Topologically example sentences

"Topologically" Example Sentences

1. Topologically, this problem is equivalent to the one we solved last week.
2. The sphere and the torus are not topologically equivalent.
3. Topologically, a donut is the same as a coffee cup.
4. This space is topologically connected but not path-connected.
5. Topologically speaking, this graph is a tree.
6. The topology of this space is topologically non-trivial.
7. Topologically, a Klein bottle is a non-orientable surface.
8. These two surfaces are topologically equivalent.
9. Topologically, this manifold is equivalent to the real projective space.
10. Topologically, this graph is a complete bipartite graph.
11. The topologically dual of the graph is a planar graph.
12. Topologically, this surface can be embedded in three-dimensional space.
13. This surface is topologically non-trivial when viewed as an embedded submanifold.
14. Topologically, this knot is equivalent to a trefoil knot.
15. The topology of this space is topologically discrete.
16. Topologically, this surface is homeomorphic to a cylinder.
17. The topology of this manifold is topologically non-trivial.
18. Topologically, this graph is a directed acyclic graph.
19. This space is topologically equivalent to a solid ball.
20. Topologically, this knot is equivalent to a figure-eight knot.
21. The topology of this space is topologically trivial.
22. Topologically, this space is infinite-dimensional.
23. The topology of this manifold is topologically connected.
24. Topologically, this graph can be embedded in two-dimensional space.
25. This surface is topologically equivalent to a torus when viewed as an embedded submanifold.
26. Topologically, this graph is a cycle graph.
27. This space is topologically non-compact.
28. Topologically, this surface is homeomorphic to a Moebius strip.
29. The topology of this space is topologically Hausdorff.
30. Topologically, this manifold is equivalent to the complex projective plane.

Common Phases

1. Topologically speaking;
2. Topologically separated;
3. Topologically isolated;
4. Topologically distinct;
5. Topologically closed;
6. Topologically open;
7. Topologically equivalent;
8. Topologically compact;
9. Topologically continuous;
10. Topologically homeomorphic.