complete intersection造句
例句与造句
- or ultimately that R = T, indicating a complete intersection.
- This is the algebraic analogue of the geometric notion of a complete intersection.
- The Hodge numbers of complex smooth complete intersections were worked out by Kunihiko Kodaira.
- In general abelian varieties are not complete intersections.
- If there is only one component the polynomials define a surface, which is a complete intersection.
- It's difficult to find complete intersection in a sentence. 用complete intersection造句挺难的
- There is also a recursive characterization of local complete intersection rings that can be used as a definition, as follows.
- Mazur defined a morphism to be "'syntomic "'if it is flat and locally a complete intersection.
- A local complete intersection ring is a completion is the quotient of a regular local ring by an ideal generated by a regular sequence.
- If \ operatorname { Spec } B is regularly embedded into a regular scheme, then " B " is a complete intersection ring.
- A complete intersection has a " multidegree ", written as the tuple ( properly though a multiset ) of the degrees of defining hypersurfaces.
- If there is complete intersection, i . e . all Portuguese are also in the Brazilian group, the lower bound is 83.11 %.
- The second deviation ? 2 vanishes exactly when the ring " R " is a complete intersection ring, in which case all the higher deviations vanish.
- Its degree is 3, so to be an ideal-theoretic complete intersection it would have to be the intersection of two surfaces of degrees 1 and 3, by the hypersurface B閦out theorem.
- In general, essentially the same argument applies using a more general version of the Clifford inequality for local complete intersections with a dualising line bundle and 1-dimensional sections in the trivial line bundle.
- More refined information is available, for larger values of " g ", but in these cases canonical curves are not generally complete intersections, and the description requires more consideration of commutative algebra.
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