vector manifold造句
例句與造句
- Consider a vector manifold as a special set of " points ".
- A manifold can be defined as a set isomorphic to a vector manifold.
- A vector manifold is characterized by its pseudoscalar.
- This linear space generates an algebra and its unit pseudoscalar characterizes the vector manifold.
- The vectors in this tangent space are different from the vectors of the vector manifold.
- It's difficult to find vector manifold in a sentence. 用vector manifold造句挺難的
- This is the manner in which the set of abstract vectors defines the vector manifold.
- This is the main difference between a vector manifold and a manifold that is isomorphic.
- then is a vector manifold, the value of is that of a simple-vector.
- The differential geometry of a manifold The relevant structure of a vector manifold is its tangent algebra.
- If i . e . this function is smooth then one says that the vector manifold is smooth.
- A vector manifold is defined similarly to how a particular GA can be defined, by its unit pseudoscalar.
- This tangent space generates a ( unit ) pseudoscalar which is a function of the points of the vector manifold.
- A vector manifold is always a subset of Universal Geometric Algebra by definition and the elements can be manipulated algebraically.
- The unit pseudoscalar of the vector manifold is a ( pseudoscalar-valued ) function of the points on the vector manifold.
- The unit pseudoscalar of the vector manifold is a ( pseudoscalar-valued ) function of the points on the vector manifold.
更多例句: 下一頁