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In [[mathematics]] '''Geometric invariant theory''' (or '''GIT''') is a method for constructing quotients by [[group action]]s in [[algebraic geometry]], used to construct [[moduli space]]s. It was developed by [[David Mumford]] in  1965, using ideas from the paper {{harv|Hilbert|1893}}  in  classical [[invariant theory]].


Geometric invariant theory studies an [[group action|action of a group]] ''G'' on an [[algebraic variety]] (or [[scheme (mathematics)|scheme]])  ''X'' and  provides techniques for forming the 'quotient' of ''X'' by ''G'' as a scheme with reasonable properties. One motivation was to construct [[moduli space]]s in [[algebraic geometry]] as quotients of schemes parametrizing marked objects. In the 1970s and 1980s the theory developed
interactions with [[symplectic geometry]] and equivariant topology, and was used to construct  moduli spaces of objects in [[differential geometry]], such as [[instanton]]s and [[monopole (mathematics)|monopoles]].


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{{main|Invariant theory}}
Invariant theory is concerned with a [[group action]] of a [[group (mathematics)|group]] ''G'' on an [[algebraic variety]] (or a [[scheme (mathematics)|scheme]]) ''X''. Classical invariant theory addresses the situation when ''X''&nbsp;=&nbsp;''V'' is a [[vector space]] and ''G'' is either a finite group, or one of the [[classical Lie group]]s that acts linearly on ''V''. This action induces a linear action of ''G'' on the space of [[Ring of polynomial functions|polynomial functions]] ''R''(''V'') on ''V'' by the formula
 
: <math> g\cdot f(v)=f(g^{-1}v), \quad g\in G, v\in V.</math>
 
The polynomial [[invariant (mathematics)|invariant]]s of the ''G''-action on ''V'' are those polynomial functions ''f'' on ''V'' which are fixed under the 'change of variables' due to the action of the group, so that ''g''·''f''&nbsp;=&nbsp;''f'' for all ''g'' in ''G''. They form a commutative algebra ''A''&nbsp;=&nbsp;''R''(''V'')<sup>''G''</sup>, and this algebra is interpreted as the algebra of functions on the 'invariant theory quotient' ''V'' //''G''. In the language of modern [[algebraic geometry]],
 
: <math> V/\!\!/G=\operatorname{Spec} A=\operatorname{Spec} R(V)^G.</math>
 
Several difficulties emerge from this description. The first one, successfully tackled by Hilbert in the case of a [[general linear group]], is to prove that the algebra ''A'' is finitely generated. This is necessary if one wanted the quotient to be an [[affine algebraic variety]]. Whether a similar fact holds for arbitrary groups ''G'' was the subject of [[Hilbert's fourteenth problem]], and [[Masayoshi Nagata|Nagata]] demonstrated that the answer was negative in general. On the other hand, in the course of development of [[representation theory]] in the first half of the twentieth century, a large class of groups for which the answer is positive was identified; these are called [[reductive group]]s and include all finite groups and all classical groups.  
 
The finite generation of the algebra ''A'' is but the first step towards the complete description of ''A'', and the progress in resolving this more delicate question was rather modest. The invariants had classically been described only in a restricted range of situations, and the complexity of this description beyond the first few cases held out little hope for full understanding of the algebras of invariants in general. Furthermore, it may happen that all polynomial invariants ''f'' take the same value on a given pair of points ''u'' and ''v'' in ''V'', yet these points are in different [[orbit (group theory)|orbits]] of the ''G''-action. A simple example is provided by the multiplicative group '''C'''<sup>*</sup> of non-zero complex numbers that acts on an ''n''-dimensional complex vector space '''C'''<sup>''n''</sup> by scalar multiplication. In this case, every polynomial invariant is a constant, but there are many different orbits of the action. The zero vector forms an orbit by itself, and the non-zero multiples of any non-zero vector form an orbit, so that non-zero orbits are paramatrized by the points of the complex [[projective space]] '''CP'''<sup>''n''&minus;1</sup>. If this happens, one says that "invariants do not separate the orbits", and the algebra ''A'' reflects the topological [[quotient space]] ''X'' /''G'' rather imperfectly. Indeed, the latter space is frequently [[Hausdorff space|non-separated]]. In 1893 Hilbert formulated and proved a criterion for determining those orbits which are not separated from the zero orbit by invariant polynomials. Rather remarkably, unlike his earlier work in invariant theory, which led to the rapid development of [[abstract algebra]], this result of Hilbert remained little known and little used for the next 70 years. Much of the development of invariant theory in the first half of the twentieth century concerned explicit computations with invariants, and at any rate, followed the logic of algebra rather than geometry.
 
