Add to ORKGVia a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-manifolds on nine vertices, of which only one is non-sphere. This exceptional 3-manifold View the MathML source triangulates the twisted S2-bundle over S1. It was first constructed by Walkup. In this paper, we present a computer-free proof of the uniqueness of this non-sphere combinatorial 3-manifold. As opposed to the computer-generated proof, ours does not require wading through all the 9-vertex 3-spheres. As a preliminary result, we also show that any 9-vertex combinatorial 3-manifold is equivalent by proper bistellar moves to a 9-vertex neighbourly 3-manifold
AbstractFor d≥2, Walkup’s class K(d) consists of the d-dimensional simplicial complexes all whose ve...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
Via a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-manifolds...
AbstractVia a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-m...
Via a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-manifolds...
AbstractVia a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-m...
AbstractA complete classification is given for neighborly combinatorial 3-manifolds with 9 vertices....
We give a complete enumeration of combinatorial 3-manifolds with 10 vertices: There are precisely 24...
AbstractA complete classification is given for non-neighborly combinatorial 3-manifolds with nine ve...
AbstractIt is proved that every combinatorial 3-manifold with at most eight vertices is a combinator...
The understanding and classification of (compact) 3-dimensional manifolds (without boundary) is with...
The understanding and classication of (compact) 3-dimensional manifolds (without boundary) is with n...
For d >= 2, Walkup's class K (d) consists of the d-dimensional simplicial complexes all whose vertex...
For d >= 2, Walkup's class K (d) consists of the d-dimensional simplicial complexes all whose vertex...
AbstractFor d≥2, Walkup’s class K(d) consists of the d-dimensional simplicial complexes all whose ve...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
Via a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-manifolds...
AbstractVia a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-m...
Via a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-manifolds...
AbstractVia a computer search, Altshuler and Steinberg found that there are 1296+1 combinatorial 3-m...
AbstractA complete classification is given for neighborly combinatorial 3-manifolds with 9 vertices....
We give a complete enumeration of combinatorial 3-manifolds with 10 vertices: There are precisely 24...
AbstractA complete classification is given for non-neighborly combinatorial 3-manifolds with nine ve...
AbstractIt is proved that every combinatorial 3-manifold with at most eight vertices is a combinator...
The understanding and classification of (compact) 3-dimensional manifolds (without boundary) is with...
The understanding and classication of (compact) 3-dimensional manifolds (without boundary) is with n...
For d >= 2, Walkup's class K (d) consists of the d-dimensional simplicial complexes all whose vertex...
For d >= 2, Walkup's class K (d) consists of the d-dimensional simplicial complexes all whose vertex...
AbstractFor d≥2, Walkup’s class K(d) consists of the d-dimensional simplicial complexes all whose ve...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...
As it is well-known, the boundary of the orientable I-bundle $K X^sim I $ over the Klein bottle K is...