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In [[mathematics]], the '''Todd class''' is a certain construction now considered a part of the theory in [[algebraic topology]] of [[characteristic class]]es. The Todd class of a [[vector bundle]] can be defined by means of the theory of [[Chern class]]es, and is encountered where Chern classes exist — most notably in [[differential topology]], the theory of [[complex manifold]]s and [[algebraic geometry]]. In rough terms, a Todd class acts like a reciprocal of a Chern class, or stands in relation to it as a [[conormal bundle]] does to a [[normal bundle]]. | |||
The Todd class plays a fundamental role in generalising the classical [[Riemann-Roch theorem]] to higher dimensions, in the [[Hirzebruch-Riemann-Roch theorem]] and [[Grothendieck-Hirzebruch-Riemann-Roch theorem]]. | |||
== History == | |||
It is named for [[J. A. Todd]], who introduced a special case of the concept in algebraic geometry in 1937, before the Chern classes were defined. The geometric idea involved is sometimes called the '''Todd-Eger class'''. | |||
The general definition in higher dimensions is due to [[Hirzebruch]]. | |||
== Definition == | |||
To define the Todd class ''td''(''E'') where ''E'' is a complex vector bundle on a [[topological space]] ''X'', it is usually possible to limit the definition to the case of a [[Whitney sum]] of [[line bundle]]s, by means of a general device of characteristic class theory, the use of [[Chern roots]] (aka, the [[splitting principle]]). For the definition, let | |||
::<math> Q(x) = \frac{x}{1 - e^{-x}}=\sum_{i=0}^\infty \frac{(-1)^iB_{i}}{i!}x^{i} = 1 +x/2+x^2/12-x^4/720+\cdots</math> | |||
be the [[formal power series]] with the property that the coefficient of ''x''<sup>''n''</sup> in ''Q''(''x'')<sup>''n''+1</sup> is 1 (where the ''B''<sub>''i''</sub> are [[Bernoulli number]]s). Consider the coefficient of ''x''<sup>''j''</sup> in the product | |||
:<math> \prod_{i=1}^m Q(\beta_i x) \ </math> | |||
for any ''m'' > ''j''. This is symmetric in the β<sub>''i''</sub> and homogeneous of weight ''j'': so can be expressed as a polynomial ''td''<sub>''j''</sub>(''p''<sub>1</sub>,...''p''<sub>''j''</sub>) in the [[elementary symmetric function]]s ''p'' of the β. Then ''td''<sub>''j''</sub> defines the '''Todd polynomials''': they form a [[multiplicative sequence]] with ''Q'' as characteristic power series. | |||
If ''E'' has the α<sub>''i''</sub> as its [[Chern roots]], then the '''Todd class''' | |||
:<math>td(E) = \prod Q(\alpha_i)</math> | |||
which is to be computed in the [[cohomology ring]] of ''X'' (or in its completion if one wants to consider infinite dimensional manifolds). | |||
The Todd class can be given explicitly as a formal power series in the Chern classes as follows: | |||
:''td''(''E'') = 1 + ''c''<sub>1</sub>/2 + (''c''<sub>1</sub><sup>2</sup>+''c''<sub>2</sub>)/12 + ''c''<sub>1</sub>''c''<sub>2</sub>/24 + (−''c''<sub>1</sub><sup>4</sup> + 4''c''<sub>1</sub><sup>2</sup>''c''<sub>2</sub> + ''c''<sub>1</sub>''c''<sub>3</sub> + 3''c''<sub>2</sub><sup>2</sup> − ''c''<sub>4</sub>)/720 + ... | |||
where the cohomology classes ''c''<sub>''i''</sub> are the Chern classes of ''E'', and lie in the cohomology group H<sup>2''i''</sup>(''X''). If ''X'' is finite dimensional then most terms vanish and ''td''(''E'') is a polynomial in the Chern classes. | |||
==Properties of Todd class== | |||
The Todd class is multiplicative: | |||
<math>Td^*(E\oplus F) = Td^*(E)\cdot Td^*(F)</math> | |||
From the Euler exact sequence for the tangent bundle of <math> {\Bbb C} P^n</math> | |||
:: <math> 0 \to {\mathcal O} \to {\mathcal O}(1)^{n+1} \to T {\Bbb C} P^n \to 0</math> | |||
and multiplicativity, one obtains | |||
:: <math> Td^*(T {\Bbb C} P^n) = (\xi/(1-e^{-\xi}))^{n+1},</math> | |||
where <math>\xi \in H^2({\Bbb C} P^n)</math> is the fundamental class of the hyperplane section.<ref>[http://math.stanford.edu/~vakil/245/245class18.pdf INTERSECTION THEORY CLASS 18], by [[Ravi Vakil]]</ref> | |||