== Mumford's book ==
 
Geometric invariant theory was founded and developed by Mumford in a monograph, first published in 1965, that applied ideas of nineteenth century invariant theory, including some  results of [[David Hilbert|Hilbert]], to modern algebraic geometry questions. (The book was greatly expanded in two later editions, with extra appendices by Fogarty and Mumford, and a chapter on symplectic quotients by Kirwan.) The book uses both  [[scheme theory]] and  computational techniques available in examples.
<!--- Incorporate below
The theory has been very influential, and the technical concept of ''stability'' used has been basic in much later research, for example on moduli spaces of [[vector bundle]]s.
-->
The abstract setting used is that of a [[group action]] on a scheme ''X''.
The simple-minded idea of an [[orbit space]]
 
:''G''\''X'',
 
i.e. the [[quotient space]] of ''X'' by the group action, runs into difficulties in algebraic geometry, for reasons that are explicable in abstract terms. There is in fact no general reason why [[equivalence relation]]s should interact well with the (rather rigid) [[regular function]]s (polynomial functions), which are at the heart of algebraic geometry. The functions on the orbit space ''G''\''X'' that should be considered are those on ''X'' that are [[Invariant (mathematics)|invariant]] under the action of ''G''. The direct approach can be made, by means of the [[function field of an algebraic variety|function field]] of a variety (i.e. [[rational function]]s): take the [[G-invariant|''G''-invariant]] rational functions on it, as the function field of the [[quotient variety]]. Unfortunately this &mdash; the point of view of [[birational geometry]] &mdash; can only give a first approximation to the answer. As Mumford put it in the Preface to the book:
 
:''The problem is, within the set of all models of the resulting birational class, there is one model whose [[geometric point]]s classify the set of orbits in some action, or the set of algebraic objects in some moduli problem''.
 
In Chapter 5 he isolates further the specific technical problem addressed, in a [[moduli problem]] of quite classical type &mdash; classify the big 'set' of all algebraic varieties subject only to being [[non-singular]] (and a requisite condition on [[polarization of an algebraic variety|polarization]]). The moduli are supposed to describe the parameter space. For example for [[algebraic curve]]s it has been known from the time of [[Riemann]] that there should be [[connected space|connected component]]s of dimensions
 
:0, 1, 3, 6, 9, …
 
according to the [[genus (curve)|genus]] ''g''&nbsp;=0, 1, 2, 3, 4, …, and the moduli are functions on each component. In the [[coarse moduli problem]] Mumford considers the obstructions to be:
 
*non-separated topology on the moduli space (i.e. not enough parameters in good standing)
*infinitely many irreducible components (which isn't avoidable, but [[local finiteness]] may hold)
*failure of components to be representable as schemes, although respectable topologically.
 
It is the third point that motivated the whole theory. As Mumford puts it, if the first two difficulties are resolved
 
:[the third question] ''becomes essentially equivalent to the question of whether an orbit space of some [[locally closed]] subset of the [[Hilbert scheme|Hilbert]] or [[Chow scheme]]s by the [[projective group]] exists''.
 
To deal with this he introduced a notion (in fact three) of '''stability'''. This enabled him to open up the previously treacherous area &mdash; much had been written, in particular by [[Francesco Severi]], but the methods of the literature had limitations. The birational point of view can afford to be careless about subsets of [[codimension]] 1. To have a moduli space as a scheme is on one side a question about characterising schemes as [[representable functor]]s (as the [[Grothendieck]] school would see it); but geometrically it is more like a [[compactification (mathematics)|compactification]] question, as the stability criteria revealed. The restriction to non-singular varieties will not lead to a [[compact space]] in any sense as moduli space: varieties can degenerate to having singularities. On the other hand the points that would correspond to highly singular varieties are definitely too 'bad' to include in the answer. The correct middle ground, of points stable enough to be admitted, was isolated by Mumford's work. The concept was not entirely new, since certain aspects of it were to be found in [[David Hilbert]]'s final ideas on invariant theory, before he moved on to other fields.
 
The book's Preface also enunciated the [[haboush's theorem|Mumford conjecture]], later proved by [[William Haboush]].
<!-- Expand on this, but not just yet
In many contexts where both theories apply, geometric invariant theory quotients are equivalent to [[symplectic reduction]].
-->
 
==Stability== <!-- "Stable point" redirects here -->
{{Redirect-distinguish|Stable point|Stable fixed point}}
If a reductive group ''G'' acts linearly on a vector space ''V'', then a non-zero point  of ''V'' is called
*'''unstable''' if 0 is in the closure of its orbit,
*'''semi-stable''' if 0 is not in the closure of its orbit,
*'''stable''' if its orbit is closed, and its stabilizer is finite.
 
There are equivalent ways to state these (this criterion is known as the [[Hilbert–Mumford criterion]]):
*A non-zero point ''x'' is unstable if and only if there is a 1-parameter subgroup of ''G'' all of whose weights with respect to ''x'' are positive.
*A non-zero point ''x'' is unstable if and only if every invariant polynomial has the same value on 0 and ''x''.
*A non-zero point ''x'' is semistable if and only if there is no 1-parameter subgroup of ''G'' all of whose weights with respect to ''x'' are positive.
*A non-zero point ''x'' is semistable if and only if some invariant polynomial has different values on 0 and ''x''.
*A non-zero point ''x'' is stable if and only if every 1-parameter subgroup of ''G'' has positive (and negative) weights with respect to ''x''.
*A non-zero point ''x'' is stable if and only if for every ''y'' not in the orbit of ''x'' there is some invariant polynomial that has different values on ''y'' and ''x'', and the ring of invariant polynomials has transcendence degree  dim(''V'')&minus;dim(''G'').
 
