Formal group laws and genera

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1 Introduction

The theory of formal group laws, originally appeared in algebraic geometry, has been brought into the bordism theory in the pioneering work [Novikov1967]. The applications of formal group laws in algebraic topology are closely connected with the Hirzebruch genera [Hirzebruch1966], one of the most important class of invariants of bordism classes of manifolds.

2 Elements of the theory of formal group laws

Let ${{Authors|Taras Panov}} == Introduction == The theory of formal group laws, originally appeared in algebraic geometry, has been brought into the [[Bordism|bordism theory]] in the pioneering work \cite{Novikov1967}. The applications of formal group laws in algebraic topology are closely connected with the Hirzebruch genera \cite{Hirzebruch1966}, one of the most important class of invariants of bordism classes of manifolds. == Elements of the theory of formal group laws == <wikitex>; Let $R$ be a commutative ring with unit. A formal power series $F(u,v)\in R[[u,v]]$ is called a (commutative one-dimensional) formal group law over $R$ if it satisfies the following equations: # $F(u,0)=u$, $F(0,v)=v$; # $F(F(u,v),w)=F(u,F(v,w))$; # $F(u,v)=F(v,u)$. The original example of a formal group law over a field $\mathbf k$ is provided by the expansion near the unit of the multiplication map $G\times G\to G$ in a one-dimensional algebraic group over $\mathbf k$. This also explains the terminology. A formal group law $F$ over $R$ is called linearisable if there exists a coordinate change $u\mapsto g_F(u)=u+\sum_{i>0}g_iu^i\in R[[u]]$ such that $$ g_F(F(u,v))=g_F(u)+g_F(v). $$ Note that every formal group law over $R$ determines a formal group law over $R\otimes\mathbb Q$. {{beginthm|Theorem}} Every formal group law $F$ is linearisable over $R\otimes\mathbb Q$. {{endthm}} ''Proof.'' Consider the series $\omega(u)=\frac{\partial F(u,w)}{\partial w}\Bigl|_{w=0}$. Then $$ \omega(F(u,v))=\frac{\partial F(F(u,v),w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(F(u,w),v)}{\partial F(u,w)}\cdot\frac{\partial F(u,w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(u,v)}{\partial u}\omega(u). $$ We therefore have $\frac{du}{\omega(u)}=\frac{dF(u,v)}{\omega(F(u,v))}$. Set $$ g(u)=\int_0^u\frac{dv}{\omega(v)}; $$ then $dg(u)=dg(F(u,v))$. This implies that $g(F(u,v))=g(u)+C$. Since $F(0,v)=v$ and $g(0)=0$, we get $C=g(v)$. Thus, $g(F(u,v))=g(u)+g(v)$. $\square$ A series $g(u)$ satisfying the equation $g(F(u,v))=g(u)+g(v)$ is called the logarithm of the formal group law $F$; the above Theorem shows that a formal group law over $R\otimes\mathbb Q$ always has a logarithm. Its functional inverse series $f(t)\in R\otimes\mathbb Q[[t]]$ is called the exponential of the formal group law, so that we have $F(u,v)=f(g(u)+g(v))$ over $R\otimes\mathbb Q$. If $R$ does not have torsion (i.e. $R\to R\otimes\mathbb Q$ is monic), the latter formula shows that a formal group law (as a series with coefficients in $R$) is fully determined by its logarithm (which is a series with coefficients in $R\otimes\mathbb Q$). Let $F=\sum_{k,l}a_{kl}u^kv^l$ be a formal group law over a ring $R$ and $r\colon R\to