
<p>A central arrangement $ \cal{A} $ was termed free if the module of $ \cal{A} $-derivations was a free module. The combinatorial structure of arrangements was heavily influenced by the freeness. Yet, there has been scarce exploration into the construction of their bases. In this paper, we constructed the explicit bases for a class of free arrangements that positioned between the cone of Linial arrangements and Shi arrangements.</p>
shi arrangement, subarrangement, free arrangement, QA1-939, bernoulli polynomial, hyperplane arrangement, Mathematics
shi arrangement, subarrangement, free arrangement, QA1-939, bernoulli polynomial, hyperplane arrangement, Mathematics
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