A point of the corresponding projective space of ''V'' is called unstable, semi-stable, or stable if it is the
image of a point in ''V'' with the same property. "Unstable" is the opposite of "semistable" (not "stable"). The unstable points form a Zariski closed set of projective space, while the semistable and stable points both form Zariski open sets (possibly empty). These definitions are from {{harv|Mumford|1977}} and are not equivalent to the ones in the  first edition of Mumford's book.
 
Many moduli spaces can be constructed as the quotients of the space of stable points of some subset of projective space by some group action. These spaces can often by compactified by adding certain equivalence classes of semistable points. Different stable orbits correspond to different points in the quotient, but two different semistable orbits may correspond to the same point in the quotient if their closures intersect.  
Example: {{harv|Deligne|Mumford|1969}}
A '''[[stable curve]]''' is a reduced connected curve of genus ≥2 such that its only singularities are ordinary double points and every non-singular rational component meets the other components in at least 3 points. The moduli space of stable curves of genus ''g'' is the quotient of a subset of the [[Hilbert scheme]] of curves in '''P'''<sup>5''g''-6</sup> with Hilbert polynomial (6''n''&minus;1)(''g''&minus;1) by the group PGL<sub>5''g''&minus;5</sub>.
 
Example:
A vector bundle ''W'' over an [[algebraic curve]] (or over a [[Riemann surface]]) is a [[stable vector bundle]]
if and only if
 
:<math>\displaystyle\frac{\deg(V)}{\hbox{rank}(V)} < \frac{\deg(W)}{\hbox{rank}(W)}</math>
 
for all proper non-zero subbundles ''V'' of ''W''
and is semistable if this condition holds with < replaced by ≤.
 
==See also==
*[[Geometric complexity theory]]
*[[Geometric quotient]]
*[[Categorical quotient]]
 
== References ==
*{{Citation | last1=Deligne | first1=Pierre | author1-link=Pierre Deligne | last2=Mumford | first2=David | author2-link=David Mumford | title=The irreducibility of the space of curves of given genus | url=http://www.numdam.org/item?id=PMIHES_1969__36__75_0 | id={{MathSciNet | id = 0262240}} | year=1969 | journal=[[Publications Mathématiques de l'IHÉS]] | issue=36 | pages=75–109 | doi=10.1007/BF02684599 | volume=36}}
*{{citation|last=Hilbert|first=D.|title=Über die vollen Invariantensysteme|journal=Math. Annalen|volume=42|issue=3|page=313|year=1893|doi=10.1007/BF01444162}}
* Kirwan, Frances, ''Cohomology of quotients in symplectic and algebraic geometry''. Mathematical Notes, 31. Princeton University Press, Princeton, NJ, 1984. i+211 pp. {{MathSciNet|id=0766741}} ISBN 0-691-08370-3
* Kraft, Hanspeter, ''Geometrische Methoden in der Invariantentheorie''. (German) (Geometrical methods in invariant theory) Aspects of Mathematics, D1. Friedr. Vieweg & Sohn, Braunschweig, 1984. x+308 pp. {{MathSciNet|id=0768181}} ISBN 3-528-08525-8
*{{Citation | last1=Mumford | first1=David | author1-link=David Mumford | title=Stability of projective varieties | url=http://retro.seals.ch/digbib/view?rid=ensmat-001:1977:23::185 | id={{MathSciNet | id = 0450272}} | year=1977 | journal=L'Enseignement Mathématique. Revue Internationale. IIe Série | issn=0013-8584 | volume=23 | issue=1 | pages=39–110}}
*{{Citation | last1=Mumford | first1=David | author1-link=David Mumford | last2=Fogarty | first2=J. | last3=Kirwan | first3=F. | author3-link=Frances Kirwan | title=Geometric invariant theory | publisher=[[Springer-Verlag]] | location=Berlin, New York | edition=3rd | series=Ergebnisse der Mathematik und ihrer Grenzgebiete (2) [Results in Mathematics and Related Areas (2)] | isbn=978-3-540-56963-3 | id={{MathSciNet|id=0214602}}( 1st ed 1965) {{MathSciNet|id=0719371}} (2nd ed) {{MathSciNet | id = 1304906}}(3rd ed.) | year=1994 | volume=34}}
* [[Ernest Vinberg|E.B. Vinberg]], [[Vladimir L. Popov|V.L. Popov]], ''Invariant theory'', in ''Algebraic geometry''. IV. Encyclopaedia of Mathematical Sciences, 55 (translated from 1989 Russian edition) Springer-Verlag, Berlin, 1994. vi+284 pp.&nbsp;ISBN 3-540-54682-0
 
[[Category:Moduli theory]]
[[Category:Scheme theory]]
[[Category:Algebraic groups]]
[[Category:Invariant theory]]

Revision as of 11:47, 23 February 2014


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