Formal group: Difference between revisions

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Let $A$ be a commutative ring. A formal group in one parameter is a series $F\in A[[X,Y]]$ such that

The additive formal group: $F(X,Y)=X+Y$
The multiplicative formal group: $F(X,Y)=(X+1)(Y+1)-1$ . In this case, $\sigma ={\frac {1}{X+1}}-1=\sum _{k=1}^{\infty }(-1)^{k}X^{k}$ .

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+{{subpages}}
 ==Definition==
-Let <math>A</math> be a commutative ring.  A ''formal group'' in one parameter is a series <math>F\in A[[X,Y]]</math> such that
+Let <math>A</math> be a commutative ring.  A '''formal group''' in one parameter is a series <math>F\in A[[X,Y]]</math> such that
 #<math>F(X,0)=F(0,X)=X</math>
 #<math>F(X,Y)=F(Y,X)</math>