Difference between revisions of "User:Richard Pinch/sandbox-WP2"
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(Start article: u-invariant) |
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=Gowers norm= | =Gowers norm= | ||
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==References== | ==References== | ||
* {{User:Richard Pinch/sandbox/Ref | zbl=pre06110460 | last=Tao | first=Terence | authorlink=Terence Tao | title=Higher order Fourier analysis | series=Graduate Studies in Mathematics | volume=142 | location=Providence, RI | publisher=[[American Mathematical Society]] | year=2012 | isbn=978-0-8218-8986-2 | url=http://terrytao.wordpress.com/books/higher-order-fourier-analysis/ }} | * {{User:Richard Pinch/sandbox/Ref | zbl=pre06110460 | last=Tao | first=Terence | authorlink=Terence Tao | title=Higher order Fourier analysis | series=Graduate Studies in Mathematics | volume=142 | location=Providence, RI | publisher=[[American Mathematical Society]] | year=2012 | isbn=978-0-8218-8986-2 | url=http://terrytao.wordpress.com/books/higher-order-fourier-analysis/ }} | ||
+ | |||
+ | =''u''-invariant= | ||
+ | The '''universal invariant''' or '''''u'''''<nowiki></nowiki>'''-invariant''' of a [[field (mathematics)|field]] describes the structure of [[quadratic form]]s over the field. | ||
+ | |||
+ | The universal invariant ''u''(''F'') of a field ''F'' is the largest dimension of an [[anisotropic quadratic space]] over ''F'', or ∞ if this does not exist. Since [[formally real field]]s have anisotropic quadratic forms (sums of squares) in every dimension, the invariant is only of interest for other fields. An equivalent formulation is that ''u'' is the smallest number such that every form of dimension greater than ''u'' is [[Isotropic quadratic form|isotropic]], or that every form of dimension at least ''u'' is [[Universal quadratic form|universal]]. | ||
+ | |||
+ | ==Examples== | ||
+ | * For the complex numbers, ''u''('''C''') = 1. | ||
+ | * If ''F'' is [[Quadratically closed field|quadratically closed]] then ''u''(''F'') = 1. | ||
+ | * The function field of an [[algebraic curve]] over an [[algebraically closed field]] has ''u'' ≤ 2; this follows from [[Tsen's theorem]] that such a field is [[quasi-algebraically closed]].<ref name=Lam376>Lam (2005) p.376</ref> | ||
+ | * If ''F'' is a nonreal [[global field|global]] or [[local field]], or more generally a [[linked field]], then ''u''(''F'') = 1,2,4 or 8.<ref name=Lam406>Lam (2005) p.406</ref> | ||
+ | |||
+ | ==Properties== | ||
+ | * If ''F'' is not formally real then ''u''(''F'') is at most <math>q(F) = \left|{F^\star / F^{\star2}}\right|</math>, the index of the squares in the multiplicative group of ''F''.<ref name=Lam400>Lam (2005) p. 400</ref> | ||
+ | * Every even integer occurs as the value of ''u''(''F'') for some ''F''.<ref name=Lam402>Lam (2005) p. 402</ref> | ||
+ | * ''u''(''F'') cannot take the values 3, 5, or 7.<ref name=Lam401>Lam (2005) p. 401</ref> A field exists with ''u'' = 9.<ref>{{User:Richard Pinch/sandbox/Ref | title=Fields of u-Invariant 9 | first=Oleg T. | last=Izhboldin | journal=[[Annals of Mathematics]], 2 ser | volume=154 | number=3 | year=2001 | pages=529–587 | url=http://www.jstor.org/stable/3062141 | zbl=0998.11015 }}</ref> | ||
+ | |||
+ | ==The general ''u''-invariant== | ||