R'$ a ring homomorphism. Denote by $r(F)$ the formal series $\sum_{k,l}r(a_{kl})u^kv^l\in R'[[u,v]]$; then $r(F)$ is a formal group law over $R'$. A formal group law $F_U$ over a ring $A$ is universal if for any formal group law $F$ over any ring $R$ there exists a unique homomorphism $r\colon A\to R$ such that $F=r(F_U)$. {{beginthm|Proposition}} Assume that the universal formal group law $F_U$ over $A$ exists. Then # The ring $A$ is multiplicatively generated by the coefficients of the series $F_U$; # The universal formal group law is unique: if $F'_U$ is another universal formal group law over $A'$, then there is an isomorphism $r\colon A\to A'$ such that $F'_U=r(F_U)$. {{endthm}} Proof. To prove the first statement, denote by $A'$ the subring in $A$ generated by the coefficients of $F_U$. Then there is a monomorphism $i\colon A'\to A$ satisfying $i(F_U)=F_U$. On the other hand, by universality there exists a homomorphism $r\colon A\to A'$ satisfying $r(F_U)=F_U$. It follows that $ir(F_U)=F_U$. This implies that $ir=\mathrm{id}\colon A\to A$ by the uniqueness requirement in the definition of $F_U$. Thus $A'=A$. The second statement is proved similarly. $\square$ {{beginthm|Theorem|(\cite{Lazard1955})}} The universal formal group law $F_U$ exists, and its coefficient ring $A$ is isomorphic to the polynomial ring $\mathbb Z[a_1,a_2,\ldots]$ on an infinite number of generators. {{endthm}} </wikitex> == Formal group law of geometric cobordisms == <wikitex>; The applications of the formal group laws in the cobordism theory build upon the following basic example. Let $X$ be a cell complex and $u,v\in U^2(X)$ two [[Complex bordism#Geometric cobordisms|geometric cobordisms]] corresponding to elements $x,y\in H^2(X)$ respectively. Denote by $u+_{\!{}_H}\!v$ the geometric cobordism corresponding to the cohomology class $x+y$. {{beginthm|Proposition}} The following relation holds in $U^2(X)$: $$ u+_{\!{}_H}\!v=\mathcal F(u,v)=u+v+\sum_{k\ge1,\,l\ge1}\alpha_{kl}\,u^kv^l, $$ where the coefficients $\alpha_{kl}\in\varOmega_U^{-2(k+l-1)}$ do not depend on $X$. The series $\mathcal F(u,v)$ is a formal group law over the ring $\varOmega_U=\varOmega^*_U$. {{endthm}} See the [[Media:proofs-fglgc.pdf|proof]].  The series $\mathcal F(u,v)$ is called the formal group law of geometric cobordisms. The geometric cobordism $u\in U^2(X)$ is the first Chern-Conner-Floyd class of the complex line bundle $\xi$ over $X$ obtained by pulling back the canonical bundle along the map $f_u\colon X\to\mathbb C P^\infty$. It follows that the formal group law of geometric cobordisms gives an expression of the first class $c_1^U(\xi\otimes\eta)\in U^2(X)$ of the tensor product of two complex line bundles over $X$ in terms of the classes $u=c_1^U(\xi)$ and $v=c_1^U(\eta)$ of the factors: $$ c_1^U(\xi\otimes\eta)=\mathcal F(u,v). $$ The next statement describes manifolds representing the coefficients of the formal group law of geometric cobordisms. {{beginthm|Theorem|\cite{Buchstaber1970}}} $$ \mathcal F(u,v)=\frac{\sum_{i,j\ge0}[H_{ij}]u^iv^j} {\bigl(\sum_{r\ge0}[\mathbb C P^r]u^r\bigr)\bigl(\sum_{s\ge0}[\mathbb C P^s]v^s\bigr)}, $$ where $H_{ij}$ (<script type="math/tex">R$ be a commutative ring with unit.

