THERMODYNAMICS AND STATISTICAL PHYSICS 2414.106 Critical Field in Superconductor (Stony Brook,
Chicago)a) If the external field is smaller than the criticalfield, then the
B-field inside thesuperconductor is zero, and the magnetizationM
becomesThis meansthat the superconductordisplaysperfectdiamagnetism(with
magnetic susceptibility The change infree energy of the
superconductor due to the increase of the external field Hmay be written
as Therefore, the free energy of the
superconductor in a field is given byThe transition toa normal stateoccurswhen the freeenergy of the super-
conducting state isequal tothat of the normalstate:Here weused the factthat,because of thenegligiblemagneticsusceptibility,
the free energy of thenormal state practicallydoes not depend on the
appliedfield. So, we havewhere Now, it iseasy tocalculate theentropy discontinuity
sincesoIf we recall that the dependence of thecriticalfield on the temperature can
be approximated by the formula where then
we can confirmthat asuperconducting state is amoreorderedstate,since
and hence