+ | Since the ''u''-invariant is of little interest in the case of formally real fields, we define a '''general''' '''''u'''''<nowiki></nowiki>'''-invariant''' to be the maximum dimension of an anisotropic form in the [[torsion subgroup]] of the [[Witt ring (forms)|Witt ring]] of '''F''', or ∞ if this does exist.<ref name=Lam409>Lam (2005) p. 409</ref> For non-formally real fields, the Witt ring is torsion, so this agrees with the previous definition.<ref name=Lam410>Lam (2005) p. 410</ref> For a formally real field, the general ''u''-invariant is either even or ∞. | ||
+ | |||
+ | ===Properties=== | ||
+ | * ''u''(''F'') ≤ 1 if and only if ''F'' is a [[Pythagorean field]].<ref name=Lam410/> | ||
+ | |||
+ | ==References== | ||
+ | <references/> | ||
+ | * {{User:Richard Pinch/sandbox/Ref | title=Introduction to Quadratic Forms over Fields | volume=67 | series=Graduate Studies in Mathematics | first=Tsit-Yuen | last=Lam | authorlink=Tsit Yuen Lam | publisher=American Mathematical Society | year=2005 | isbn=0-8218-1095-2 | zbl=1068.11023 | mr = 2104929 }} | ||
+ | * {{User:Richard Pinch/sandbox/Ref | title=Squares | volume=171 | series=London Mathematical Society Lecture Note Series | first=A. R. | last=Rajwade | publisher=[[Cambridge University Press]] | year=1993 | isbn=0-521-42668-5 | zbl=0785.11022 }} | ||
+ | |||
=Zimmert set= | =Zimmert set= | ||
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==Property== | ==Property== | ||
− | For all but a finite number of ''d'' we have ''z''(''d'') > 1: indeed this is true for all ''d'' > 10<sup>476</sup>.<ref name=MOS>{{ | + | For all but a finite number of ''d'' we have ''z''(''d'') > 1: indeed this is true for all ''d'' > 10<sup>476</sup>.<ref name=MOS>{{User:Richard Pinch/sandbox/Ref | url=http://journals.cambridge.org/action/displayAbstract?fromPage=online&aid=2095508 | doi=10.1017/S0305004100075101 | zbl=0758.20009 | last1=Mason | first1=A.W. | last2=Odoni | first2=R.W.K. | last3=Stothers | first3=W.W. | title=Almost all Bianchi groups have free, non-cyclic quotients | journal=Math. Proc. Camb. Philos. Soc. | volume=111 | number=1 | pages=1–6 | year=1992 }}</ref> |
==Application== | ==Application== | ||
− | Let Γ<sub>''d''</sub> denote the Bianchi group PSL(2,''O''<sub>''d''</sub>), where ''O''<sub>''d''</sub> is the [[ring of integers]] of. As a subgroup of PSL(2,'''C'''), there is an action of Γ<sub>''d''</sub> on hyperbolic 3-space ''H''<sub>3</sub>, with a [[fundamental domain]]. It is a theorem that there are only finitely many values of ''d'' for which Γ<sub>''d''</sub> can contain an [[arithmetic group|arithmetic subgroup]] ''G'' for which the quotient ''H''<sub>3</sub>/''G'' is a [[link complement]]. Zimmert sets are used to obtain results in this direction: ''z''(''d'') is a lower bound for the rank of the largest [[Free group|free]] [[Quotient group|quotient]] of Γ<sub>''d''</sub><ref>{{ | + | Let Γ<sub>''d''</sub> denote the Bianchi group PSL(2,''O''<sub>''d''</sub>), where ''O''<sub>''d''</sub> is the [[ring of integers]] of. As a subgroup of PSL(2,'''C'''), there is an action of Γ<sub>''d''</sub> on hyperbolic 3-space ''H''<sub>3</sub>, with a [[fundamental domain]]. It is a theorem that there are only finitely many values of ''d'' for which Γ<sub>''d''</sub> can contain an [[arithmetic group|arithmetic subgroup]] ''G'' for which the quotient ''H''<sub>3</sub>/''G'' is a [[link complement]]. Zimmert sets are used to obtain results in this direction: ''z''(''d'') is a lower bound for the rank of the largest [[Free group|free]] [[Quotient group|quotient]] of Γ<sub>''d''</sub><ref>{{User:Richard Pinch/sandbox/Ref | zbl=0254.10019 | last=Zimmert | first=R. | title=Zur SL<sub>2</sub> der ganzen Zahlen eines imaginär-quadratischen Zahlkörpers | journal=[[Inventiones mathematicae]] | volume=19 | year=1973 | pages=73–81 }}</ref> and so the result above implies that almost all Bianchi groups have non-[[Cyclic group|cyclic]] free quotients.<ref name=MOS/> |
