Presentations and Talks

  1. QAOA: The Good, the Bad, and the Math, Quantum Information and Computing Seminar, University of Delaware, U.S.A. slides
  2. QAOA: How to Exploit Symmetries, QCE 2024, Workshop on Quantum Algorithms for Combinatorial Optimization, Palais des Congres, Montreal, Canada, slides
  3. QAOA: Reductions, Choice of Mixer Hamiltonians, and Convergence Guarantees, MOPTA, Lehigh University, U.S.A., slides
  4. Of Representation Theory and Quantum Approximate Optimization Algorithm, SIAM Conference on Parallel Processing for Scientific Computing, Baltimore, Maryland, U.S.A.
  5. Quandles: Knot Invariants and Structures on Topological Spaces, UCR Geometry-Topology seminar, University of California, Riverside
  6. The universe inside Hall algebras of coherent sheaves on toric resolutions, KOALA 2023, Ohio State University, slides
  7. Around Hall algebras in 50 minutes, Algebra, Combinatorics and Geometry seminar, University of Pittsburgh, slides
  8. On G-Hilbert schemes and McKay Correspondence, Algebra, Combinatorics and Geometry seminar, University of Pittsburgh, slides
  9. Images of skyscraper sheaves on toric resolutions: cohomology distribution, Algebra, Combinatorics and Geometry seminar, University of Pittsburgh, slides
  10. On categories O of quiver varieties overlying the bouquet graphs, Representation theory seminar, University of Massachusetts, Amherst
  11. On G-Hilbert schemes and McKay Correspondence, GASG seminar, Northeastern University
  12. On categories O for conical symplectic resolutions, GASG seminar, Northeastern University
  13. Manipulable Outcomes for Scoring Voting Rules, COMSOC Video Seminar, slides
  14. Ring theoretic aspects of quandles, University of South Florida, Tampa, FL, USA

Expository Talks

  1. Nakajima quiver varieties & affine Grassmannians, Seminar on Affine Grassmannians, University of Pittsburgh, slides
  2. Mirkovic-Vilonen cycles and polytopes, Seminar on Affine Grassmannians, University of Pittsburgh, slides
  3. Introduction to affine Grassmannians, Seminar on Affine Grassmannians, University of Pittsburgh, notes
  4. Soergel bimodules, Hecke algebras, and Kazhdan-Lusztig basis, MIT-NEU Graduate seminar on category O and Soergel bimodules, notes
  5. Shuffle Algebras vs Elliptic Hall Algebras, MIT-NEU Graduate Student Seminar on Double affine Hecke algebras and elliptic Hall algebras, notes
  6. Toda lattice and Tomei's theorem, Northeastern Research Seminar in Mathematics, notes
  7. Classification of solutions of the classical Yang-Baxter equation (CYBE), a talk given at the course "Differential equations and Quantum groups", notes
  8. Gieseker moduli space as a Nakajima quiver variety, MIT-NEU Graduate seminar on quiver varieties, notes
  9. A geometric Littlewood-Richardson rule, NEU graduate seminar