The Power Substitution Property for Rings of Continuous Functions

Let L be a bounded distributive lattice. For k 1, let S k (L) be the lattice of k-ary functions on L with the congruence substitution property (Boolean functions); let S(L) be the lattice of all Boolean functions. The lattices that can arise as S k (L) or S(L) for some bounded distributive lattice L

It is demonstrated that the mass attenuation coefficient is not linearly related to the inverse intensity of continuous scattered radiation as assumed in the scattering internal standard method. A power function relationship between the absorption and the scatter over more than a limited range of ma

It is known that the powers ᒊ n of the maximal ideal of a local Noetherian ring share certain homological properties for all sufficiently large integers n. For example, the natural homomorphisms R ª Rrᒊ n are Golod, respectively, small, for all large n. We give effective bounds on the smallest integ

Math. Nechr. 149 (1990) and (1.7) respectively, where the parameter 5 tends to 0. n W Z , 5 ) = ( 6 Z -l J I(% + 1) exp (-t2/5) d t , -JI Throughout the paper, we shall write (1.8) @A = I(% + 1) -2f(Z)'+ f ( Z -0 . 2.

We prove that the power function of the likelihood ratio test for MANOVA attains its minimum when the rank of the location parameter matrix G decreases from s to 1. This provides a theoretical justification of a result that is known in the literature based only on numerical studies.