Landweber exactness of the formal group law in c1-spherical bordism

Abstract

We describe the structure of the coefficient ring W*(pt)=W* of the c1-spherical bordism theory for an arbitrary SU-bilinear multiplication. We prove that for any SU-bilinear multiplication the formal group of the theory W* is Landweber exact. Also we show that after inverting the set P of Fermat primes there exists a complex orientation of the localized theory W*[ P-1] such that the coefficients of the corresponding formal group law generate the whole coefficient ring W*[ P-1].

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