atomless造句

例句与造句

1. The Cantor function can also be seen as the atomless.
2. This example is also a countably infinite atomless Boolean algebra.
3. Dean W . Zimmerman defends the possibility of atomless gunk ( 1996b ).
4. Example 5 resembles Example 4 in being countable, but differs in being atomless.
5. More generally the spaces with an atomless, finite measure and are not locally convex.
6. It's difficult to find atomless in a sentence. 用atomless造句挺难的
7. Up to isomorphism, this is the only nontrivial Boolean algebra that is both countable and atomless.
8. Any mereotopology can be made atomless by invoking "'C4 "', without risking paradox or triviality.
9. In these, any statement is assigned a truth value from some complete atomless Boolean algebra, rather than just a true / false value.
10. It can be shown that all countably infinite atomless Boolean algebras are isomorphic, that is, up to isomorphism there is only one such algebra.
11. This example has the same atoms and coatoms as Example 4, whence it is not atomless and therefore not isomorphic to Example 5 / 6.
12. Simples are to be contrasted with atomless gunk ( where something is " gunky " if it is such that every proper part has a further proper part ).
13. If there are no extended simples, the only remaining options would material objects being made of unextended simples ( objects that have a space-time extension of 0 ) or atomless gunk.
14. However it contains an infinite atomless subalgebra, namely Example 5, and so is not isomorphic to Example 4, every subalgebra of which must be a Boolean algebra of finite sets and their complements and therefore atomic.
15. The direct product of a Periodic Sequence ( Example 5 ) with any finite but nontrivial Boolean algebra . ( The trivial one-element Boolean algebra is the unique finite atomless Boolean algebra . ) This resembles Example 7 in having both atoms and an atomless subalgebra, but differs in having only finitely many atoms.
16. The direct product of a Periodic Sequence ( Example 5 ) with any finite but nontrivial Boolean algebra . ( The trivial one-element Boolean algebra is the unique finite atomless Boolean algebra . ) This resembles Example 7 in having both atoms and an atomless subalgebra, but differs in having only finitely many atoms.