geodesically造句

例句与造句

1. The drainhole manifold is, therefore, geodesically complete.
2. Consequently, M ( hence also T ) is geodesically incomplete, despite the fact that T is compact.
3. This shows explicitly why the Rindler chart is " not " geodesically complete; timelike geodesics run outside the region covered by the chart in finite proper time.
4. The theorem holds also for Hilbert manifolds in the sense that the exponential map of a non-positively curved geodesically complete connected manifold is a covering map (; ).
5. If, moreover, " M " is assumed to be geodesically complete, then the theorem holds globally, and each " M i " is a geodesically complete manifold.
6. It's difficult to find geodesically in a sentence. 用geodesically造句挺难的
7. If, moreover, " M " is assumed to be geodesically complete, then the theorem holds globally, and each " M i " is a geodesically complete manifold.
8. Hyperbolic groups have a solvable strongly geodesically automatic, that is, there is an automatic structure on the group, where the language accepted by the word acceptor is the set of all geodesic words.
9. Of course, we already knew that the Rindler chart cannot be geodesically complete, because it covers only a portion of the original Cartesian chart, which " is " a geodesically complete chart.
10. Of course, we already knew that the Rindler chart cannot be geodesically complete, because it covers only a portion of the original Cartesian chart, which " is " a geodesically complete chart.
11. If X is a Riemannian manifold and G its full group of isometry, then a ( G, X )-structure is complete if and only if the underlying Riemannian manifold is geodesically complete ( equivalently metrically complete ).
12. In the cases of negative and zero curvature, the M鯾ius band can be constructed as a ( geodesically ) complete surface, which means that all geodesics ( " straight lines " on the surface ) may be extended indefinitely in either direction.
13. The Hopf Rinow theorem asserts that it is possible to define the exponential map on the whole tangent space if and only if the manifold is complete as a metric space ( which justifies the usual term "'geodesically complete "'for a manifold having an exponential map with this property ).
14. Barnes Wallis, inspired by his earlier experience with light alloy structures and the use of geodesically-arranged wiring to distribute the lifting loads of the gasbags in the design of the " R100 " airship, evolved the geodetic construction method ( although it is commonly stated, there was no geodetic " structure " in " R100 " ).
15. You can think of this as saying that every point of spacetime is really a little circle ( that is, spacetime is really \ mathbb { R } ^ 4 \ times S ^ 1 rather than \ mathbb { R } ^ 4 ), and the so-called " force " of electromagnetism is the result of moving geodesically through a spacetime where the circles at different points are rotated relative to each other.