==References== | ==References== | ||
<references/> | <references/> | ||
* {{User:Richard Pinch/sandbox/Ref | first1=Colin | last1=Maclachlan | first2=Alan W. | last2=Reid | title=The Arithmetic of Hyperbolic 3-Manifolds | series=[[Graduate Texts in Mathematics]] | publisher=[[Springer-Verlag]] | volume=219 | year=2003 | isbn=0-387-98386-4 | zbl=1025.57001 }} | * {{User:Richard Pinch/sandbox/Ref | first1=Colin | last1=Maclachlan | first2=Alan W. | last2=Reid | title=The Arithmetic of Hyperbolic 3-Manifolds | series=[[Graduate Texts in Mathematics]] | publisher=[[Springer-Verlag]] | volume=219 | year=2003 | isbn=0-387-98386-4 | zbl=1025.57001 }} |
Revision as of 17:22, 11 September 2013
Gowers norm
For the function field norm, see uniform norm; for uniformity in topology, see uniform space.
In mathematics, in the field of additive combinatorics, a Gowers norm or uniformity norm is a class of norm on functions on a finite group or group-like object which are used in the study of arithmetic progressions in the group. They are named after Timothy Gowers who introduced them in his work on Szemerédi's theorem.
Let f be a complex-valued function on a group G and let J denote complex conjugation. The Gowers d-norm is
\[ \Vert f \Vert_{U^d(g)} = \mathbf{E}_{x,h_1,\ldots,h_d \in G} \prod_{\omega_1,\ldots,\omega_d \in \{0,1\}} J^{\omega_1+\cdots+\omega_d} f\left({x + h_1\omega_1 + \cdots + h_d\omega_d}\right) \ . \]
The inverse conjecture for these norms is the statement that if f has L-infinity norm (uniform norm in the usual sense) equal to 1 then the Gowers s-norm is bounded above by 1, with equality if and only if f is of the form exp(2πi g) with g a polynomial of degree at most s. This can be interpreted as saying that the Gowers norm is controlled by polynomial phases.
The inverse conjecture holds for vector spaces over a finite field. However, for cyclic groups Z/N this is not so, and the class of polynomial phases has to be extended to control the norm.
References
- Tao, Terence; Higher order Fourier analysis, ser. Graduate Studies in Mathematics 142 (2012), American Mathematical Society, Zbl pre06110460URL: http://terrytao.wordpress.com/books/higher-order-fourier-analysis/] ISBN: 978-0-8218-8986-2
u-invariant
The universal invariant or u-invariant of a field describes the structure of quadratic forms over the field.
The universal invariant u(F) of a field F is the largest dimension of an anisotropic quadratic space over F, or ∞ if this does not exist. Since formally real fields have anisotropic quadratic forms (sums of squares) in every dimension, the invariant is only of interest for other fields. An equivalent formulation is that u is the smallest number such that every form of dimension greater than u is isotropic, or that every form of dimension at least u is universal.
Examples
- For the complex numbers, u(C) = 1.
- If F is quadratically closed then u(F) = 1.
