Is $\mathbb Z[\sqrt{-3}]$ Euclidean under some other norm?

It isn't possible. If it were, then $\mathbb{Z}[\sqrt{-3}]$ would be a Unique Factorization Domain. But $$4=(2)(2)=(1-\sqrt{-3})(1+\sqrt{-3}),$$ and $2$ and $1\pm\sqrt{-3}$ are non-associate irreducibles.

Alternately, $2$ is irreducible in our ring. But $2$ is not prime, since $2$ divides the product $(1-\sqrt{-3})(1+\sqrt{-3})$, but $2$ divides neither $1-\sqrt{-3}$ nor $1+\sqrt{-3}$.

How many length n binary numbers have no consecutive zeroes ?Why we get a Fibonacci pattern? [duplicate]

Find the inverse of a submatrix of a given matrix

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Do these matrix rings have non-zero elements that are neither units nor zero divisors?

When is $G \ast H$ solvable?

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Prove that the sum of digits of $(999...9)^{3}$ (cube of integer with $n$ digits $9$) is $18n$

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When is a group isomorphic to the infinite cyclic group?