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2 results

  • Smooth Mappings with Higher Dimensional Critical Sets

  • Cornel Pintea
  • Journal:
    Canadian Mathematical Bulletin / Volume 53 / Issue 3 / 01 September 2010
    Published online by Cambridge University Press:
    20 November 2018, pp. 542-549
    Print publication:
    01 September 2010
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  • In this paper we provide lower bounds for the dimension of various critical sets, and we point out some differential maps with high dimensional critical sets.

  • A measure of non-immersability of the Grassmann manifolds in some euclidean spaces

  • Cornel Pintea
  • Journal:
    Proceedings of the Edinburgh Mathematical Society / Volume 41 / Issue 1 / February 1998
    Published online by Cambridge University Press:
    20 January 2009, pp. 197-205
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  • Let Gk, n, be the Grassmann manifold consisting in all non-oriented k-dimensional vector subspaces of the space Rk+n. In this paper we will show that any differentiable mapping f: Gk, nRm, has infinitely many critical points for suitable choices of the numbers m, n, k.