Specific heat of a non-local attractive Hubbard model

Abstract

The specific heat of an attractive (interaction G<0) non-local Hubbard model is investigated. We use a two-pole approximation which leads to a set of correlation functions. In particular, the correlation function \ <Si·Sj\ > plays an important role as a source of anomalies in the normal state of the model. Our results show that for a giving range of G and δ where δ=1-nT (nT=n+n), the specific heat as a function of the temperature presents a two peak structure. Nevertehelesss, the presence of a pseudogap on the anti-nodal points (0,π) and (π,0) eliminates the two peak structure, the low temperature peak remaining. The effects of the second nearest neighbor hopping on the specific heat are also investigated.