中文

A QES Band-Structure Problem in One Dimension

量子物理 2009-11-07 v2 凝聚态物理 高能物理 - 理论 数学物理 math.MP

摘要

I show that the potential V(x,m)=[b24m(1m)a(a+1)]\sn2(x,m)\dn2(x,m)b(a+1/2)\cn(x,m)\dn2(x,m)V(x,m) = \big [\frac{b^2}{4}-m(1-m)a(a+1) \big ]\frac{\sn^2 (x,m)}{\dn^2 (x,m)} -b(a+{1/2}) \frac{\cn (x,m)}{\dn^2 (x,m)} constitutes a QES band-structure problem in one dimension. In particular, I show that for any positive integral or half-integral aa, 2a+12a+1 band edge eigenvalues and eigenfunctions can be obtained analytically. In the limit of m going to 0 or 1, I recover the well known results for the QES double sine-Gordon or double sinh-Gordon equations respectively. As a by product, I also obtain the boundstate eigenvalues and eigenfunctions of the potential V(x)=[β24a(a+1)]\sech2x+β(a+1/2)\sechxtanhxV(x) = \big [\frac{\beta^2}{4}-a(a+1) \big ] \sech^2 x +\beta(a+{1/2})\sech x\tanh x in case aa is any positive integer or half-integer.

引用

@article{arxiv.quant-ph/0105030,
  title  = {A QES Band-Structure Problem in One Dimension},
  author = {Avinash Khare},
  journal= {arXiv preprint arXiv:quant-ph/0105030},
  year   = {2009}
}

备注

some corrections made, title slightly changed