Cheat Sheet: Finite Ring with Unique Zero Divisor

Given

R is a finite commutative ring with 1 ≠ 0, and exactly one nonzero zero divisor.

Goal

Show |R| = 4 and classify R.

Algorithm

1. Isolate element

Let x ≠ 0 be the unique zero divisor.

2. Force nilpotency

Since x is a zero divisor, ∃ y ≠ 0 with x·y = 0.
Then y is a zero divisor ⇒ y = x. Hence:

x² = 0

3. Control units

Let u ∈ R*. Then u·x ≠ 0 and

(u·x)·x = u·x² = 0 ⇒ u·x is a zero divisor

By uniqueness: u·x = x ⇒ (u−1)·x = 0.

4. Structure collapse

Elements are forced into:

R = {0, 1, x, 1+x} ⇒ |R| = 4

5. Classification

Since x² = 0 and x ≠ 0, R is a local ring of order 4:

R ≅ ℤ₄ or R ≅ 𝔽₂[X] / (X²)

Distinguish by characteristic:

char(R) = 2 ⇒ 𝔽₂[X] / (X²) char(R) = 4 ⇒ ℤ₄

Triggers