On an Inequality of H. Minc and L. Sathre

Let f (z)=a 0 , 0 (z)+a 1 , 1 (z)+ } } } +a n , n (z) be a polynomial of degree n, given as an orthogonal expansion with real coefficients. We study the location of the zeros of f relative to an interval and in terms of some of the coefficients. Our main theorem generalizes or refines results due to

Let be a finite subset of the Cartesian product W 1 × • • • × W n of n sets. For A ⊂ {1, 2, . . . , n}, denote by A the projection of onto the Cartesian product of W i , i ∈ A. Generalizing an inequality given in an article by Shen, we prove that , 2, . . . , n}. This inequality is applied to give s

## Abstract The paper gives a method for using equality and inequality restrictions simultaneously. This is done by combining the estimator for linear equality restrictions and the minimax linear estimator principle which was developed for inequality restraints. The result is a ridge‐type estimato