Hironaka decomposition

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In mathematics, a Hironaka decomposition is a representation of an algebra over a field as a finitely generated free module over a polynomial subalgebra or a regular local ring. Such decompositions are named after Heisuke Hironaka, who used this in his unpublished master's thesis at Kyoto University (Nagata 1962, p.217).

Hironaka's criterion (Nagata 1962, theorem 25.16), sometimes called miracle flatness, states that a local ring R that is a finitely generated module over a regular Noetherian local ring S is Cohen–Macaulay if and only if it is a free module over S. There is a similar result for rings that are graded over a field rather than local.

Explicit decomposition of an invariant algebra

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Let   be a finite-dimensional vector space over an algebraically closed field of characteristic zero,  , carrying a representation of a group  , and consider the polynomial algebra on  ,  . The algebra   carries a grading with  , which is inherited by the invariant subalgebra

 .

A famous result of invariant theory, which provided the answer to Hilbert's fourteenth problem, is that if   is a linearly reductive group and   is a rational representation of  , then   is finitely-generated. Another important result, due to Noether, is that any finitely-generated graded algebra   with   admits a (not necessarily unique) homogeneous system of parameters (HSOP). A HSOP (also termed primary invariants) is a set of homogeneous polynomials,  , which satisfy two properties:

  1. The   are algebraically independent.
  2. The zero set of the  ,  , coincides with the nullcone (link) of  .

Importantly, this implies that the algebra can then be expressed as a finitely-generated module over the subalgebra generated by the HSOP,  . In particular, one may write

 ,

where the   are called secondary invariants.

Now if   is Cohen–Macaulay, which is the case if   is linearly reductive, then it is a free (and as already stated, finitely-generated) module over any HSOP. Thus, one in fact has a Hironaka decomposition

 .

In particular, each element in   can be written uniquely as 􏰐 , where  , and the product of any two secondaries is uniquely given by  , where  . This specifies the multiplication in   unambiguously.

See also

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References

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  • Nagata, Masayoshi (1962), Local rings, Interscience Tracts in Pure and Applied Mathematics, vol. 13, New York-London: Interscience Publishers a division of John Wiley & Sons, ISBN 0-88275-228-6, MR 0155856
  • Sturmfels, Bernd; White, Neil (1991), "Computing combinatorial decompositions of rings", Combinatorica, 11 (3): 275–293, doi:10.1007/BF01205079, MR 1122013