorics and back” is a talk on an irrational version of Ehrhart theory that naturally arises in symplectic embedding problems
“From one Reeb orbit to two” is a short talk I gave about some problems in three-dimensional Reeb dynamics.
“Two or infinity” is a talk I gave about my work showing that in many cases there are either two or infinitely many Reeb orbits on closed three-manifolds.
Here are some slides from powerpoint presentations that I’ve given (many of these are for the talks above):
“Symplectic embeddings of concave toric domains into convex ones”
“Reeb dynamics in dimension 3”
“What can symplectic geometry tell us about Hamiltonian dynamics?”
“Counting lattice points in triangles and the “Fibonacci staircase”” (For a talk at an undergraduate seminar)