isogeny造句

例句与造句

1. The terms " isogeny " and " isogenous " come from the Greek word ???????-?, meaning " equal in kind or nature ".
2. Such a map is always surjective and has a finite kernel, the order of which is the " degree " of the isogeny.
3. They use the same linear coefficients they used above with the points they received to form a point in the kernel of an isogeny that they will create.
4. The Jacobian of the modular curve can ( up to isogeny ) be written as a product of irreducible Abelian varieties, corresponding to Hecke eigenforms of weight 2.
5. The term " isogeny " was introduced by Weil; before this, the term " isomorphism " was somewhat confusingly used for what is now called an isogeny.
6. It's difficult to find isogeny in a sentence. 用isogeny造句挺难的
7. The term " isogeny " was introduced by Weil; before this, the term " isomorphism " was somewhat confusingly used for what is now called an isogeny.
8. Both the Ring-LWE key exchange and supersingular isogeny Diffie-Hellman ( SIDH ) key exchange can support forward secrecy in one exchange with the other party.
9. showed that the map taking an isogeny class to the eigenvalues of the Frobenius is injective, and showed that this map is surjective, and therefore a bijection.
10. The semisimple Lie groups of real rank 1 without compact factors are ( up to isogeny ) those in the following list ( see List of simple Lie groups ):
11. 3A . A uses the point R _ A to create an isogeny mapping \ phi _ A : E \ rightarrow E _ A and curve E _ A isogenous to E.
12. For 128 bits of security in the supersingular isogeny Diffie-Hellman ( SIDH ) method, De Feo, Jao and Plut recommend using a supersingular curve modulo a 768-bit prime.
13. An isogeny between algebraic groups is a surjective morphism with finite kernel; two tori are said to be " isogenous " if there exists an isogeny from the first to the second.
14. An isogeny between algebraic groups is a surjective morphism with finite kernel; two tori are said to be " isogenous " if there exists an isogeny from the first to the second.
15. Duncan Frenkel ( ) produced additional evidence for this duality by using Rademacher sums to produce the McKay Thompson series as 2 + 1 dimensional gravity partition functions by a regularized sum over global torus-isogeny geometries.
16. In characteristic " p ", an isogeny of degree " p " of abelian varieties must, for their function fields, give either an Artin Schreier extension or a purely inseparable extension.
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