Abstract
Let ν be the canonical Gaussian promeasure on a real and separable Hilbert space X. The symmetric Fock space of X is denoted Fock- (X). N. Wiener has constructed an isometry
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P. KRÉE Anticommutative integration and Dirac Fields. In Proceedings of “Bielefeld Encounters in Physics and Mathematics II, Quantum Fields, Algebras, Processe” (December 1978), (to be published).
P. KRÉE Equations aux dérivées partielles en dimension infinie. Séminaire 3ème année 1976 – 1977. Institut H.Poincaré (Paris). Secrétariat mathématique.
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© 1980 Plenum Press, New York
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Krée, P. (1980). Anticommutative Integration. In: Antoine, JP., Tirapegui, E. (eds) Functional Integration. Springer, Boston, MA. https://doi.org/10.1007/978-1-4615-7035-6_1
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DOI: https://doi.org/10.1007/978-1-4615-7035-6_1
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