Algebraic equations for a class of P. L. spaces. (English) Zbl 0343.57006


57Q25 Comparison of PL-structures: classification, Hauptvermutung
14J10 Families, moduli, classification: algebraic theory
14M10 Complete intersections
Full Text: DOI EuDML


[1] Artin, M.: The Nash conjecture (after Tognoli)
[2] King, H.: Approximating submanifolds of real projective space by varieties. (to appear) · Zbl 0316.57015
[3] Kuiper, N.H.: Algebraic equations for nonsmoothable 8-manifolds. I.H.E.S. No. 33, 1968 · Zbl 0174.54902
[4] Kuo, T.C.: Characterization ofv-sufficiency of jets. Topology 2, No. 1 (1972)
[5] Milnor, J.: Remarks concerning spin manifolds. Differential and Combinatorial Topology, p. 55, A Symposium in Honor of M. Morse, Princeton
[6] Milnor, J.: Singular points of complex hypersurfaces. Ann. of Math., Study 61 · Zbl 0184.48405
[7] Nash, J.: Real algebraic manifolds. Ann. of Math.56 (1952) · Zbl 0048.38501
[8] Palais, R.: Real algebraic manifolds. (Unpublished notes) · Zbl 0281.57015
[9] Thom, R.: Local topological properties of differentiable mappings. Bombay: Differential Analysis Oxford Press, London 1964 · Zbl 0151.32002
[10] Tognoli, A.: Su una congettura di Nash.. Annali di Sc. Norm. Pisa27, 167-185 (1973)
[11] Stong, R.E.: Notes on cobordism theory. Princeton: Princeton University Press 1968 · Zbl 0181.26604
[12] Tarski, A.: A decision procedure for elementary algebra and geometry. University of California Press 1951 · Zbl 0044.25102
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