# Die Skewing

## Related Articles

- INFINITE BAER NETS. Jha, Vikram; Johnson, Norman L. // Journal of Geometry;Jul2000, Vol. 68 Issue 1/2, p114
Determines the structure of the collineation groups in vector space nets over skewfields. Structure theory of a point-Baer collineation; Definition of a direct product of affine planes; Uses of the term kernel of a translation plane.

- On the role of vorticity in the microstructure of a passive scalar field. Gonzalez, M.; Paranthoën, P. // Physics of Fluids;Jan2004, Vol. 16 Issue 1, p219
Analysis of experimental and modeling results on second-order moments of temperature derivatives downstream of a heated line source suggests a prevailing effect of vorticity in the destruction of anisotropy at this level. The influence of vorticity on small-scale anisotropy is also confirmed in...

- On Hooks of Skew Young Diagrams and Bars in Shifted Diagrams. Bessenrodt, Christine // Annals of Combinatorics;2001, Vol. 5 Issue 1, p37
Illustrating the effectiveness of the methods introduced in [1] we investigate here hooks in skew Young diagrams and bars in shifted diagrams; this is partially motivated by recent work by Regev. In particular, we provide short combinatorial proofs for refined identities on multisets of hooks in...

- A new family of power transformations to improve normality or symmetry. In-Kwon Yeo; Johnson, Richard A. // Biometrika;Dec2000, Vol. 87 Issue 4, p954
We introduce a new power transformation family which is well defined on the whole real line and which is appropriate for reducing skewness and to approximate normality. It has properties similar to those of the Boxâ€“Cox transformation for positive variables. The largeâ€sample...

- Products of Involutions in Steinberg Group over Skew Fields*. Jizhu Nan; Hong You // Chinese Annals of Mathematics;Apr2007, Vol. 28 Issue 2, p253
Consider the stable Steinberg group St( K) over a skew field K. An element x is called an involution if x 2 = 1. In this paper, an involution is allowed to be the identity. The authors prove that an element A of GL n ( K) up to conjugation can be represented as BC, where B is lower triangular...

- Grey Relational Clustering Associated with DME Algorithm for Zero-Skew Clock Tree Construction in SoC. Jan-Ou Wu; Chia-Chun Tsai; Yu-Ying Hsieh; Trong-Yen Lee // Journal of Grey System;2006, Vol. 18 Issue 4, p287
In this paper, we associate grey relational clustering with DME approach, called GDME, for solving the problem of clock tree construction. The experimental results show that our GDME improves up to 3.58% on total average in terms of total wire length than that of other DME algorithms....

- Skew Difference Algebras. Chajda, Ivan // Kyungpook Mathematical Journal;Mar2010, Vol. 50 Issue 1, p81
We modify the definition of difference algebra given by J. Meng to obtain a structure which is a directoid with sectional switching involutions with respect to the given partial order. Moreover, we show that this is a representation of our skew difference algebras because every such directoid...

- On skew group algebras and symmetric algebras. Todea, Constantin Cosmin // Studia Universitatis Babes-Bolyai, Mathematica;2012, Vol. 57 Issue 1, p11
We identify and define a class of algebras which we call inv-symm algebras and prove that are principally symmetric. Two important examples are given, and we prove that the skew group algebra associated to these algebras remains inv-symm.

- Mounting Bennett's double helix on his skew 12-bar linkage. Baker, J. E. // Proceedings of the Institution of Mechanical Engineers -- Part C;Aug2008, Vol. 222 Issue 8, p1575
The many facets of Bennett's investigation into his skew four-bar linkage and its several extensions have given rise to an abundance of studies by other workers. Among his imaginative endeavours was the deployment of a double helix to convert his planar 12-bar network into a spatial counterpart....