Spectral problem with applications in quantum complex analysis

Ludvig Faddeev
Date and time
Conference - DimaScat : Scattering Theory and Spectral Asymptotics of Differential Operators - in Honour of Dimitri Yafaev

Let $U$, $V$ be a Weyl pair $UV=q^2VU$ of unbounded self-adjoint operators, realized in $L^2(\mathbb{R})$ as $U=e^{\alpha Q}$ and $V=e^{\beta P}$, where $P$, $Q$ are canonical operators and $\alpha$, $\beta$ are positive real numbers. The operator $L=U+U^{-1}+V$ plays an important role in the theory of quantum group $SL_q(2,\mathbb{R})$, cluster algebras, quantum Liouville model, quantum Teichmuller theory. We show that $L$ has simple continuous spectrum in the interval $[2,+\infty]$. We construct its resolvent and a complete family of eigenfunctions. The talk is based on a joint article with L. Takhtajan.

Your browser does not support the video tag.
Attachment Size
faddeev.mp4 224.4 MB