Algebraic topology of the Lagrange inversion

Abstract: The Lagrange inversion formula for power series is one of the classical formulas from analysis and combinatorics. A nice geometric interpretation of this formula in terms of the Stasheff polytopes was discovered by Loday. We show that it also admits a natural topological interpretation in terms of the Chern numbers of the complex projective space. The proof is based on our earlier work on the Chern-Dold character in complex cobordism theory and leads to a new derivation of the Lagrange inversion formula. We provide a similar interpretation of the multiplicative inversion formulas in terms of Chern numbers of the smooth theta divisors. We discuss also the general related problem when all Chern numbers of an algebraic variety are divisible by its Euler characteristic.