- A combinatorial parameterization of nilpotent orbits, twisted induction, and duality, I
- Characteristic Cycles, Multiplicities and Degrees for a Class of Small Unitary Representations
- A taxonomy of irreducible Harish-Chandra modules of regular integral infinitesimal character, II
- A taxonomy of irreducible Harish-Chandra modules of regular integral infinitesimal character
- Characteristic Cycles for a Class of Small Unitary Representations, II
- HC-Cells, Nilpotent Orbits, Primitive Ideals and Weyl Group Representations
- Tau signatures, orbits and cells, II O.S.U. Lie Groups Seminar
- Bernstein degree computations and Selberg type integrals
- Variations on a Formula of Selberg OSU Representation Theory Seminar
- Variations on a Formula of Selberg Part II: Selberg Integrals and Hypergeometric Functions `a la Kaneko
- Lecture 1: Introduction to the Atlas Program Department of Mathematics
- Lecture 2: atlas demo Department of Mathematics
- Lecture 4: LS Cells, Twisted Induction, and Duality Department of Mathematics
- Lecture 5: Admissible Representations in the Atlas Framework Department of Mathematics
- Lecture 7: HC Cells and Primitive Ideals Department of Mathematics
- On a Class of Multiplicity-Free Nilpotent KC-Orbits OSU Representation Theory Seminar
- Variations on a Formula of Barbasch and Vogan Birne Binegar
- ON A CLASS OF MULTIPLICITY-FREE NILPOTENT Abstract. Let G be a real, connected, noncompact, semisimple Lie group,
- A combinatorial parameterization of nilpotent orbits, twisted induction, and duality, II
- Lecture 3: A Combinatorial Parameterization of Nilpotent Orbits Department of Mathematics
- Accepted Manuscript On the evaluation of some Selberg-like integrals
- Subsystems, Nilpotent Orbits, and Weyl Group Representations OSU Lie Groups Seminar
- Lecture 6: Cells and Orbits Birne Binegar
- Shared Orbits OSU Lie Groups Seminar
- Tau signatures, orbits and cells, I O.S.U. Lie Groups Seminar
- Spherical Nilpotent Orbits and Unipotent Representations OSU Representation Theory Seminar