单元 k 限制无穷周波

Amartya Shekhar Dubey, Yu Leon Liu
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引用次数: 0

摘要

我们通过其算术限制来研究单元$\infty$-operads。给定 $k \geq1$,我们建立了一个单整$k$受限$infty$-operads的模型,它是只有$(\leq k)$极性态的$infty$-operads的变体,是封闭的$k$树枝状树上的完整的Segal预分支,而封闭的树枝状树是由具有$\leq k$价的冠词建立的。此外,我们通过证明左和右坎扩展保留了完整的西格尔对象,证明了从独元$\infty$-operads到独元$k$-restricted$\infty$-operads的限制函数允许完全忠实的左和右邻接。随着 $k$ 的变化,左邻接和右邻接给出了由 $k$ 限制$infty$-operads 对任何单元$infty$-operads 的过滤和共滤。
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Unital k-Restricted Infinity-Operads
We study unital $\infty$-operads by their arity restrictions. Given $k \geq 1$, we develop a model for unital $k$-restricted $\infty$-operads, which are variants of $\infty$-operads which has only $(\leq k)$-arity morphisms, as complete Segal presheaves on closed $k$-dendroidal trees, which are closed trees build from corollas with valences $\leq k$. Furthermore, we prove that the restriction functors from unital $\infty$-operads to unital $k$-restricted $\infty$-operads admit fully faithful left and right adjoints by showing that the left and right Kan extensions preserve complete Segal objects. Varying $k$, the left and right adjoints give a filtration and a co-filtration for any unital $\infty$-operads by $k$-restricted $\infty$-operads.
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