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Tight closure

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In mathematics, in the area of commutative algebra, tight closure is an operation defined on ideals in positive characteristic. It was introduced by Melvin Hochster and Craig Huneke (1988, 1990).

Let R {\displaystyle R} be a commutative noetherian ring containing a field of characteristic p > 0 {\displaystyle p>0} . Hence p {\displaystyle p} is a prime number.

Let I {\displaystyle I} be an ideal of R {\displaystyle R} . The tight closure of I {\displaystyle I} , denoted by I {\displaystyle I^{*}} , is another ideal of R {\displaystyle R} containing I {\displaystyle I} . The ideal I {\displaystyle I^{*}} is defined as follows.

z I {\displaystyle z\in I^{*}} if and only if there exists a c R {\displaystyle c\in R} , where c {\displaystyle c} is not contained in any minimal prime ideal of R {\displaystyle R} , such that c z p e I [ p e ] {\displaystyle cz^{p^{e}}\in I^{}} for all e 0 {\displaystyle e\gg 0} . If R {\displaystyle R} is reduced, then one can instead consider all e > 0 {\displaystyle e>0} .

Here I [ p e ] {\displaystyle I^{}} is used to denote the ideal of R {\displaystyle R} generated by the p e {\displaystyle p^{e}} 'th powers of elements of I {\displaystyle I} , called the e {\displaystyle e} th Frobenius power of I {\displaystyle I} .

An ideal is called tightly closed if I = I {\displaystyle I=I^{*}} . A ring in which all ideals are tightly closed is called weakly F {\displaystyle F} -regular (for Frobenius regular). A previous major open question in tight closure is whether the operation of tight closure commutes with localization, and so there is the additional notion of F {\displaystyle F} -regular, which says that all ideals of the ring are still tightly closed in localizations of the ring.

Brenner & Monsky (2010) found a counterexample to the localization property of tight closure. However, there is still an open question of whether every weakly F {\displaystyle F} -regular ring is F {\displaystyle F} -regular. That is, if every ideal in a ring is tightly closed, is it true that every ideal in every localization of that ring is also tightly closed?

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