Results 221 to 230 of about 22,884 (263)
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Image and Vision Computing, 2005
Binary morphological transformations based on the residues (ultimate erosion, skeleton by openings, etc.) and their associated functions which are based on the analysis of the residue evolution in every point of the image are extended to functions.
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Binary morphological transformations based on the residues (ultimate erosion, skeleton by openings, etc.) and their associated functions which are based on the analysis of the residue evolution in every point of the image are extended to functions.
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Topics in Cognitive Science, 2013
AbstractThe idea that there is a “Number Sense” (Dehaene, 1997) or “Core Knowledge” of number ensconced in a modular processing system (Carey, 2009) has gained popularity as the study of numerical cognition has matured. However, these claims are generally made with little, if any, detailed examination of which modular properties are instantiated in ...
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AbstractThe idea that there is a “Number Sense” (Dehaene, 1997) or “Core Knowledge” of number ensconced in a modular processing system (Carey, 2009) has gained popularity as the study of numerical cognition has matured. However, these claims are generally made with little, if any, detailed examination of which modular properties are instantiated in ...
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2000
Abstract Numeral classifiers occur with number words and quantifiers, categorizing the noun in terms of its shape, animacy, function, and other inherent properties. Numeral classifiers typically fall into sortal and mensural subtypes.
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Abstract Numeral classifiers occur with number words and quantifiers, categorizing the noun in terms of its shape, animacy, function, and other inherent properties. Numeral classifiers typically fall into sortal and mensural subtypes.
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Numerical Magnetohydrodynamics
Fusion Science and Technology, 2008The ideal MagnetoHydroDynamic (MHD) equations accurately describe the macroscopic dynamics of a perfectly conducting plasma. Adopting a continuum, single fluid description in terms of the plasma density rho, velocity v, thermal pressure p and magnetic field B, the ideal MHD system expresses conservation of mass, momentum, energy, and magnetic flux ...
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Science, 1990
Numerical computation of transforms is now widely practiced in science and industry and has been revolutionized by the development of fast transforms that make feasible computing projects that once could not be contemplated. The article discusses the significance of transforms in numerical work, defines the modern forms of several common transforms and
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Numerical computation of transforms is now widely practiced in science and industry and has been revolutionized by the development of fast transforms that make feasible computing projects that once could not be contemplated. The article discusses the significance of transforms in numerical work, defines the modern forms of several common transforms and
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International Journal of Modern Physics C, 1994
The present status of numerical relativity is reviewed. There are five closely interconnected aspects of numerical relativity: (1) Formulation. The general covariant Einstein equations are reformulated in a way suitable for numerical study by separating the 4-dimensional spacetime into a 3-dimensional space evolving in time. (2) Techniques.
Seidel, Edward, Suen, Wai-Mo
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The present status of numerical relativity is reviewed. There are five closely interconnected aspects of numerical relativity: (1) Formulation. The general covariant Einstein equations are reformulated in a way suitable for numerical study by separating the 4-dimensional spacetime into a 3-dimensional space evolving in time. (2) Techniques.
Seidel, Edward, Suen, Wai-Mo
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Numeration Systems. Binary Numeration
1973The concept of a number is one of the fundamental concepts of arithmetic and of mathematics in general. At this stage, it is neither intended to trace back the history of this notion, nor to describe the evolution which has led to the perfectly axiomatic definitions currently in use.
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Journal of the London Mathematical Society, 1997
A rational polynomial \(r(x_1, \dots, x_n)\) is numerical with respect to a subring \(R\) of \(\mathbb{Q}\) if \(r(x_1, \dots, x_n)\) \(\in R\) whenever \(x_1, \dots, x_n\in R\). Let \(I\) be the graded ring of homogeneous rational polynomials in \(n\) variables which are numerical over the integers.
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A rational polynomial \(r(x_1, \dots, x_n)\) is numerical with respect to a subring \(R\) of \(\mathbb{Q}\) if \(r(x_1, \dots, x_n)\) \(\in R\) whenever \(x_1, \dots, x_n\in R\). Let \(I\) be the graded ring of homogeneous rational polynomials in \(n\) variables which are numerical over the integers.
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Bangla Sign Language (BdSL) Alphabets and Numerals Classification Using a Deep Learning Model
Sensors, 2022Kanchon Kanti Podder +2 more
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