DOIAbstract
AbstractFor a manifold W of dimension m with boundary ∂W, the vanishing of certain intersection and self-intersection invariants is a necessary condition to embedding n-disks. For (W, ∂W) 2n −m connected, it is also sufficient
AbstractFor a manifold W of dimension m with boundary ∂W, the vanishing of certain intersection and self-intersection invariants is a necessary condition to embedding n-disks. For (W, ∂W) 2n −m connected, it is also sufficient
Given a smooth simply connected 4-manifold M, we prove that if there is a smoothly embedded 2-torus ...
AbstractLet M be a simple 3-manifold, i.e. one that contains no essential sphere, disk, annulus or t...
Given a connected compact n-manifold M, a natural invariant of M is the minimal number of balls whic...
AbstractFor a 2n−m connected map from an n-dimensional complex to a m-dimensional manifold, an obstr...
This is the beginning of an obstruction theory for deciding whether a map f: S2! X4 is homotopic to ...
The disc embedding theorem provides a detailed proof of the eponymous theorem in 4-manifold topology...
Abstract. An obstruction theory for representing homotopy classes of surfaces in 4– manifolds by imm...
AbstractFor a 2n−m connected map from an n-dimensional complex to a m-dimensional manifold, an obstr...
AbstractLet f : Mn−1 → Nn be an immersion with normal crossings from a compact connected (n − 1)-man...
AbstractFor n⩾4, every embedding of an (n−1)-manifold in an n-manifold has a δ-resolution for each δ...
this paper and its sequel [KrM] is to establish a lower bound for the genus of the surface, in terms...
Based on Fields medal winning work of Michael Freedman, this book explores the disc embedding theore...
AbstractLet K be a finite, connected, simplicial n-complex (n⩾3) and M a 1-connected, smooth, orient...
It is shown that a holomorphically embedded open disk in C2 and a totally real embedded open disk wh...
It is shown that a holomorphically embedded open disk in C2 and a totally real embedded open disk wh...
Given a smooth simply connected 4-manifold M, we prove that if there is a smoothly embedded 2-torus ...
AbstractLet M be a simple 3-manifold, i.e. one that contains no essential sphere, disk, annulus or t...
Given a connected compact n-manifold M, a natural invariant of M is the minimal number of balls whic...
AbstractFor a 2n−m connected map from an n-dimensional complex to a m-dimensional manifold, an obstr...
This is the beginning of an obstruction theory for deciding whether a map f: S2! X4 is homotopic to ...
The disc embedding theorem provides a detailed proof of the eponymous theorem in 4-manifold topology...
Abstract. An obstruction theory for representing homotopy classes of surfaces in 4– manifolds by imm...
AbstractFor a 2n−m connected map from an n-dimensional complex to a m-dimensional manifold, an obstr...
AbstractLet f : Mn−1 → Nn be an immersion with normal crossings from a compact connected (n − 1)-man...
AbstractFor n⩾4, every embedding of an (n−1)-manifold in an n-manifold has a δ-resolution for each δ...
this paper and its sequel [KrM] is to establish a lower bound for the genus of the surface, in terms...
Based on Fields medal winning work of Michael Freedman, this book explores the disc embedding theore...
AbstractLet K be a finite, connected, simplicial n-complex (n⩾3) and M a 1-connected, smooth, orient...
It is shown that a holomorphically embedded open disk in C2 and a totally real embedded open disk wh...
It is shown that a holomorphically embedded open disk in C2 and a totally real embedded open disk wh...
Given a smooth simply connected 4-manifold M, we prove that if there is a smoothly embedded 2-torus ...
AbstractLet M be a simple 3-manifold, i.e. one that contains no essential sphere, disk, annulus or t...
Given a connected compact n-manifold M, a natural invariant of M is the minimal number of balls whic...
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