For the Supposition of KARCEVSKIJ Sergej
Meaning Minimum of Language
Ocotober 5, 2011
[Preparation]
,
is graded ring and integral domain.
For negative e, .
R's quotient field element is called homogenious when R's quotient field element is ratio f/g of homogenious element .
Its degree is defined by .
<Definition>
At R's quotient field, subfield made by degree 0's whole homogenious elements,
,
is expressed by .
For homogenious element ,
subring of field ,
,
is expressed by .
For graded ring,
,
algebraic variety that is quotient field that whole for homogenious element is gotten by gluing in common quotient field is expressed by Proj R.
Proj R of graded ring
,
,
is called projective algebraic variety.
<Conposition>
Projective algebraic variety is complete.
◊
<System>
Moduli of hypersurface,
,
is complete algebraic variety.
◊
,
is sum set of,
, .
◊
[Interpretation]
Word is expressed by,
.
Meaning minimum of word is expressed by,
, .
For meaning minimum,
refer to the next.
[References]
This paper has been published by Sekinan Research Field of Language.
© 2011 by The Sekinan Research Field of Language
© 2011 by The Sekinan Research Field of Language
No comments:
Post a Comment