Incidence algebra antipodes and lagrange inversion in one and several variables

The original Lagrange inversion formula, which gives explicitly the inverse under composition of a formal series, was obtained by Lagrange in 1770 through formal computations involving logarithms of inlmite products. See Lagrange [ 121. There exists an extensive literature on various versions of th

We study Nikolskii-type inequalities for the L norms of an algebraic polynop mial in one variable, defined either by a contour integral or by an area integral over a Jordan domain in ‫.ރ‬ Further, we generalize the one-dimensional results to the case of polynomials in several variables over product

The authors showed previously on Frobenius algebras and quantum Yang-Baxter . equation, II, preprint, TRITA-MAT-1995, February 1995 that every Frobenius algebra over a commutative ring defines a solution of the quantum Yang-Baxter equation. Applying this result to Hopf algebras over commutative ring