Results 301 to 310 of about 618,007 (340)
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Canadian Journal of Mathematics, 1965
Characterizations for prime and semi-prime rings satisfying the right quotient conditions (see § 1) have been determined by A. W. Goldie in (4 and 5). A ring R is prime if and only if the right annihilator of every non-zero right ideal is zero. A natural generalization leads one to consider right R-modules having the properties that the annihilator in ...
Feller, E. H., Swokowski, E. W.
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Characterizations for prime and semi-prime rings satisfying the right quotient conditions (see § 1) have been determined by A. W. Goldie in (4 and 5). A ring R is prime if and only if the right annihilator of every non-zero right ideal is zero. A natural generalization leads one to consider right R-modules having the properties that the annihilator in ...
Feller, E. H., Swokowski, E. W.
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Seed priming in field crops: potential benefits, adoption and challenges
Crop and Pasture Science, 2019. Seed priming is a presowing technique in which seeds are moderately hydrated to the point where pregermination metabolic processes begin without actual germination. Seeds are then redried to near their actual weight for normal handling.
M. Farooq +6 more
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Visual Cognition, 1998
Two experiments were performed to explore a possible visuomotor priming effect. The participants were instructed to fixate a cross on a computer screen and to respond, when the cross changed colour (“go” signal), by grasping one of two objects with their right hand.
CRAIGHERO, Laila +3 more
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Two experiments were performed to explore a possible visuomotor priming effect. The participants were instructed to fixate a cross on a computer screen and to respond, when the cross changed colour (“go” signal), by grasping one of two objects with their right hand.
CRAIGHERO, Laila +3 more
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Plant prime editing goes prime
Nature Plants, 2021Simon Sretenovic, Yiping Qi
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Teaching Mathematics and its Applications: An International Journal of the IMA, 2007
Several proofs demonstrating that there are infinitely many primes, different types of primes, tests of primality, pseudo primes, prime number generators and open questions about primes are discussed in Section 1. Some of these notions are elaborated upon in Section 2, with discussions of the Riemann zeta function and how algorithmic complexity enters ...
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Several proofs demonstrating that there are infinitely many primes, different types of primes, tests of primality, pseudo primes, prime number generators and open questions about primes are discussed in Section 1. Some of these notions are elaborated upon in Section 2, with discussions of the Riemann zeta function and how algorithmic complexity enters ...
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The Mathematical Intelligencer, 2009
The authors study the different versions of Euclid's proof of the infinitude of primes given in more than 100 textbooks written in English. Some of the claims made in textbooks are almost entertaining: Euclid ``introduced factorials'' [\textit{C. M. Grinstead} and \textit{J. L. Snell}, Introduction to probability. 2nd rev. ed.
Hardy, Michael, Woodgold, Catherine
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The authors study the different versions of Euclid's proof of the infinitude of primes given in more than 100 textbooks written in English. Some of the claims made in textbooks are almost entertaining: Euclid ``introduced factorials'' [\textit{C. M. Grinstead} and \textit{J. L. Snell}, Introduction to probability. 2nd rev. ed.
Hardy, Michael, Woodgold, Catherine
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Prime Ministers' Prime Minister
International Journal, 1961As Edmund Spenser is traditionally spoken of as the poets' poet and as Gustave Flaubert might with equal justice be thought of as the writers' writer, so Mackenzie King may be thought of as the prime ministers1 Prime Minister. In each instance the appeal is less to the public than to the professional be he poet, writer, or politician.
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Strongly prime and $$*$$ ∗ -prime crossed products
Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry, 2015A ring \(R\) is called \textit{(right) strongly prime} (shortly SP) [\textit{D. Handelman} and \textit{J. Lawrence}, Trans. Am. Math. Soc. 211, 209--223 (1975; Zbl 0345.16004)] if \[ \text{for all } r\in R\setminus\{0\}\;\text{ exists a finite subset }X\subseteq R\text{ such that for all } t\in R: rXt=0\Rightarrow t=0. \tag{1} \] Equivalently, \(R\) is
Bohra, Nisha, Joshi, Kanchan
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Prime Floor and Prime Ceiling Functions
2022See the abstract in the attached pdf.
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