A somewhat gentle introduction to differential graded commutative
... = R by [38, Fact 1.14]. Here is a sketch of the proof. The isomorphism HomR (C,C) ∼ = R implies that SuppR (C) = Spec(R) and AssR (C) = AssR (R). In particular, an element x ∈ m is C-regular if and only if it is R-regular. If x is R-regular, it follows that C/xC is semidualizing over R/xR. By induct ...
... = R by [38, Fact 1.14]. Here is a sketch of the proof. The isomorphism HomR (C,C) ∼ = R implies that SuppR (C) = Spec(R) and AssR (C) = AssR (R). In particular, an element x ∈ m is C-regular if and only if it is R-regular. If x is R-regular, it follows that C/xC is semidualizing over R/xR. By induct ...
MULTIPLICATION RESOURcES STAGE 1 VOCABULARY Groups of
... 124 books were sold. Each book cost £6. 124 is split into (or partitioned) into parts (100, 20, 4) and each of these is multiplied by 6. The three answers are then added together. ...
... 124 books were sold. Each book cost £6. 124 is split into (or partitioned) into parts (100, 20, 4) and each of these is multiplied by 6. The three answers are then added together. ...
ON ∗-AUTONOMOUS CATEGORIES OF TOPOLOGICAL
... topologically into a power of R, with R topologized discretely. Among other things, this implies that the topology is generated by (translates of) the open submodules. An ideal I ⊆ R is called large if its intersection with every non-zero ideal is non-zero. An obvious Zorn’s lemma argument shows tha ...
... topologically into a power of R, with R topologized discretely. Among other things, this implies that the topology is generated by (translates of) the open submodules. An ideal I ⊆ R is called large if its intersection with every non-zero ideal is non-zero. An obvious Zorn’s lemma argument shows tha ...
