Variational and Parquet-diagram theory for strongly correlated normal and superfluid systems

Abstract: We develop the variational and correlated basis functions/parquet-diagram theory of strongly interacting normal and superfluid systems. The first part of this contribution is devoted to highlight the connections between the Euler equations for the Jastrow-Feenberg wave function on the one hand side, and the ring, ladder, and self-energy diagrams of parquet-diagram theory on the other side. We will show that these subsets of Feynman diagrams are contained, in a local approximation, in the variational wave funct… Show more

“…Since S(q) ∝ q for q → 0+, negative values of Ṽp−h (q) and, hence, negative values of F s 0 are permitted. In the superfluid system, the variational principle (2.7) leads to the same equation (2.28), a small additional term [25] does not change our analysis. However, the static structure function has the form…”

“…We have analyzed in Ref. 25 the relationship between specific classes of diagrams generated by the cluster expansion and optimization procedure of Jastrow-Feenberg theory, and classes of parquet diagrams, specifically rings, ladders, and self-energy corrections. Besides the localization procedures used to establish the agreement between the boson versions of Jastrow-Feenberg and parquet diagrams, a "collective" approximation must be made for the particle-hole propagator.…”

“…One should not expect that this relationship is satisfied exactly [42] when Ṽp−h (0+) is obtained by diagram summations, and F s 0 is from hydrodynamic derivatives; the (dis-)agreement can be taken as a test for the accuracy of the implementation of the theory [16,25]. Note that we define, as usual, the dimensionless Fourier transform by including a density factor ρ, i.e.…”

Variational and parquet-diagram calculations for neutron matter. III. S -wave pairing

“…Since S(q) ∝ q for q → 0+, negative values of Ṽp−h (q) and, hence, negative values of F s 0 are permitted. In the superfluid system, the variational principle (2.7) leads to the same equation (2.28), a small additional term [25] does not change our analysis. However, the static structure function has the form…”

“…We have analyzed in Ref. 25 the relationship between specific classes of diagrams generated by the cluster expansion and optimization procedure of Jastrow-Feenberg theory, and classes of parquet diagrams, specifically rings, ladders, and self-energy corrections. Besides the localization procedures used to establish the agreement between the boson versions of Jastrow-Feenberg and parquet diagrams, a "collective" approximation must be made for the particle-hole propagator.…”

“…One should not expect that this relationship is satisfied exactly [42] when Ṽp−h (0+) is obtained by diagram summations, and F s 0 is from hydrodynamic derivatives; the (dis-)agreement can be taken as a test for the accuracy of the implementation of the theory [16,25]. Note that we define, as usual, the dimensionless Fourier transform by including a density factor ρ, i.e.…”

Variational and parquet-diagram calculations for neutron matter. III. S -wave pairing

“…and its logical generalization to multiparticle correlation functions has been extremely successful. Here Φ 0 is a model state describing the statistics and, when appropriate, the geometry of the system; for fermions it is normally taken as a Slater determinant but Bardeen-Cooper-Schrieffer (BCS) states have also been used [23][24][25][26][27][28][29].…”

“…The FHNC-EL equations lead to a slightly different form [39], but note that FHNC sums more than just the particle-particle ladders. We found, however, in our numerical applications that the numerical solutions are very close.…”

Variational and parquet-diagram calculations for neutron matter: Structure and energetics

Superconductivity and superfluidity in neutron stars