Abstract: 

 Abstract: For each $ \lambda \in \R $ there is a Hilbert space of entire functions $ \mathcal{F}_\lambda(\C^{2n}) $ known as twisted Fock space. We show that within this space there is an algebra $ \mathcal{A}_\lambda(\C^{2n}) $ which is isometrically isomorphic to $ B(L^2(\R^n)).$ The map $ U $ defined by $ UF(z,w) =F(-iz,-iw) $ is a unitary operator on $ \mathcal{F}_\lambda(\C^{2n}) .$ We show that for any $ \varphi \in \mathcal{A}_\lambda(\C^{2n}),$ the function $ U\varphi $ can never be in $ \mathcal{A}_\lambda(\C^{2n})$ unless $ \varphi $ is a constant. This has an interpretation as an uncertainty principle for a class of operators of convolution type on the Fock space  $\mathcal{F}_\lambda(\C^{2n}).$ 

 This talk is based on my recent joint work with Rahul Garg.

Interested in meeting your fellow graduate students and learning about their research? We’re starting an informal colloquium for graduate HDR students to share interesting topics they’ve come across during their studies.  

The aim is to introduce everyone to a topic/problem and then discuss a model problem/example together. The talks will be casual and (if appropriate) provide a platform for further discussion about the model problem/example.