On testing for zero polynomials by a set of points with bounded precision

This paper presents a procedure to construct the largest polytope of polynomials with every polynomial having a precise number of distinct real zeros in a specific real line segment. This polytope can be specified from the zeros of a finite number of polynomials.

We propose an upper bound for the regularity index of fat points of P n with no geometric conditions on the points. Whenever the conjecture is true, the bound is sharp. It is, in fact, reached when there are points with high multiplicities either on a line or on some rational curve. Besides giving a

Exact tests of equivalence and efficacy with a non-zero lower bound based on two independent binomial proportions for comparative trials are proposed. These exact tests are desirable for studies with small sample sizes. They generalize classical methods to include testing of null hypotheses of presp

Chan considered exact non-asymptotical tests based on two types of asymptotical test statistics Z #/ and Z #$ for the classical and non-classical null hypotheses. A lot of material on exact non-asymptotical tests for two independent binomially distributed variables has been published for the classic