Topologically flat embedded 2-spheres in specific simply connected 4-manifolds
暂无分享,去创建一个
[1] Tian-Jun Li,et al. The minimal genus problem , 2022, Acta Mathematica Scientia.
[2] M. Nagel. Minimal genus in circle bundles over 3‐manifolds , 2014, 1410.4018.
[3] Stefan Friedl,et al. Minimal genus in 4-manifolds with a free circle action , 2012, 1204.3578.
[4] P. Teichner,et al. Higher order intersection numbers of 2-spheres in 4-manifolds , 2000, math/0008048.
[5] R. Stong. Existence of ₁-negligible embeddings in 4-manifolds. A correction to Theorem 10.5 of Freedmann and Quinn , 1994 .
[6] R. Stong. Uniqueness of π1-negligible embeddings in 4-manifolds: A correction to theorem 10.5 of Freedman and Quinn , 1993 .
[7] Ronnie Lee,et al. Locally flat 2-spheres in simply connected 4-manifolds , 1990 .
[8] F. Quinn. Ends of Maps, I , 1979 .
[9] Robion Kirby,et al. Foundational Essays on Topological Manifolds, Smoothings, and Triangulations. , 1977 .
[10] M. Nouh. THE MINIMAL GENUS PROBLEM IN CP 2 #CP 2 , 2008 .
[11] Michael H. Freedman,et al. Topology of 4-manifolds , 1990 .
[12] S. Donaldson. An application of gauge theory to four-dimensional topology , 1983 .
[13] Michael H. Freedman,et al. The topology of four-dimensional manifolds , 1982 .
[14] F. Quinn. Ends of maps. III. Dimensions 4 and 5 , 1982 .