Let $I$ be a monomial ideal in the polynomial ring$S=\mathbb{K}[x_1,...,x_n]$. We study the Stanley depth of the integral closure$\bar{I}$ of $I$. We prove that for every integer $k\geq 1$, the inequalities${\rm sdepth} (S/\bar{I^k}) \leq {\rm sdepth} (S/\bar{I})$ and ${\rm sdepth}(\bar{I^k}) \leq {\rm sdepth} (\bar{I})$ hold. We also prove that for everymonomial ideal $I\subset S$ there exist integers $k_1,k_2\geq 1$, such that forevery $s\geq 1$, the inequalities ${\rm sdepth} (S/I^{sk_1}) \leq {\rm sdepth}(S/\bar{I})$ and ${\rm sdepth} (I^{sk_2}) \leq {\rm sdepth} (\bar{I})$ hold. Inparticular, $\min_k \{{\rm sdepth} (S/I^k)\} \leq {\rm sdepth} (S/\bar{I})$ and$\min_k \{{\rm sdepth} (I^k)\} \leq {\rm sdepth} (\bar{I})$. We conjecture thatfor every integrally closed monomial ideal $I$, the inequalities ${\rmsdepth}(S/I)\geq n-\ell(I)$ and ${\rm sdepth} (I)\geq n-\ell(I)+1$ hold, where$\ell(I)$ is the analytic spread of $I$. Assuming the conjecture is true, itfollows together with the Burch's inequality that Stanley's conjecture holdsfor $I^k$ and $S/I^k$ for $k\gg 0$, provided that $I$ is a normal ideal.
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机译:假设$ I $是多项式环$ S = \ mathbb {K} [x_1,...,x_n] $的一个单项式理想。我们研究了$ I $的整体闭包$ \ bar {I} $的Stanley深度。我们证明,对于每个整数$ k \ geq 1 $,不等式$ {\ rm sdepth}(S / \ bar {I ^ k})\ leq {\ rm sdepth}(S / \ bar {I})$ $ {\ rm sdepth}(\ bar {I ^ k})\ leq {\ rm sdepth}(\ bar {I})$ $。我们还证明,对于每个理想的理想$ I \ subset S $,存在整数$ k_1,k_2 \ geq 1 $,这样对于每个$ s \ geq 1 $,不等式$ {\ rm sdepth}(S / I ^ {sk_1 })\ leq {\ rm sdepth}(S / \ bar {I})$和$ {\ rm sdepth}(I ^ {sk_2})\ leq {\ rm sdepth}(\ bar {I})$保持。特别是$ \ min_k \ {{\ rm sdepth}(S / I ^ k)\} \ leq {\ rm sdepth}(S / \ bar {I})$和$ \ min_k \ {{\ rm sdepth}( I ^ k)\} \ leq {\ rm sdepth}(\ bar {I})$。我们猜想对于每个整体封闭的单项式理想$ I $,不等式$ {\ rmsdepth}(S / I)\ geq n- \ ell(I)$和$ {\ rm sdepth}(I)\ geq n- \ ell (I)+ 1 $ hold,其中$ \ ell(I)$是$ I $的分析价差。假设这个猜想是正确的,那么它将与伯奇不等式一起成立,斯坦利的猜想对于$ I ^ k $和$ S / I ^ k $对于$ k \ gg 0 $成立,只要$ I $是一个正常的理想。
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