Complete Sets for Finite Algebras

CONSTRUCTIVELY COMPLETE FINITE SETS $y MARK MANDELKERN in Las Cruces, New Mexico (U.S.A.)') l ) The author is indebted to FRED RICHMAN for several valuable suggestions. 7 Ztschr. f. math. Logik

Let A be a ring, and let B be a finite A-algebra. If B is of the form w x Ž . A X , . . . , X r f , . . . , f then we say that B is a complete intersection over A.

Three classes of finite structures are related by extremal properties: complete d-partite d-uniform hypergraphs, d-dimensional affine cubes of integers, and families of 2 d sets forming a d-dimensional Boolean algebra. We review extremal results for each of these classes and derive new ones for Bool

We provide a solution to the important problem of constructing complete independent sets of Euclidean and affine invariants for algebraic curves. We first simplify algebraic curves through polynomial decompositions and then use some classical geometric results to construct functionally independent s

For a finite group G and a set Z c ( 1,2,..., n) let e,h 1) = C h(g) 0 et(g) 63 a.. 0 e,(g), SEG where G?) = g if i E I, a?) = 1 if i&Z. We prove, among other results, that the positive integers tr(e,(n, I, ) + ... + e,(n, I,))': n, r, k) 1, Zjz { l,..., n), 1 < II,1 < 3 for 1 1 and a set Z s { 1,2