Rupert works in Analysis, PDE and Mathematical Physics. His research aims at developing new mathematical tools that enhance our qualitative and quantitative understanding of complex phenomena occurring in nature. Of particular interest are problems related to Quantum Physics.

Some recorded talks:

Lieb-Thirring bounds and other inequalities for orthonormal functions (Probability and Analysis Webinair, February 22, 2021)

Which magnetic fields support a zero mode? (Geometric Analysis Seminar, January 12, 2021)

Inequalities for L^p norms that sharpen the triangle inequality (Corona Seminar, December 10, 2020)

Recent results and open problems on Lieb-Thirring inequalities (Math Phys Seminar, Rutgers, November 18, 2020)

Minimal magnetic fields supporting a zero mode (Ari Laptev's 70th birthday conference, August 12, 2020)

Sharp Weyl Laws in 3d with rough potentials (Spectral geometry in the clouds Seminar, July 6, 2020)

A `liquid-solid' phase transition in a simple model for swarming (One World PDE Seminar, June 2, 2020)

Minicourse: A microscopic derivation of Ginzburg-Landau theory Part I, Part II, Part III (IHES, July 2016)

Stability estimates for the lowest eigenvalue of a Schrödinger operator (Banff, August 1, 2013)

Uniqueness and Nondegeneracy of Ground States for Non-Local Equations (Institute of Advanced Study, Princeton, October 19, 2012)

Editorial activity

Communications in Contemporary Mathematics

Journal in Mathematical Physics

Journal of Spectral Theory

SIAM Journal on Mathematical Analysis