Exact quantization of the Milson potential via Romanovski-Routh polynomials
| Autor: | Natanson, Gregory |
|---|---|
| Rok vydání: | 2013 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | The paper re-examines Milson's analysis of the rational Sturm-Liouville (RSL) problem with two complex conjugated regular singular points -i and +i by taking advantage of Stevenson's complex linear-fraction transformation S(y) of the variable y restricted to the real axis. It was explicitly demonstrated that Stevenson's hypergeometric polynomials in a complex argument S are nothing but Romanovsky polynomials converted from y to S. The use of Stevenson's mathematical arguments unambiguously confirmed 'exact solvability' of the Milson potential. It was revealed that the Milson potential has two branches referred to as 'inside' and 'outside' depending on positions of zeros of the so-called 'tangent polynomial' (TP) relative to the unit circle. The two intersect along the shape-invariant Gendenshtein (Scarf II) potential. The remarkable feature of the RCSLE associated with the inner branch of the Milson potential (as well as its shape-invariant limit) is that it has two sequences of nodeless almost-everywhere holomorphic (AEH) solutions which can be used as factorization functions (FFs) for constructing new quantized-by-polynomials potentials. In case of the Gendenshtein potential complex-conjugated characteristic exponents (ChExps) at finite singular points of the given RCSLE become energy independent so that each polynomial sequence turns into a finite set of orthogonal polynomials. This confirms Quesne's conjecture [J. Math. Phys. 54 122103 (2013)] that the 'Case III' polynomials discovered by her can be used for constructing orthogonal polynomials of novel type. Comment: 46 pages |
| Databáze: | arXiv |
| Externí odkaz: |
|