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Publisher
Springer, London
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Authors: Siegfried Bosch
Publish Date: 2013
Volume: , Issue: , Pages: 103-156
Abstract
The main theme is to discuss the process of coefficient extension for modules and its reverse descent For example consider a module M over a ring R and let R⟶R′ be an extension of rings Then extending coefficients from R to R′ on M means that one passes from M to the tensor product M⊗ R R′ viewed as an R′module The chapter starts with the construction of tensor products of general type for modules and their morphisms Special attention is payed to socalled flat and even faithfully flat extensions These are particularly well adapted to the formation of kernels cokernels and images of module morphisms under the process of coefficient extension The next step is to look at module properties that are maintained under coefficient extension or descent For this to work well the extension R⟶R′ is assumed to be flat and even faithfully flat in the descent case Finally Grothendieck’s descent theory is studied for modules and their morphisms
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