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Let $k$ be an algebraically closed field and $A$ a finite-dimensional, basic, connected $k$-algebra. Then $A$ is Morita-equivalent to a quotient of a path algebra $kQ/I$ and $I$ is an admissible ideal.

I have the following question:

Is there an algorithmic / computational method (maybe already implemented in a CAS(?)), that is able to compute a basis of $I=$ ker $\varphi$ in terms of paths of the quiver of the algebra $A$?

Thank you very much.

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