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Design of Efficient Ternary Operators for Scrambling in CNTFET Technology
Arabian Journal for Science and Engineering, 2020Digital computation using ternary logic allows compact and energy-efficient digital design due to the reduction in circuit interconnects and chip area. CNFET unique characteristic of scalable threshold voltage value by utilizing the CNTs of different chirality vectors makes it a suitable option to realize ternary logic designs.
Laxmi Kumre, Trapti Sharma
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Ternary Operations as Primitive Notions for Constructive Plane Geometry IV
Mathematical Logic Quarterly, 1989AbstractIn this paper we provide a quantifier‐free constructive axiomatization for Euclidean planes in a first‐order language with only ternary operation symbols and three constant symbols (to be interpreted as ‘points’). We also determine the algorithmic theories of some ‘naturally occurring’ plane geometries.Mathematics Subject Classification: 03F65,
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REPRESENTATIONS OF TERNARY CODE VERTEX OPERATOR ALGEBRAS
Communications in Algebra, 2001We study the representations of ternary code vertex operator algebras. Our main result is that all irreducible untwisted modules of a ternary code VOA M D can be constructed using a notion of induced modules based on the ternary code D. In addition, we compute certain twisted modules of M D using the similar method.
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Algorithms for Binary Coded Balanced and Ordinary Ternary Operations
IEEE Transactions on Computers, 1975A representation for binary coded ternary (BCT) numbers is proposed. This representation is then used for the introduction of algorithms for ternary addition and subtraction on binary hardware. In the algorithm introduced, distinction is made between basic algorithms, i.e., those which are independent of the type of the arithmetic, and those which are ...
Gideon Frieder, C. Luk
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A Ternary Algebraic Operation in the Theory of Coordinate Structures
2017In this short communication to the Academy of Sciences, Wagner took \(\mathfrak{M}(A \times B)\) to be the collection of all one-to-one partial mappings from a set A to a set B. A coordinate structure K on A is a subset of \(\mathfrak{M}(A \times B)\).
Mark V. Lawson, Christopher Hollings
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TERNARY OPERATIONS AS PRIMITIVE NOTIONS FOR PLANE GEOMETRY II
Mathematical Logic Quarterly, 1992AbstractWe proved in the first part [1] that plane geometry over Pythagorean fields is axiomatizable by quantifier‐free axioms in a language with three individual constants, one binary and three ternary operation symbols. In this paper we prove that two of these operation symbols are superfluous.
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A general theory of the conditional in terms of a ternary operator
Theoria, 1972openaire +2 more sources
A dynamically reconfigurable accelerator for operations over Boolean and ternary vectors
, 2003 Valery Sklyarov +3 more
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