Abstract Let $V$ be a valuation ring such that $\mathrm{dim}(V)=0$ and the annihilator of each element in $V$ is finitely generated.
In this paper it is proved that if $I$ is a finitely generated ideal in the polynomial ring $V[X]$, then there is a Gröbner basis for $I$.
Also, an example of a zero-dimensional non-Noetherian valuation ring $R_M$ is presented, together with an example of finding a Gröbner basis for a certain ideal in a polynomial ring $R_M[X]$.
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