| Zentralblatt MATH - REVIEW SUBMISSION FORM |
Zentralblatt MATH
HOME
|
| Name: | ||||
| Miloslav Znojil | ||||
| Reviewer number: | ||||
| 9689 | ||||
| Email: | ||||
| znojil@ujf.cas.cz | ||||
| Item's zbl-Number: | ||||
| DE 018 119 071 | ||||
| Author(s): | ||||
| Gibson, Peter C.: | ||||
| Shorttitle: | ||||
| Inverse spectral theory of finite Jacobi matrices | ||||
| Source: | ||||
| Trans. Am. Math. Soc. 354, No. 12, 4703 - 4749 (2002) | ||||
| Classification: | ||||
| ||||
| Primary Classification: | ||||
| ||||
| Secondary Classification: | ||||
| ||||
| Keywords: | ||||
| Jacobi matrices; Titchmarsh-Weyl m-function; orthogonal polynomials; inverse spectral theory; Green's function; probability distributions; factorization of the inverse problem; parametrization of the fibres; singular solutions; explicit formulas | ||||
| Review: | ||||
People who love Jacobi matrices will be excited as well as puzzled by the presented construction. And there definitely exist quite a few, even if only for the close connection between the Jacobi matrices J and physics. For the rest of the population, the text is probably too thick. Still, its reading is of its own reward: its relationship to the classical moment problem offers the key sample reason, and for me it was its character of the generalization of the old relationship of J to continued fractions and so called Titchmarsh-Weyl m-functions. \par An arbitrary prescribed function f(z) is assumed equal to the (i,j)'s Green's function of some J which is to be re-constructed. The core of the paper lies in the proposal of a geometric arrangement of the information about the solution set: In an overall setting using the language of orthogonal polynomials and probability distribution functions (p.d.f.s), the first surprise comes at the very start: a non-diagonal generalization of the problem is considered [for the first time, as far as I know (and the author claims)]. In fact, the absolute value of the difference of indices i and j is an invariant of the solution set, and it makes the difference if it vanishes (solution - re-derived here - was known) or not (the results are new and qualitatively different). \par In order to factor the map of J on f, the paper describes, roughly speaking, a bijective parametrization of p.d.f.s and subdeterminants q of J. This characterizes the solution set in geometric language [as a fibration over a (connected) coordinate base] and opens the way towards constructions via the intermediate, so called auxiliary polynomial of a solution. In this formulation, the inverse problem is reduced to the construction of the fibres which makes use of the properties of roots. As a result, every output of the construction is shown to be a solution (the existence of which is assumed), and one becomes free to generate formulas for solutions. \par People who still hesitate may be definitely persuaded and impressed by an explicit illustrative example on p. 4746. | ||||
| Remarks to the editors: | ||||