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Infinite Dimensional DeWitt Supergroups and their Bodies

Published online by Cambridge University Press:  20 November 2018

Ronald Fulp*
Affiliation:
Department of Mathematics, North Carolina State University, Raleigh NC 27695, USA e-mail: fulp@math.ncsu.edu
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Abstract

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For Dewitt super groups $G$ modeled via an underlying finitely generated Grassmann algebra it is well known that when there exists a body group $BG$ compatible with the group operation on $G$, then, generically, the kernel $K$ of the body homomorphism is nilpotent. This is not true when the underlying Grassmann algebra is infinitely generated. We show that it is quasi-nilpotent in the sense that as a Banach Lie group its Lie algebra $\kappa$ has the property that for each $a\,\in \,\kappa ,\,\text{a}{{\text{d}}_{a}}$ has a zero spectrum. We also show that the exponential mapping from $\kappa$ to $K$ is surjective and that $K$ is a quotient manifold of the Banach space $\kappa$ via a lattice in $\kappa$.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 2014

References

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