A formal power series $F(u,v)\in R[[u,v]]$ is called a (commutative one-dimensional) formal group law over $R$ if it satisfies the following equations:

$F(u,0)=u$ , $F(0,v)=v$ ;
$F(F(u,v),w)=F(u,F(v,w))$ ;
$F(u,v)=F(v,u)$ .

The original example of a formal group law over a field $\mathbf k$ is provided by the expansion near the unit of the multiplication map $G\times G\to G$ in a one-dimensional algebraic group over $\mathbf k$ . This also explains the terminology.

A formal group law $F$ over $R$ is called linearisable if there exists a coordinate change $u\mapsto g_F(u)=u+\sum_{i>0}g_iu^i\in R[[u]]$ such that

$\displaystyle g_F(F(u,v))=g_F(u)+g_F(v).$ $\displaystyle g_F(F(u,v))=g_F(u)+g_F(v).$

Note that every formal group law over $R$ determines a formal group law over $R\otimes\mathbb Q$ .

Every formal group law $F$ is linearisable over $R\otimes\mathbb Q$ .

Proof. Consider the series $\omega(u)=\frac{\partial F(u,w)}{\partial w}\Bigl|_{w=0}$ . Then

$\displaystyle \omega(F(u,v))=\frac{\partial F(F(u,v),w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(F(u,w),v)}{\partial F(u,w)}\cdot\frac{\partial F(u,w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(u,v)}{\partial u}\omega(u).$ $\displaystyle \omega(F(u,v))=\frac{\partial F(F(u,v),w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(F(u,w),v)}{\partial F(u,w)}\cdot\frac{\partial F(u,w)}{\partial w}\Bigl|_{w=0}=\frac{\partial F(u,v)}{\partial u}\omega(u).$

We therefore have $\frac{du}{\omega(u)}=\frac{dF(u,v)}{\omega(F(u,v))}$ . Set

$\displaystyle g(u)=\int_0^u\frac{dv}{\omega(v)};$ $\displaystyle g(u)=\int_0^u\frac{dv}{\omega(v)};$

then $dg(u)=dg(F(u,v))$ . This implies that $g(F(u,v))=g(u)+C$ . Since $F(0,v)=v$ and $g(0)=0$ , we get $C=g(v)$ . Thus, $g(F(u,v))=g(u)+g(v)$ . $\square$

A series $g(u)$ satisfying the equation $g(F(u,v))=g(u)+g(v)$ is called the logarithm of the formal group law $F$ ; the above Theorem shows that a formal group law over $R\otimes\mathbb Q$ always has a logarithm. Its functional inverse series $f(t)\in R\otimes\mathbb Q[[t]]$ is called the exponential of the formal group law, so that we have $F(u,v)=f(g(u)+g(v))$ over $R\otimes\mathbb Q$ . If $R$ does not have torsion (i.e. $R\to R\otimes\mathbb Q$ is monic), the latter formula shows that a formal group law (as a series with coefficients in $R$ ) is fully determined by its logarithm (which is a series with coefficients in $R\otimes\mathbb Q$ ).

Let $F=\sum_{k,l}a_{kl}u^kv^l$ be a formal group law over a ring $R$ and $r\colon R\to R'$ a ring homomorphism. Denote by $r(F)$ the formal series $\sum_{k,l}r(a_{kl})u^kv^l\in R'[[u,v]]$ ; then $r(F)$ is a formal group law over $R'$ .

A formal group law $F_U$ over a ring $A$ is universal if for any formal group law $F$ over any ring $R$ there exists a unique homomorphism $r\colon A\to R$ such that $F=r(F_U)$ .

Assume that the universal formal group law $F_U$ over $A$ exists. Then

The ring $A$ is multiplicatively generated by the coefficients of the series $F_U$ ;
The universal formal group law is unique: if $F'_U$ is another universal formal group law over $A'$ , then there is an isomorphism $r\colon A\to A'$ such that $F'_U=r(F_U)$ .

Proof. To prove the first statement, denote by $A'$ the subring in $A$ generated by the coefficients of $F_U$ . Then there is a monomorphism $i\colon A'\to A$ satisfying $i(F_U)=F_U$ . On the other hand, by universality there exists a homomorphism $r\colon A\to A'$ satisfying $r(F_U)=F_U$ . It follows that $ir(F_U)=F_U$ . This implies that $ir=\mathrm{id}\colon A\to A$ by the uniqueness requirement in the definition of $F_U$ . Thus $A'=A$ . The second statement is proved similarly. $\square$

The universal formal group law $F_U$ exists, and its coefficient ring $A$ is isomorphic to the polynomial ring $\mathbb Z[a_1,a_2,\ldots]$ on an infinite number of generators.

3 Formal group law of geometric cobordisms

The applications of the formal group laws in the cobordism theory build upon the following basic example.

Let $X$ be a cell complex and $u,v\in U^2(X)$ two geometric cobordisms corresponding to elements $x,y\in H^2(X)$ respectively. Denote by $u+_{\!{}_H}\!v$ the geometric cobordism corresponding to the cohomology class $x+y$ .

The following relation holds in $U^2(X)$ :

$\displaystyle u+_{\!{}_H}\!v=\mathcal F(u,v)=u+v+\sum_{k\ge1,\,l\ge1}\alpha_{kl}\,u^kv^l,$ $\displaystyle u+_{\!{}_H}\!v=\mathcal F(u,v)=u+v+\sum_{k\ge1,\,l\ge1}\alpha_{kl}\,u^kv^l,$

where the coefficients $\alpha_{kl}\in\varOmega_U^{-2(k+l-1)}$ do not depend on $X$ . The series $\mathcal F(u,v)$ is a formal group law over the ring $\varOmega_U=\varOmega^*_U$ .

See the proof.

The series $\mathcal F(u,v)$ is called the formal group law of geometric cobordisms.

