Stephen Bruce Sontz
Published 2012-05-24, updated 2012-12-19Version 2
This paper continues the study of paragrassmann algebras begun in Part I with the definition and analysis of Toeplitz operators in the associated holomorphic Segal-Bargmann space. These are defined in the usual way as multiplication by a symbol followed by the projection defined by the reproducing kernel. These are non-trivial examples of spaces with Toeplitz operators whose symbols are not functions and which themselves are not spaces of functions.
Comments: 18 pages, continues Part I in arXiv:1204.1033v3, minor updates, final version
Paragrassmann Algebras as Quantum Spaces, Part I: Reproducing Kernels
Operator Representations on Quantum Spaces
Riemann-Hilbert problems, Toeplitz operators and ergosurfaces
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