Formal groups over Hopf algebras
Abstract
In this paper we study some generalization of the notion of a formal group over ring, which may be called a formal group over Hopf algebra (FGoHA). The first example of FGoHA was found under the study of cobordism's ring of some H-space Gr. The results, which are represented in this paper, show that some constructions of the theory of formal group may be generalized to FGoHA. For example, if F(x 1,1 x) ∈ (HRH)[[x 1,1 x]] is a FGoHA over a Hopf algebra (H,μ,, ,ε, S) over a ring R without torsion, then there exists a logarithm, i.e. the formal series g(x)∈ HQ[[x]] such that ( g)( F(x 1,1 x))= c+ g(x) 1+1 g(x), where c∈ HQR QHQ, ( ε) c=0=(ε ) c and ( ) c+1 c-( ) c- c 1=0 (recall that the last condition means that c is a cocycle in the cobar complex of the Hopf algebra HQ). On the other hand, FGoHA have series of new properties. For example, the convolution on a Hopf algebra allows us to get new FGoHA from given.
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