K = markovBases A
L = markovBases(A, R)
This method produces all minimal Markov bases of a given configuration matrix $A \in \ZZ^{d \times n}$. By default, the output is formatted in the same way as toricMarkov: each Markov basis is a $k \times n$ matrix whose rows correspond to the elements of the Markov basis.
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Similarly to toricMarkov, we may also specify a ring $R$. In this case, the method produces a list of ideals in $R$ with each ideal generated by a different minimal Markov basis of $A$.
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The object markovBases is a method function.
The source of this document is in /build/reproducible-path/macaulay2-1.25.06+ds/M2/Macaulay2/packages/AllMarkovBases.m2:871:0.