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Analytic structure of Bloch functions for linear molecular chains - MaRDI portal

Analytic structure of Bloch functions for linear molecular chains

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Publication:6466027

DOI10.1103/PHYSREVB.73.035128arXivcond-mat/0510446MaRDI QIDQ6466027

Emil Prodan

Publication date: 17 October 2005

Abstract: This paper deals with Hamiltonians of the form , with v(r) periodic along the z direction, v(x,y,z+b)=v(x,y,z). The wavefunctions of H are the well known Bloch functions psin,lambda(r), with the fundamental property psin,lambda(x,y,z+b)=lambdapsin,lambda(x,y,z) and partialzpsin,lambda(x,y,z+b)=lambdapartialzpsin,lambda(x,y,z). We give the generic analytic structure (i.e. the Riemann surface) of psin,lambda(r) and their corresponding energy, En(lambda), as functions of lambda. We show that En(lambda) and psin,lambda(x,y,z) are different branches of two multi-valued analytic functions, E(lambda) and psilambda(x,y,z), with an essential singularity at lambda=0 and additional branch points, which are generically of order 1 and 3, respectively. We show where these branch points come from, how they move when we change the potential and how to estimate their location. Based on these results, we give two applications: a compact expression of the Green's function and a discussion of the asymptotic behavior of the density matrix for insulating molecular chains.












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