The Weyl calculus and Clifford analysis

Brian Jefferies; Alan McIntosh

doi:10.1017/S0004972700031695

Abstract

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The connection between Clifford analysis and the Weyl functional calculus for an n-tuple of bounded selfadjoint operators is noted. The operators do not necessarily commute with each other.

References

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Baur, Franziska and Ricker, Werner J. 2000. The Weyl calculus and a Cayley–Hamilton theorem for pairs of selfadjoint matrices. Linear Algebra and its Applications, Vol. 319, Issue. 1-3, p. 103.

Jefferies, B. and Johnson, G. W. 2001. Feynman’s operational calculi for noncommuting operators: The monogenic calculus. Advances in Applied Clifford Algebras, Vol. 11, Issue. 2, p. 239.

Jefferies, Brian 2001. Applications of the monogenic functional calculus for noncommuting systems of operators. Advances in Applied Clifford Algebras, Vol. 11, Issue. S1, p. 171.

Kisil, Vladimir V. 2001. Clifford Analysis and Its Applications. p. 135.

Jefferies, Brian and Straub, Bernd 2003. Lacunas in the Support of the Weyl Calculus for Two Hermitian Matrices. Journal of the Australian Mathematical Society, Vol. 75, Issue. 1, p. 85.

Colombo, Fabrizio and Sabadini, Irene 2008. Hypercomplex Analysis. p. 101.

Colombo, Fabrizio Sabadini, Irene and Struppa, Daniele C. 2008. A new functional calculus for noncommuting operators. Journal of Functional Analysis, Vol. 254, Issue. 8, p. 2255.

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Arfaoui, Sabrine and Ben Mabrouk, Anouar 2017. Some Ultraspheroidal Monogenic Clifford Gegenbauer Jacobi Polynomials and Associated Wavelets. Advances in Applied Clifford Algebras, Vol. 27, Issue. 3, p. 2287.

Cerejeiras, Paula Colombo, Fabrizio Kähler, Uwe and Sabadini, Irene 2019. Perturbation of normal quaternionic operators. Transactions of the American Mathematical Society, Vol. 372, Issue. 5, p. 3257.

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