Abstract
In this note, I sketch portions of the proofs of several results recently obtained jointly with C. Berger and A. Koranyi [2]. One of the main technical results of that paper has been simplified by use of a classical fact about “harmonic projection” of polynomials.
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References
C. Berger and L. Coburn, Wiener-Hopf operators on U2, Int. Eq. & Op. Thy. 2 (1979) 139–173.
C. Berger, L. Coburn, and A. Koranyi, Operateurs de Wiener-Hopf sur les spheres de Lie, C.R. Acad. Sci. Parist. 290 (9 Juin 1980) 989–991.
A. Dynin, manuscript in preparation.
D. Levine, Systems of singular int. ops. on spheres, TAMS 144 (1969) 493–522.
P. Muhly, J. Renault, C-algebras of multivariable Wiener-Hopf operators, unpublished manuscript.
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Coburn, L.A. (1982). The Koecher Norm and Toeplitz Operators in Several Variables. In: Gohberg, I. (eds) Toeplitz Centennial. Operator Theory: Advances and Applications, vol 4. Birkhäuser, Basel. https://doi.org/10.1007/978-3-0348-5183-1_10
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DOI: https://doi.org/10.1007/978-3-0348-5183-1_10
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