We study integrable cases of the pairing BCS Hamiltonians containing several types of fermions and possessing non-uniform coupling constants. We prove that there exist three classes of such the integrable models associated with "Z 2-graded" non-skew-symmetric classical r-matrices with spectral parameters and Lie algebras gl(2m), sp(2m) and so(2m), respectively. The proposed models are higher rank generalizations of the so-called "p x+ip y" one-type fermion (m=1) BCS model. In the partial case of two types of fermions (m=2) the obtained models may be interpreted as N=Z, "p x+ip y" proton-neutron integrable models. In particular, in the case of sp(4) we obtain the "p x+ip y"-analogue of the famous integrable proton-neutron model of Richardson. We find the spectrum of the constructed Hamiltonians in terms of solutions of Bethe-type equations. © 2012 Elsevier B.V.
Skrypnyk, T. (2012). Non-skew-symmetric classical r-matrices and integrable "p x+ip y" proton-neutron BCS models. NUCLEAR PHYSICS. B, 864(3), 770-805 [10.1016/j.nuclphysb.2012.06.020].
Non-skew-symmetric classical r-matrices and integrable "p x+ip y" proton-neutron BCS models
SKRYPNYK, TARASPrimo
2012
Abstract
We study integrable cases of the pairing BCS Hamiltonians containing several types of fermions and possessing non-uniform coupling constants. We prove that there exist three classes of such the integrable models associated with "Z 2-graded" non-skew-symmetric classical r-matrices with spectral parameters and Lie algebras gl(2m), sp(2m) and so(2m), respectively. The proposed models are higher rank generalizations of the so-called "p x+ip y" one-type fermion (m=1) BCS model. In the partial case of two types of fermions (m=2) the obtained models may be interpreted as N=Z, "p x+ip y" proton-neutron integrable models. In particular, in the case of sp(4) we obtain the "p x+ip y"-analogue of the famous integrable proton-neutron model of Richardson. We find the spectrum of the constructed Hamiltonians in terms of solutions of Bethe-type equations. © 2012 Elsevier B.V.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.