Using growth diagrams, we define skew domino Schensted algorithm which is a domino analogue of “Robinson-Schensted algorithm for skew tableaux” due to Sagan and Stanley. The color-to-spin property of Shimozono and White is extended. As an application, we give a simple generating function for a weighted sum of skew domino tableaux whose special case is a generalization of Stanley’s sign-imbalanc...

Using growth diagrams, we define skew domino Schensted algorithm which is a domino analogue of “Robinson-Schensted algorithm for skew tableaux” due to Sagan and Stanley. The color-to-spin property of Shimozono and White is extended. As an application, we give a simple generating function for a weighted sum of skew domino tableaux whose special case is a generalization of Stanley’s sign-imbalanc...

(1) An important point is the large bias (30-50%) between OMI (KNMI DOMINO v2.0) and SCIAMACHY nadir (KNMI-BIRA TM4NO2A v2.3) retrievals, especially if both data sets are photochemically converted. It is puzzling me because Dirksen et al. (2011) and Hendrick et al. (2012) found a good agreement between OMI, SCIAMACHY nadir and groundbased observations, suggesting the absence of such a large bia...

This Domino logic is often the choice for designing high speed CMOS circuits. Often VLSI designers choose library based approaches to perform technology mapping of large scale circuits involving static CMOS logic style. Cells designed using Domino logic style have the flexibility to accommodate wide range of functions in them. Hence, there is a scope to adopt a library free synthesis approach f...

-For many years VLSI Chip designers have been using Metal Oxide Semiconductor Field Effect Transistors (MOSFETs). As the channel length of device is reducing, effects like parametric variations and increase in leakage current have caused V-I characteristics to deviate from those of traditional MOSFETs. Hence the development of devices at deep submicron retards to some extent. Carbon Nanotube Fi...

We define an action of the symmetric group S[ n 2 ] on the set of domino tableaux, and prove that the number of domino tableaux of weight β does not depend on the permutation of the weight β. A bijective proof of the well-known result due to J. Stembridge that the number of self–evacuating tableaux of a given shape and weight β = (β1, . . . , β[ n+1 2 ], β[ n2 ], . . . , β1), is equal to that o...

The proliferation of both Partially Depleted SiliconOn-Insulator (PD-SOI) technology and domino circuit styles has allowed for increases in circuit performance beyond that of scaling traditional bulk CMOS static circuits. However, interactions between dynamic circuit styles and PD-SOI complicate testing. This paper describes the issues of testing domino circuits fabricated in SOI technology and...

This paper presents a comprehensive review of the major state-of-the-art high-speed CMOS digital circuits. Focusing in particular on dynamic circuits such as conventional DOMINO, conditionalevaluation DOMINO and contention-free DOMINO. Also some high-performance non-dynamic (static) circuit techniques will be reviewed such as dual-threshold (DVT) circuits. The relative performance of these circ...

In very high performance designs, dynamic circuits, such as Domino Logic, are used because of their high speed. Skewed logic circuits can be used to achieve designs having performance comparable to that of Domino but with better scalability. Moreover, a selective clocking scheme may be applied to enhance the power savings for skewed logic circuits. This paper proposes Selectively Clocked Skewed...

We define an action of the symmetric group S[ n 2 ] on the set of domino tableaux, and prove that the number of domino tableaux of weight β does not depend on the permutation of the weight β. A bijective proof of the well-known result due to J. Stembridge that the number of self–evacuating tableaux of a given shape and weight β = (β1, . . . , β[ n+1 2 ], β[ n2 ], . . . , β1), is equal to that o...