Some further properties of the superconvergent flux projection

Traditionally Plackett and Burman [1946, The design of optimum multifactorial experiments. Biometrika 33, 305 -325] designs have been used for screening main e ects only because of their complex aliasing patterns. Recently, Wang and Wu [1995, A hidden projection property of Plackett-Burman designs.

## Abstract On a spin Kähler manifold __M^2m^__ a new first integral __Q__~Ψ~ of the Kählerian twistor equations is presented. If the scalar curvature has a critical point then __Q__~Ψ~ vanishes. In case __M^2m^__ is closed, this fact provides a simple geometrical obstruction for Kählerian twistor

Fractional factorial designs have a long history of successful use in factor screening experiments. When only a few factors are expected to be relevant, knowledge of their low-dimension projections is valuable. The projection properties of the 2~ -m fractional factorial design into any k dimensions

To develop an understanding of singularity formation in vortex sheets, we consider model equations that exhibit shared characteristics with the vortex sheet equation but are slightly easier to analyze. A model equation is obtained by replacing the flux term in Burgers' equation by alternatives that

In this paper, we consider the Galerkin and collocation methods for the eigenvalue problem of a compact integral operator with a smooth kernel using the Legendre polynomials of degree ≤ n. We prove that the error bounds for eigenvalues are of the order O(n -2r ) and the gap between the spectral subs