If the projective dimension of an $R$-module $M$ is finite, then can we say that projective dimension of tensor product $M\otimes M$ (as an $R\otimes R$-module) is finite?
Projective dimension of tensor product $M\otimes M$
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abstract-algebra
algebraic-geometry
commutative-algebra
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0regarded as a module over $R\otimes R$ if $M$ is an $R$-module or do you have extra properties? – 2012-08-29
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0yes, regarded as a module over R⊗R if M is an R -module – 2012-08-29
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0Is it true generally? If M is projective or flat module it is true. – 2012-08-29
1 Answers
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This is called Künneth formula and depends on the ring over which you are tensoring your modules, see e.g. https://www.encyclopediaofmath.org/index.php/K%C3%BCnneth_formula