Zohar Nussinov

Zohar Nussinov

Professor of Physics
PhD, UCLA
research interests:
  • Condensed Matter Physics
  • Glass Transition

contact info:

mailing address:

  • WASHINGTON UNIVERSITY
    CB 1105
    ONE BROOKINGS DR.
    ST. LOUIS, MO 63130-4899

Zohar Nussinov's prime focus is in condensed matter physics. This covers both "hard" (electronic) and "soft" (essentially classical) systems. One of his main passions has been the study of the glass transition, but his research is diverse and spans many problems.

The application of simple statistical mechanics and classical mechanics ideas to graph theory and satisfiability problems have led to remarkably simple algorithms for old problems, with ideas resting on dynamics in high dimensions where slow convergence to the solution can be avoided.

One of the most rapidly growing fields in condensed matter physics is topological quantum orders which reexamine basic notions of order and topology. Many of the tools used borrow heavily from field theory; condensed matter systems offer a direct realization of many ideas. They also offer examples of emergent phenomena which appear at low energy scales.

Recently, the BCS-BEC transitions have been observed in cold dilute atomic gases. A long-standing issue is what exactly transpires at the transition. Although the problem is easy to pose exactly, rigorous results are scarce. Remarkable numerical work has given insight into the problem. 

"Quantum critical points" have been seen in many compounds. Nussinov and others have come up with simple model Hamiltonians which are exactly solvable and have many of the properties long predicted for such systems. Research is also conducted on the order of the atomic orbitals in transition metal oxides and on elastic defect dynamics. Additional work investigates single spin dynamics in superconducting junctions (where new mutations were predicted), "stripes" in high temperature superconductors, noise spectroscopy for examining fluctuations in small quantum systems, supersolids, avoided critical points, incommensurate phases, the role of competing orders in electronic systems, exact dimensional reductions resulting from symmetries, and the finding of new percolation crossovers in lattice gauge theories.

recent courses

Quantum Mechanics (Physics 471)

Origins of quantum theory, wave packets and uncertainty relations, Schroedinger's equation in one dimension, step potentials and harmonic oscillators, eigenfunctions and eigenvalues, Schroedinger's equation in three dimensions, the hydrogen atom, symmetry, spin and the periodic table, approximation methods for time independent problems, quantum statistics.

    Solid State Physics (Physics 472)

    Crystal structures, binding energies, thermal properties, dielectrics, magnetism, free electron theory of metals, band theory, semiconductors, defects in solids.

      Statistical Mechanics (Physics 529)

      Gibbs' formalism of statistical mechanics and applications to thermodynamics. Quantum statistical mechanics and degenerate matter. General theory of equilibrium including phase transitions and critical phenomena. Interacting particles including non-ideal gases, ferromagnetism, and superconductivity. Transport theory, irreversible processes.

        Advanced Topics in Statistical Mechanics (Physics 530)

        Critical phenomena and renormalization group theory: scaling, universality, exact solutions, series expansions, computer simulations, e-expansion. Role of solitons and instantons in phase transitions. Quantum fluids: superfluidity and superconductivity. Linear response theory and disordered systems.