Abstract
We prove that for n ≧ 1 and q > 0 the (oriented) cobordism group of fold maps of (oriented) ( n + q )-dimensional manifolds into ℝ n contains the direct sum of ⌊ q + 1)/2⌋ copies of the ( n − 1)th stable homotopy group of spheres as a direct summand. We also prove that for k ≧ 1 and q = 2 k −1 the cobordism group of fold maps of unoriented ( n + q )-dimensional manifolds into ℝ n also contains the n th stable homotopy group of the space ℝ P∞ as a direct summand. We have the analogous results about bordism groups of fold maps as well.
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