Nghĩa của từ antisymmetric bằng Tiếng Việt

1. Antisymmetric synonyms, Antisymmetric pronunciation, Antisymmetric translation, English dictionary definition of Antisymmetric

2. Antisymmetric [{}] and Antisymmetric [{s}] are both equivalent to the identity symmetry

3. Antisymmetric Relation Definition

4. Antisymmetric represents the symmetry of a tensor that is Antisymmetric in all its slots

5. Antisymmetric and symmetric tensors

6. Any Antisymmetric matrix multiplied by a scalar also results in another Antisymmetric matrix

7. Antisymmetric and symmetric tensors

8. The power of an Antisymmetric matrix is equivalent to an Antisymmetric matrix or a symmetric matrix

9. The general Antisymmetric matrix is …

10. Antisymmetric and symmetric tensors

11. Every alternating multilinear map is antisymmetric.

12. What does Antisymmetric mean? Information and translations of Antisymmetric in the most comprehensive dictionary definitions resource on the web.

13. Partial orders and total orders are Antisymmetric.

14. Hence, R is an Antisymmetric relation

15. Definition of Antisymmetric in the Definitions.net dictionary

16. How to use Antisymmetric in a sentence.

17. The Antisymmetric indexing function is most commonly used as a parameter to the Matrix constructor when creating Antisymmetric Matrices (i.e., matrices where the …

18. Matrices for reflexive, symmetric and Antisymmetric relations

19. Symmetric is a related term of Antisymmetric

20. Antisymmetric tensors are also called skewsymmetric or alternating tensors

21. What does Antisymmetry mean? (mathematics) The condition of being antisymmetric

22. Antisymmetric exchange is also known as DM-interaction (for Dzyaloshinskii-Moriya)

23. Antisymmetric with respect to interchange of the electrons’ labels

24. In this article, we have focused on Symmetric and Antisymmetric Relations

25. For example, A=[0 -1; 1 0] (2) is Antisymmetric

26. Thus, it will be never the case that the other pair you're looking for is in $\sim$, and the relation will be Antisymmetric because it can't not be Antisymmetric, i.e

27. But the tensor C ik= A iB k A kB i is Antisymmetric

28. Note that if M is an Antisymmetric matrix, then so is B

29. Examples of how to use “Antisymmetric” in a sentence from the Cambridge Dictionary Labs

30. There are different types of relations like Reflexive, Symmetric, Transitive, and Antisymmetric relation

31. An Antisymmetric matrix is a Matrix which satisfies the identity (1) where is the Matrix Transpose

32. Antisymmetric if every pair of vertices is connected by none or exactly one directed line

33. The structure of the congruence classes of Antisymmetric matrices is completely determined by Theorem 2

34. Antisymmetric relation is a concept based on symmetric and asymmetric relation in discrete math

35. And a pair of indices i and j, U has symmetric and Antisymmetric parts defined as:

36. ‘The Antisymmetric tensor field carries a force that is difficult to describe in this short space.’ ‘For instance, the force between two quarks is attractive when both the colours and the spins of each quark are different, or (more precisely) Antisymmetric.’

37. A relation on a set is Antisymmetric provided that distinct elements are never both related to one another

38. In this short video, we define what an Antisymmetric relation is and provide a number of examples.

39. If an array is Antisymmetric in a set of slots, then all those slots have the same dimensions.

40. The symmetrical modes have an Antisymmetric strain pattern, whereas the electric field continues to have a symmetric pattern

41. Let’s try to construct an Antisymmetric function that describes the two electrons in the ground state of helium

42. A matrix m may be tested to see if it is Antisymmetric in the Wolfram Language using AntisymmetricMatrixQ[m]

43. Antisymmetry in all slots of a symbolic array: It can also be specified as follows: Antisymmetry in the given slots of a symbolic array: Antisymmetric [{}] and Antisymmetric [{s}] are representations of the absence of symmetry: Such cases are canonicalized to an empty list of generators:

44. It can be shown easily that an Antisymmetric second-order tensor has an matrix like this: (C ik

45. Antisymmetric Laminates ¾A laminate is called Antisymmetric if the material and thickness of the plies are the same above and below the midplane, but the ply orientations at the same distance above and below the midplane are negative of each other, i.e

46. The behavior of other particles requires that the wavefunction be Antisymmetric with respect to permutation \((e^{i\varphi} = -1)\)

47. Antisymmetric bilinear forms and wedge products are defined exactly as above, only now they are functions from × to

48. A relation R is Antisymmetric if, for all x and y, x R y and y R x => x == y

49. Note: The relation "less than or equal to" is Antisymmetric: if a ≤ b and b ≤ a, then a=b

50. In component notation, this becomes (2) Letting , the requirement becomes (3) so an Antisymmetric matrix must have zeros on its diagonal