Metamath Proof Explorer


Theorem 2zrng

Description: The ring of integers restricted to the even integers is a (non-unital) ring, the "ring of even integers". Remark: the structure of the complementary subset of the set of integers, the odd integers, is not even a magma, see oddinmgm . (Contributed by AV, 20-Feb-2020)

Ref Expression
Hypotheses 2zrng.e E = z | x z = 2 x
2zlidl.u U = LIdeal ring
2zrng.r R = ring 𝑠 E
Assertion 2zrng R Rng

Proof

Step Hyp Ref Expression
1 2zrng.e E = z | x z = 2 x
2 2zlidl.u U = LIdeal ring
3 2zrng.r R = ring 𝑠 E
4 zringring ring Ring
5 1 2 2zlidl E U
6 2 3 lidlrng ring Ring E U R Rng
7 4 5 6 mp2an R Rng