compact abelian group造句
例句与造句
- The theorem also holds more generally in locally compact abelian groups.
- The representation theory for locally compact abelian groups is described by Pontryagin duality.
- The real line \ mathbf { R } is a locally compact abelian group.
- The following books have chapters on locally compact abelian groups, duality and Fourier transform.
- It can be extended to the Fourier transform of abstract harmonic analysis defined over locally compact abelian groups.
- It's difficult to find compact abelian group in a sentence. 用compact abelian group造句挺难的
- In the special case when " R " is the ring of locally compact abelian group.
- For a locally compact abelian group " G ", every irreducible unitary representation has dimension 1.
- A similar result is true when "'R "'is replaced by any locally compact abelian group.
- *Suppose that G is a locally compact abelian group that contains the unit circle \ mathbb T as a subgroup.
- This generalization yields the usual Fourier transform when the underlying locally compact Abelian group is "'R " '.
- The "'Pontryagin duality theorem "'itself states that locally compact abelian groups identify naturally with their bidual.
- This was improved to cover the general locally compact abelian groups by Egbert van Kampen in 1935 and Andr?Weil in 1940.
- In this case, the unitary dual \ hat { G } is a group, in fact another locally compact abelian group.
- The dual group of a locally compact abelian group is used as the underlying space for an abstract version of the Fourier transform.
- In what follows, "'LCA "'is the category of locally compact abelian groups and continuous group homomorphisms.
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