Skew-symmetric invariant theory

This paper studies the asymptotic behavior of a generalization of Mardia's affine invariant measure of (sample) multivariate skewness. If the underlying distribution is elliptically symmetric, the limiting distribution is a finite sum of weighted independent / 2 -variates, and the weights are determ

If σ is an automorphism and δ is a q-skew σ-derivation of a ring R, then the subring of invariants is the set R δ = r ∈ R δ r = 0 . The main result of this paper is Theorem. Let R be a prime algebra with a q-skew σ-derivation δ, where δ and σ are algebraic. If R δ satisfies a P. I., then R satisfies

A Ritz approach, developed for the analysis of the vibration of thin, laminated, rectangular plates, is extended to apply to symmetrically laminated, composite, skew plates. There is relatively little information available on the vibration of such skew plates, despite their increasing use in the aer