Second-Order Characterizable Cardinals and Ordinals

The subtle, almost ine able, and ine able cardinals were introduced in an unpublished 1971 manuscript of R. Jensen and K. Kunen. The concepts were extended to that of k-subtle, k-almost ine able, and k-ine able cardinals in 1975 by J. Baumgartner. In this paper we give a self contained treatment of

## Abstract When measuring health inequality using ordinal data, analysts typically must choose between indices specifically based upon ordinal data and more standard indices using ordinal data, which has been transformed into cardinal data. This paper compares inequality rankings across a number o

## Abstract The theorem that the arithmetic mean is greater than or equal to the geometric mean is investigated for cardinal and ordinal numbers. It is shown that whereas the theorem of the means can be proved for __n__ pairwise comparable cardinal numbers without the axiom of choice, the inequalit

When the dynamics of any general second order system are cast in a state-space format, the initial choice of the state vector usually comprises one partition representing system displacements and another representing system velocities. Co-ordinate transformations can be defined which result in more