Multivalued groups and Newton polyhedron

Abstract

On the set of complex number C it is possible to define n-valued group for any positive integer n. The n-multiplication defines a symmetric polynomial pn = pn(x, y, z) with integer coefficients. By the theorem on symmetric polynomials, one can present pn as polynomial in elementary symmetric polynomials e1, e2, e3. V.~M.~Buchstaber formulated a question on description coefficients of this polynomial. Also, he formulated the next question: How to describe the Newton polyhedron of pn? In the present paper we find all coefficients of pn under monomials of the form e1i e2j and prove that the Newton polyhedron of pn is an right triangle.