The Conley index, gauge theory, and triangulations - UCLA ...
The Conley index, gauge theory, and triangulations - UCLA ...
The Conley index, gauge theory, and triangulations - UCLA ...
You also want an ePaper? Increase the reach of your titles
YUMPU automatically turns print PDFs into web optimized ePapers that Google loves.
22 CIPRIAN MANOLESCU<br />
[Sat72] Hajime Sato, Constructing manifolds by homotopy equivalences. I. An obstruction to constructing<br />
PL-manifolds from homology manifolds, Ann. Inst. Fourier (Grenoble) 22 (1972), no. 1, 271–286.<br />
[Sie70] Laurence C. Siebenmann, Are nontriangulable manifolds triangulable?, Topology of Manifolds<br />
(Proc. Inst., Univ. of Georgia, Athens, Ga., 1969), Markham, Chicago, Ill., 1970, pp. 77–84.<br />
[Smi38] Paul A. Smith, Transformations of finite period, Ann. of Math. (2) 39 (1938), no. 1, 127–164.<br />
MR 1503393<br />
[SS00] András I. Stipsicz <strong>and</strong> Zoltán Szabó, Gluing 4-manifolds along Σ(2, 3, 11), Topology Appl. 106<br />
(2000), no. 3, 293–304.<br />
[Sul96] Dennis P. Sullivan, Triangulating <strong>and</strong> smoothing homotopy equivalences <strong>and</strong> homeomorphisms.<br />
Geometric Topology Seminar Notes, <strong>The</strong> Hauptvermutung book, K-Monogr. Math., vol. 1,<br />
Kluwer Acad. Publ., Dordrecht, 1996, pp. 69–103.<br />
[SW94a] Nathan Seiberg <strong>and</strong> Edward Witten, Electric-magnetic duality, monopole condensation, <strong>and</strong><br />
confinement in N = 2 supersymmetric Yang-Mills <strong>theory</strong>, Nuclear Phys. B 426 (1994), no. 1,<br />
19–52.<br />
[SW94b] , Monopoles, duality <strong>and</strong> chiral symmetry breaking in N = 2 supersymmetric QCD, Nuclear<br />
Phys. B 431 (1994), no. 3, 484–550.<br />
[Whi40] John Henry C. Whitehead, On C 1 -complexes, Ann. of Math. (2) 41 (1940), 809–824.<br />
[Wit94] Edward Witten, Monopoles <strong>and</strong> four-manifolds, Math. Res. Lett. 1 (1994), 769–796.<br />
Department of Mathematics, <strong>UCLA</strong>, 520 Portola Plaza, Los Angeles, CA 90095<br />
E-mail address: cm@math.ucla.edu