Guardado en:
Detalles Bibliográficos
Autores principales: Kasman, Alex, Milson, Rob, Gekhtman, Michael
Formato: Preprint
Publicado: 2025
Materias:
Acceso en línea:https://arxiv.org/abs/2511.11813
Etiquetas: Agregar Etiqueta
Sin Etiquetas, Sea el primero en etiquetar este registro!
_version_ 1866910129716199424
author Kasman, Alex
Milson, Rob
Gekhtman, Michael
author_facet Kasman, Alex
Milson, Rob
Gekhtman, Michael
contents It is well known that for any wave function $ψ(x,z)$ of the KP hierarchy, there is another wave function called its ''adjoint'' such that the path integral of their product with respect to $z$ around any sufficiently large closed path is zero. For the wave functions in the adelic Grassmannian ${\rm Gr}^{\rm ad}$, the bispectral involution which exchanges the role of $x$ and $z$ also implies the existence of an ''$x$-adjoint wave function'' $ψ^{\star}(x,z)$ so that the product of the wave function, the $x$-adjoint, and the Hermite weight ${\rm e}^{-x^2/2}$ has no residue. Utilizing this, we show that the sequences of coefficient functions in the power series expansion of any KP wave function in ${\rm Gr}^{\rm ad}$ and its image under the bispectral involution at $t_2=-\frac{1}{2}$ are always ''almost bi-orthogonal'' with respect to the Hermite product. Whether the sequences have the stronger properties of being (almost) orthogonal can easily be determined in terms of KP flows and the bispectral involution. As a special case, the exceptional Hermite orthogonal polynomials can be recovered in this way. This provides both a generalization of and an explanation of the fact that the generating functions of the exceptional Hermites are certain special wave functions of the KP hierarchy. In addition, one new surprise is that the same KP wave function which generates the sequences of functions is also a generating function for the norms when evaluated at $t_1=1$ and $t_2=0$. The main results are proved using Calogero-Moser matrices satisfying a rank one condition. The same results also apply in the case of ''spin-generalized'' Calogero-Moser matrices, which produce instances of matrix orthogonality.
format Preprint
id arxiv_https___arxiv_org_abs_2511_11813
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Orthogonality with Respect to the Hermite Product, KP Wave Functions, and the Bispectral Involution
Kasman, Alex
Milson, Rob
Gekhtman, Michael
Exactly Solvable and Integrable Systems
It is well known that for any wave function $ψ(x,z)$ of the KP hierarchy, there is another wave function called its ''adjoint'' such that the path integral of their product with respect to $z$ around any sufficiently large closed path is zero. For the wave functions in the adelic Grassmannian ${\rm Gr}^{\rm ad}$, the bispectral involution which exchanges the role of $x$ and $z$ also implies the existence of an ''$x$-adjoint wave function'' $ψ^{\star}(x,z)$ so that the product of the wave function, the $x$-adjoint, and the Hermite weight ${\rm e}^{-x^2/2}$ has no residue. Utilizing this, we show that the sequences of coefficient functions in the power series expansion of any KP wave function in ${\rm Gr}^{\rm ad}$ and its image under the bispectral involution at $t_2=-\frac{1}{2}$ are always ''almost bi-orthogonal'' with respect to the Hermite product. Whether the sequences have the stronger properties of being (almost) orthogonal can easily be determined in terms of KP flows and the bispectral involution. As a special case, the exceptional Hermite orthogonal polynomials can be recovered in this way. This provides both a generalization of and an explanation of the fact that the generating functions of the exceptional Hermites are certain special wave functions of the KP hierarchy. In addition, one new surprise is that the same KP wave function which generates the sequences of functions is also a generating function for the norms when evaluated at $t_1=1$ and $t_2=0$. The main results are proved using Calogero-Moser matrices satisfying a rank one condition. The same results also apply in the case of ''spin-generalized'' Calogero-Moser matrices, which produce instances of matrix orthogonality.
title Orthogonality with Respect to the Hermite Product, KP Wave Functions, and the Bispectral Involution
topic Exactly Solvable and Integrable Systems
url https://arxiv.org/abs/2511.11813