Quantum oscillations (experimental technique)

Experiment

When a magnetic field is applied to a system of free charged fermions, their energy states are quantized into the so-called Landau levels, given by

ε l = e B m ∗ ( ℓ + 1 2 )

for integer-valued ℓ , where B is the external magnetic field and e , m ∗ are the fermion charge and effective mass respectively.

When the external magnetic field B is increased in an isolated system, the Landau levels expand, and eventually "fall off" the Fermi surface. This leads to oscillations in the observed energy of the highest occupied level, and hence in many physical properties (including Hall conductivity, resistivity, and susceptibility). The periodicity of these oscillations can be measured, and in turn can be used to determine the cross-sectional area of the Fermi surface. If the axis of the magnetic field is varied at constant magnitude, similar oscillations are observed. The oscillations occur whenever the Landau orbits touch the Fermi surface. In this way, the complete geometry of the Fermi sphere can be mapped.

Underdoped cuprates

Studies of underdoped cuprate compounds such as YBa₂Cu₃O_6+x through probes such as ARPES have indicated that these phases show characteristics of non-Fermi liquids, and in particular, the absence of well-defined Landau quasiparticles. However, quantum oscillations have been observed in these materials at low temperatures, if their superconductivity is suppressed by a sufficiently high magnetic field, which is evidence for the presence of well-defined quasiparticles with fermionic statistics. These experimental results thus disagree with those from ARPES and other probes.