Journal of Mathematical Physics, Volume 61, Issue 10, October 2020. We describe a class of super integrable systems with a local bi-super-Hamiltonian structure, including super Camassa–Holm-type systems, which can be realized as Euler-type systems on the dual of the Kuper–Ramond–Schwarz superalgebra.

## Authors

## Departments

## Libraries

## Recent Articles

- Super Camassa–Holm-type systems associated to the Kuper–Ramond–Schwarz superalgebra
- Schrödinger-type 2D coherent states of magnetized uniaxially strained graphene
- Local uniformly upper semi-continuity of random attractor for g-Navier–Stokes equation
- Hall conductance and the statistics of flux insertions in gapped interacting lattice systems
- Strong solutions to the 2D Cauchy problem of nonhomogeneous magnetohydrodynamic equations with vacuum
- Mark Yakovlevich Azbel
- Roberto Daniele Peccei
- Where does outer space begin?
- Career choices
- Science’s endangered reputation
- More thoughts on physics pedagogy
- A footnote on the founding of NSF
- Milutin Milanković’s time in Serbia
- Cold War particle-physics collaborations
- Compressibility measurements reach white dwarf pressures
- One photon’s transmission usefully controls another
- Tropical soils could be accelerating global warming
- PhD student–adviser pairing is critical, but in US physics departments it’s often haphazard
- Nanopainted art
- Reflections on an academic job search