The space of r-immersions of a union of discs in Rn
Abstract
For a manifold M and an integer r>1, the space of r-immersions of M in Rn is defined to be the space of immersions of M in Rn such that the preimage of every point in Rn contains fewer than r points. We consider the space of r-immersions when M is a disjoint union of k m-dimensional discs, and prove that it is equivalent to the product of the r-configuration space of k points in Rn and the kth power of the space of injective linear maps from Rm to Rn. This result is needed in order to apply Michael Weiss's manifold calculus to the study of r-immersions. The analogous statement for spaces of embeddings is ``well-known'', but a detailed proof is hard to find in the literature, and the existing proofs seem to use the isotopy extension theorem, if only as a matter of convenience. Isotopy extension does not hold for r-immersions, so we spell out the details of a proof that avoids using it, and applies to spaces of r-immersions.
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