Database BASIC ALGEBRAIC STRUCTURES Subring algebras and ideals Two-sided ideals and quotient rings qusring
Description: If S is a two-sided ideal in R , then U = R / S is a ring,
called the quotient ring of R by S . (Contributed by Mario
Carneiro , 14-Jun-2015)
Ref
Expression
Hypotheses
qusring.u ⊢ U = R / 𝑠 R ~ QG S
qusring.i ⊢ I = 2Ideal R
Assertion
qusring ⊢ R ∈ Ring ∧ S ∈ I → U ∈ Ring
Proof
Step
Hyp
Ref
Expression
1
qusring.u ⊢ U = R / 𝑠 R ~ QG S
2
qusring.i ⊢ I = 2Ideal R
3
eqid ⊢ 1 R = 1 R
4
1 2 3
qus1 ⊢ R ∈ Ring ∧ S ∈ I → U ∈ Ring ∧ 1 R R ~ QG S = 1 U
5
4
simpld ⊢ R ∈ Ring ∧ S ∈ I → U ∈ Ring