Tensor product of Ralgebras

From Exampleproblems

In mathematics, there is a construction in abstract algebra of the tensor product of commutative rings; which puts a ring structure on the tensor product as abelian groups of two commutative rings R and S. This structure on

R $\otimes$ _ZS

then makes it a coproduct in the category of commutative rings.

More generally, if R is a commutative ring and A and B are commutative R-algebras, we can make

A $\otimes$ _RB

into a commutative R-algebra by the same formula, getting a coproduct in the same way: the previous construction being the case R = Z. We observe the multilinear nature of the product

a $\otimes$ b.c $\otimes$ d = ac $\otimes$ bd,

to have a well-defined product on A $\otimes$ _RB; the ring axioms and R-linearity can be checked too.

This construction is of constant use in algebraic geometry: working in the opposite category to that of commutative R-algebras, it provides pullbacks of affine schemes, otherwise known as fiber products.

Tensor product of Ralgebras

From Exampleproblems

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