Stanley decomposition

In commutative algebra, a Stanley decomposition is a way of writing a ring in terms of polynomial subrings. They were introduced by Richard Stanley (1982).

Suppose that a ring R is a quotient of a polynomial ring k[x₁,...] over a field by some ideal. A Stanley decomposition of R is a representation of R as a direct sum (of vector spaces)

${\displaystyle R=\underset{\alpha }{⨁}{x}_{\alpha }k(X_{\alpha })}$

where each x_α is a monomial and each X_α is a finite subset of the generators.

• Rees decomposition
• Hironaka decomposition

• Stanley, Richard P. (1982), "Linear Diophantine equations and local cohomology", Invent. Math. 68 (2): 175–193, doi:10.1007/bf01394054 
• Sturmfels, Bernd; White, Neil (1991), "Computing combinatorial decompositions of rings", Combinatorica 11 (3): 275–293, doi:10.1007/BF01205079 

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