The geometric cobordism $u\in U^2(X)$ is the first Chern-Conner-Floyd class of the complex line bundle $\xi$ over $X$ obtained by pulling back the canonical bundle along the map $f_u\colon X\to\mathbb C P^\infty$ . It follows that the formal group law of geometric cobordisms gives an expression of the first class $c_1^U(\xi\otimes\eta)\in U^2(X)$ of the tensor product of two complex line bundles over $X$ in terms of the classes $u=c_1^U(\xi)$ and $v=c_1^U(\eta)$ of the factors:

$\displaystyle c_1^U(\xi\otimes\eta)=\mathcal F(u,v).$ $\displaystyle c_1^U(\xi\otimes\eta)=\mathcal F(u,v).$

The next statement describes manifolds representing the coefficients of the formal group law of geometric cobordisms.

Theorem 3.2 [Buchstaber1970].

$\displaystyle \mathcal F(u,v)=\frac{\sum_{i,j\ge0}[H_{ij}]u^iv^j} {\bigl(\sum_{r\ge0}[\mathbb C P^r]u^r\bigr)\bigl(\sum_{s\ge0}[\mathbb C P^s]v^s\bigr)},$ $\displaystyle \mathcal F(u,v)=\frac{\sum_{i,j\ge0}[H_{ij}]u^iv^j} {\bigl(\sum_{r\ge0}[\mathbb C P^r]u^r\bigr)\bigl(\sum_{s\ge0}[\mathbb C P^s]v^s\bigr)},$

where $H_{ij}$ ( $0\le i\le j$ ) are Milnor hypersurfaces and $H_{ji}=H_{ij}$ .

See the proof.

Theorem 3.3 {Mishchenko, see [Novikov1967].} The logarithm of the formal group law of geometric cobordisms is given by the series

$\displaystyle g_{\mathcal F}(u)=u+\sum_{k\ge1}\frac{[\mathbb C P^k]}{k+1}u^{k+1} \in\varOmega_U\otimes\mathbb Q[[u]].$ $\displaystyle g_{\mathcal F}(u)=u+\sum_{k\ge1}\frac{[\mathbb C P^k]}{k+1}u^{k+1} \in\varOmega_U\otimes\mathbb Q[[u]].$

See the proof.

The formal group law $\mathcal F$ of geometric cobordisms $\mathcal F$ is universal.

See the proof.

4 Hirzebruch genera

5 References

[Buchstaber1970] V. M. Buhštaber, The Chern-Dold character in cobordisms. I, Mat. Sb. (N.S.) 83 (125) (1970), 575–595. MR0273630 (42 #8507) Zbl 0219.57027
[Hirzebruch1966] F. Hirzebruch, Topological methods in algebraic geometry, Springer-Verlag, New York, 1966. MR0202713 (34 #2573) Zbl 0843.14009
[Lazard1955] M. Lazard, Sur les groupes de Lie formels à un paramètre, Bull. Soc. Math. France 83 (1955), 251–274. MR0073925 (17,508e) Zbl 0068.25703
[Novikov1967] S. P. Novikov, Methods of algebraic topology from the point of view of cobordism theory, Math. USSR, Izv. 1, (1967) 827–913. MR0221509 (36 #4561) Zbl 0176.52401
[Quillen1969] D. Quillen, On the formal group laws of unoriented and complex cobordism theory, Bull. Amer. Math. Soc. 75 (1969), 1293–1298. MR0253350 (40 #6565) Zbl 0199.26705

This page has not been refereed. The information given here might be incomplete or provisional.

\le i\le j$) are [[Complex bordism#Multiplicative generators|Milnor hypersurfaces]] and $H_{ji}=H_{ij}$. {{endthm}} See the [[Media:proofs-fglgc.pdf|proof]]. {{beginthm|Theorem|Mishchenko, see \cite{Novikov1967}}} The logarithm of the formal group law of geometric cobordisms is given by the series $$ g_{\mathcal F}(u)=u+\sum_{k\ge1}\frac{[\mathbb C P^k]}{k+1}u^{k+1} \in\varOmega_U\otimes\mathbb Q[[u]]. $$ {{endthm}} See the [[Media:proofs-fglgc.pdf|proof]]. {{beginthm|Theorem|\cite{Quillen1969}}} The formal group law $\mathcal F$ of geometric cobordisms $\mathcal F$ is universal. {{endthm}} See the [[Media:proofs-fglgc.pdf|proof]]. == Hirzebruch genera == == References == {{#RefList:}} [[Category:Theory]] [[Category:Bordism]] [[Category:Manifolds]] {{Stub}}R be a commutative ring with unit.

A formal power series $F(u,v)\in R[[u,v]]$ is called a (commutative one-dimensional) formal group law over $R$ if it satisfies the following equations:

$F(u,0)=u$ , $F(0,v)=v$ ;
$F(F(u,v),w)=F(u,F(v,w))$ ;
$F(u,v)=F(v,u)$ .