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Open Accesshttps://doi.org/10.1016/0001-8708(89)90027-3
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Cite Journal: Advances in Mathematics |  Publication Date: Nov 1, 1989 |
 Citations: 52 |  License type: publisher-specific-oa |
It is shown that well-known product decompositions of formal power series arise from combinatorially defined canonical isomorphisms between the Burnside ring of the infinite cyclic group on the one hand and Grothendieck's ring of formal power series with constant term 1 as well as the universal ring of Witt vectors on the other hand.
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