- The function field of an algebraic curve over an algebraically closed field has u ≤ 2; this follows from Tsen's theorem that such a field is quasi-algebraically closed.[1]
- If F is a nonreal global or local field, or more generally a linked field, then u(F) = 1,2,4 or 8.[2]
Properties
- If F is not formally real then u(F) is at most \(q(F) = \left|{F^\star / F^{\star2}}\right|\), the index of the squares in the multiplicative group of F.[3]
- Every even integer occurs as the value of u(F) for some F.[4]
- u(F) cannot take the values 3, 5, or 7.[5] A field exists with u = 9.[6]
The general u-invariant
Since the u-invariant is of little interest in the case of formally real fields, we define a general u-invariant to be the maximum dimension of an anisotropic form in the torsion subgroup of the Witt ring of F, or ∞ if this does exist.[7] For non-formally real fields, the Witt ring is torsion, so this agrees with the previous definition.[8] For a formally real field, the general u-invariant is either even or ∞.
Properties
- u(F) ≤ 1 if and only if F is a Pythagorean field.[8]
References
- ↑ Lam (2005) p.376
- ↑ Lam (2005) p.406
- ↑ Lam (2005) p. 400
- ↑ Lam (2005) p. 402
- ↑ Lam (2005) p. 401
- ↑ Izhboldin, Oleg T.; Fields of u-Invariant 9, Annals of Mathematics, 2 ser, 154 no. 3 (2001), pp. 529–587, Zbl 0998.11015URL: http://www.jstor.org/stable/3062141]
- ↑ Lam (2005) p. 409
- ↑ 8.0 8.1 Lam (2005) p. 410
- Lam, Tsit-Yuen; Introduction to Quadratic Forms over Fields, ser. Graduate Studies in Mathematics 67 (2005), American Mathematical Society, Zbl 1068.11023 ISBN: 0-8218-1095-2
- Rajwade, A. R.; Squares, ser. London Mathematical Society Lecture Note Series 171 (1993), Cambridge University Press, Zbl 0785.11022 ISBN: 0-521-42668-5
Zimmert set
In mathematics, a Zimmert set is a set of positive integers associated with the structure of quotients of hyperbolic three-space by a Bianchi group.
Definition
Fix an integer d and let D be the discriminant of the imaginary quadratic field Q(√-d). The Zimmert set Z(d) is the set of positive integers n such that 4n2 < -D-3 and n ≠ 2; D is a quadratic non-residue of all odd primes in d; n is odd if D is not congruent to 5 modulo 8. The cardinality of Z(d) may be denoted by z(d).
Property
For all but a finite number of d we have z(d) > 1: indeed this is true for all d > 10476.[1]
Application
Let Γd denote the Bianchi group PSL(2,Od), where Od is the ring of integers of. As a subgroup of PSL(2,C), there is an action of Γd on hyperbolic 3-space H3, with a fundamental domain. It is a theorem that there are only finitely many values of d for which Γd can contain an arithmetic subgroup G for which the quotient H3/G is a link complement. Zimmert sets are used to obtain results in this direction: z(d) is a lower bound for the rank of the largest free quotient of Γd[2] and so the result above implies that almost all Bianchi groups have non-cyclic free quotients.[1]
References
- ↑ 1.0 1.1 Mason, A.W.; Odoni, R.W.K.; Stothers, W.W.; Almost all Bianchi groups have free, non-cyclic quotients, Math. Proc. Camb. Philos. Soc., 111 no. 1 (1992), pp. 1–6, Zbl 0758.20009, DOI: 10.1017/S0305004100075101URL: http://journals.cambridge.org/action/displayAbstract?fromPage=online&aid=2095508]
- ↑ Zimmert, R.; Zur SL2 der ganzen Zahlen eines imaginär-quadratischen Zahlkörpers, Inventiones mathematicae, 19 (1973), pp. 73–81, Zbl 0254.10019
- Maclachlan, Colin; Reid, Alan W.; The Arithmetic of Hyperbolic 3-Manifolds, ser. Graduate Texts in Mathematics 219 (2003), Springer-Verlag, Zbl 1025.57001 ISBN: 0-387-98386-4
Richard Pinch/sandbox-WP2. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Richard_Pinch/sandbox-WP2&oldid=30525