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The bispectral problem, the Darboux process, monodromy and the Hermite operator

Published 4 Sep 2025 in math.CA | (2509.04158v1)

Abstract: The complete solution of the bispectral problem for the Schr\"odinger operator $L=-\tfrac{d2}{dx2}+V(x)$ in DG is obtained by the application of the Darboux process to the cases of $V=0$ and $V(x)=-\tfrac{1}{4x2}$. Both of these cases are trivially bispectral and after repeated applications of the Darboux process one gets either a pair of rank one bundles of bispectral situations (when starting from $V=0$) or a rank two bispectral bundle (when starting from $V(x)=-\tfrac{1}{4x2}$). In the first case all operators have ''trivial monodromy'' as defined in [DG]. In the second case the monodromy group of all operators is given by the integers. In this paper we start from $V(x)=x2$, use the Darboux process and explore the connection between the rank of certain non-polynomial bispectral families and trivial monodromy by means of examples. The main conclusion is that the results in [DG] do not apply verbatim in this case.

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