Li, Tao Boundary curves of surfaces with the 4–plane property. (English) Zbl 1021.57008 Geom. Topol. 6, 609-647 (2002). A surface in a 3-manifold is said to have the 4-plane property if its preimage in the universal cover of the 3-manifold is a union of planes, and among any collection of 4 planes, there is a disjoint pair. In this paper, the author shows that for an orientable and irreducible 3-manifold \(M\) whose boundary is a compressible torus and does not contain any closed nonperipheral embedded incompressible surfaces, the immersed surfaces in \(M\) with the 4-plane property can realize only finitely many boundary slopes. This theorem generalizes a result of A. E. Hatcher [Pac. J. Math. 99, 373-377 (1982; Zbl 0502.57005)] in the theory of incompressible surfaces. However, Hatcher’s theorem is not true for immersed \(\pi _1\)-injective surfaces in general. Aitchison and Rubinstein have shown that if a 3-manifold has a nonpositive cubing, then it contains a surface with the 4-plane property. This paper shows that only finitely many Dehn fillings of \(M\) can yield 3-manifolds with nonpositive cubings. This gives examples of hyperbolic 3-manifolds that do not admit any nonpositive cubings. Reviewer: Masako Kobayashi (Osaka) Cited in 3 Documents MSC: 57M50 General geometric structures on low-dimensional manifolds 57M25 Knots and links in the \(3\)-sphere (MSC2010) 57N10 Topology of general \(3\)-manifolds (MSC2010) 57M07 Topological methods in group theory Keywords:3-manifold; immersed surface; nonpositive cubing; 4-plane property; immersed branched surface Citations:Zbl 0502.57005 PDF BibTeX XML Cite \textit{T. Li}, Geom. Topol. 6, 609--647 (2002; Zbl 1021.57008) Full Text: DOI arXiv EuDML EMIS OpenURL References: [1] I R Aitchison, J H Rubinstein, An introduction to polyhedral metrics of nonpositive curvature on 3-manifolds, London Math. Soc. Lecture Note Ser. 151, Cambridge Univ. Press (1990) 127 · Zbl 0735.57005 [2] M D Baker, On boundary slopes of immersed incompressible surfaces, Ann. Inst. Fourier (Grenoble) 46 (1996) 1443 · Zbl 0864.57015 [3] M Baker, D Cooper, Immersed, virtually-embedded, boundary slopes, Topology Appl. 102 (2000) 239 · Zbl 1002.57043 [4] A Candel, Laminations with transverse structure, Topology 38 (1999) 141 · Zbl 0926.57007 [5] Y Choi, \((3,1)\) surfaces via branched surfaces, PhD thesis, Caltech (1998) [6] J Christy, Immersing branched surfaces in dimension three, Proc. Amer. Math. Soc. 115 (1992) 853 · Zbl 0757.57016 [7] M Culler, W Jaco, H Rubinstein, Incompressible surfaces in once-punctured torus bundles, Proc. London Math. Soc. \((3)\) 45 (1982) 385 · Zbl 0515.57002 [8] W Floyd, A Hatcher, Incompressible surfaces in punctured-torus bundles, Topology Appl. 13 (1982) 263 · Zbl 0493.57004 [9] W Floyd, U Oertel, Incompressible surfaces via branched surfaces, Topology 23 (1984) 117 · Zbl 0524.57008 [10] M Freedman, J Hass, P Scott, Least area incompressible surfaces in 3-manifolds, Invent. Math. 71 (1983) 609 · Zbl 0482.53045 [11] D Gabai, U Oertel, Essential laminations in 3-manifolds, Ann. of Math. \((2)\) 130 (1989) 41 · Zbl 0685.57007 [12] M Gromov, Hyperbolic groups, Math. Sci. Res. Inst. Publ. 8, Springer (1987) 75 · Zbl 0634.20015 [13] W Haken, Theorie der Normalflächen, Acta Math. 105 (1961) 245 · Zbl 0100.19402 [14] J Hass, P Scott, Homotopy equivalence and homeomorphism of 3-manifolds, Topology 31 (1992) 493 · Zbl 0771.57007 [15] A E Hatcher, On the boundary curves of incompressible surfaces, Pacific J. Math. 99 (1982) 373 · Zbl 0502.57005 [16] A Hatcher, W Thurston, Incompressible surfaces in 2-bridge knot complements, Invent. Math. 79 (1985) 225 · Zbl 0602.57002 [17] H Imanishi, On the theorem of Denjoy-Sacksteder for codimension one foliations without holonomy, J. Math. Kyoto Univ. 14 (1974) 607 · Zbl 0296.57006 [18] W Jaco, J H Rubinstein, PL minimal surfaces in 3-manifolds, J. Differential Geom. 27 (1988) 493 · Zbl 0652.57005 [19] J H Rubinstein, Triangulations of 3-manifolds, New Stud. Adv. Math. 3, Int. Press, Somerville, MA (2003) 74 · Zbl 1047.57011 [20] H Kneser, Geschlossene Flachen in Dreidimensionalen Mannigfaltigkeiten, Jahres. der Deut. Math. Verein. 38 (1929) 248 · JFM 55.0311.03 [21] T Li, An algorithm to find vertical tori in small Seifert fiber spaces, Comment. Math. Helv. 81 (2006) 727 · Zbl 1105.57019 [22] J Maher, Virtually embedded boundary slopes, Topology Appl. 95 (1999) 63 · Zbl 0940.57024 [23] L Mosher, Geometry of cubulated 3-manifolds, Topology 34 (1995) 789 · Zbl 0869.57015 [24] L Mosher, U Oertel, Spaces which are not negatively curved, Comm. Anal. Geom. 6 (1998) 67 · Zbl 0915.53020 [25] U Oertel, Incompressible branched surfaces, Invent. Math. 76 (1984) 385 · Zbl 0539.57006 [26] U Oertel, Boundaries of \(\pi_1\)-injective surfaces, Topology Appl. 78 (1997) 215 · Zbl 0879.57014 [27] U Oertel, Measured laminations in 3-manifolds, Trans. Amer. Math. Soc. 305 (1988) 531 · Zbl 0652.57006 [28] H Rubinstein, M Sageev, Intersection patterns of essential surfaces in 3-manifolds, Topology 38 (1999) 1281 · Zbl 0924.57023 [29] W P Thurston, The Geometry and Topology of 3-manifolds, Princeton University (1977-1978) [30] F Waldhausen, On irreducible 3-manifolds which are sufficiently large, Ann. of Math. \((2)\) 87 (1968) 56 · Zbl 0157.30603 This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.