here.
... (Ann M )p = Ann(Mp ) for any prime ideal p. If p ⊇ Ann M , then pAp ⊇ (Ann M )p = Ann(Mp ), hence Ann(Mp ) 6= Ap , and therefore Mp 6= 0. (Alternatively: Assume M is finitely generated, say by m1 , . . . , mn . Suppose p ⊂ A is a prime ideal such that Mp = 0. Then there are elements s1 , . . . , sn ...
... (Ann M )p = Ann(Mp ) for any prime ideal p. If p ⊇ Ann M , then pAp ⊇ (Ann M )p = Ann(Mp ), hence Ann(Mp ) 6= Ap , and therefore Mp 6= 0. (Alternatively: Assume M is finitely generated, say by m1 , . . . , mn . Suppose p ⊂ A is a prime ideal such that Mp = 0. Then there are elements s1 , . . . , sn ...
Evelyn Haley - Stony Brook Mathematics
... **A commutative ring such that the subset of nonzero elements forms a group under multiplication is called a field. In a field we have 1≠0 and a field has no divisors of zero.** 1 Let us note here that it is sometimes written that in a field there exists a multiplicative identity, 1≠ 0 that is not t ...
... **A commutative ring such that the subset of nonzero elements forms a group under multiplication is called a field. In a field we have 1≠0 and a field has no divisors of zero.** 1 Let us note here that it is sometimes written that in a field there exists a multiplicative identity, 1≠ 0 that is not t ...