==Hirzebruch-Riemann-Roch formula== | |||
{{Main|Hirzebruch–Riemann–Roch theorem}} | |||
For any [[coherent sheaf]] ''F'' on a smooth | |||
projective [[complex manifold]] ''M'', one has | |||
::<math>\chi(F)=\int_M Ch^*(F) \wedge Td^*(TM),</math> | |||
where <math>\chi(F)</math> is its [[holomorphic Euler characteristic]], | |||
::<math>\chi(F):= \sum_{i=0}^{dim_{\mathbb{C}} M} (-1)^i dim_{\mathbb{C}} H^i(F),</math> | |||
and ''Ch<sup>*</sup>(F)'' its [[Chern character]]. | |||
==See also== | |||
[[Genus of a multiplicative sequence]] | |||
==Notes== | |||
<references/> | |||
==References== | |||
*{{Citation | last1=Todd | first1=J. A. | title=The Arithmetical Invariants of Algebraic Loci | doi=10.1112/plms/s2-43.3.190 | zbl=0017.18504 | year=1937 | journal=Proc. London Math. Soc. | volume=43 | issue=1 | pages=190–225}} | |||
*F. Hirzebruch, ''Topological methods in algebraic geometry'', Springer (1978) | |||
*{{springer|id=T/t092930|title=Todd class|author=M.I. Voitsekhovskii}} | |||
[[Category:Characteristic classes]] |
Latest revision as of 09:24, 20 November 2013
In mathematics, the Todd class is a certain construction now considered a part of the theory in algebraic topology of characteristic classes. The Todd class of a vector bundle can be defined by means of the theory of Chern classes, and is encountered where Chern classes exist — most notably in differential topology, the theory of complex manifolds and algebraic geometry. In rough terms, a Todd class acts like a reciprocal of a Chern class, or stands in relation to it as a conormal bundle does to a normal bundle.
The Todd class plays a fundamental role in generalising the classical Riemann-Roch theorem to higher dimensions, in the Hirzebruch-Riemann-Roch theorem and Grothendieck-Hirzebruch-Riemann-Roch theorem.
History
It is named for J. A. Todd, who introduced a special case of the concept in algebraic geometry in 1937, before the Chern classes were defined. The geometric idea involved is sometimes called the Todd-Eger class. The general definition in higher dimensions is due to Hirzebruch.
Definition
To define the Todd class td(E) where E is a complex vector bundle on a topological space X, it is usually possible to limit the definition to the case of a Whitney sum of line bundles, by means of a general device of characteristic class theory, the use of Chern roots (aka, the splitting principle). For the definition, let
be the formal power series with the property that the coefficient of xn in Q(x)n+1 is 1 (where the Bi are Bernoulli numbers). Consider the coefficient of xj in the product
for any m > j. This is symmetric in the βi and homogeneous of weight j: so can be expressed as a polynomial tdj(p1,...pj) in the elementary symmetric functions p of the β. Then tdj defines the Todd polynomials: they form a multiplicative sequence with Q as characteristic power series.
If E has the αi as its Chern roots, then the Todd class
which is to be computed in the cohomology ring of X (or in its completion if one wants to consider infinite dimensional manifolds).
The Todd class can be given explicitly as a formal power series in the Chern classes as follows:
- td(E) = 1 + c1/2 + (c12+c2)/12 + c1c2/24 + (−c14 + 4c12c2 + c1c3 + 3c22 − c4)/720 + ...
where the cohomology classes ci are the Chern classes of E, and lie in the cohomology group H2i(X). If X is finite dimensional then most terms vanish and td(E) is a polynomial in the Chern classes.
Properties of Todd class
The Todd class is multiplicative:
From the Euler exact sequence for the tangent bundle of
and multiplicativity, one obtains
where is the fundamental class of the hyperplane section.[1]
Hirzebruch-Riemann-Roch formula
Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. For any coherent sheaf F on a smooth projective complex manifold M, one has
where is its holomorphic Euler characteristic,
and Ch*(F) its Chern character.
See also
Genus of a multiplicative sequence
Notes
References
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