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Bridging the Gap between Reality and Ideal in Chemical Vapor Deposition Growth of Graphene.
Chemical Reviews, 2018Graphene, in its ideal form, is a two-dimensional (2D) material consisting of a single layer of carbon atoms arranged in a hexagonal lattice. The richness in morphological, physical, mechanical, and optical properties of ideal graphene has stimulated ...
Li Lin +4 more
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Factoring Ideals into Semiprime Ideals
Canadian Journal of Mathematics, 1978Let D be an integral domain with 1 ≠ 0 . We consider “property SP” in D, which is that every ideal is a product of semiprime ideals. (A semiprime ideal is equal to its radical.) It is natural to consider property SP after studying Dedekind domains, which involve factoring ideals into prime ideals.
R. W. Yeagy, N. H. Vaughan
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On ideal-quotients and prime ideals
Acta Mathematica Academiae Scientiarum Hungaricae, 1953zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Idealism and Abstract Idealism [PDF]
, 1980 One of the major transitions in the Phenomenology of Mind is Hegel’s move from Self-Consciousness to the standpoint of Reason. This enables Hegel to contrast his concept of idealism with that of his contemporaries and predecessors. Before approaching the standpoint of Reason, the dialectic of the Phenomenology focused on an empiricist consciousness in ...
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Ideal and Maximum Length for a Web Survey
International Journal of Market Research, 2017This paper aims to discover ‘How long can/should a survey be?’ by asking the question to respondents themselves in a web survey implemented by the Netquest fieldwork company in Mexico in 2016.
M. Revilla, Carlos Ochoa
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Integral Closures of Ideals and Coefficient Ideals of Monomial Ideals
2021The integral closure $\overline{I}$ of an ideal $I$ in a ring $R$ consists of all elements $x \in R$ that are integral over $I$. If $R$ is an algebra over an infinite field $k$, one can define general elements of $I=\left( x_{1},\ldots,x_{n}\right)$ as $x_{\alpha}=\sum_{i=1}^{n}\alpha_{i}x_{i}$ with $(\alpha_{1},\ldots,\alpha_{n})$ belonging to a ...
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Chemical recycling to monomer for an ideal, circular polymer economy
Nature Reviews Materials, 2020G. Coates, Y. Getzler
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Positivity, 2003
Let \(E, F\) be Riesz spaces. \(T: E \to F\) is called an ideal (inverse ideal) operator if \(T (I) (T^{-1} (J))\) is an order ideal in \(E (F)\) for each order ideal \(I (J)\) in \(E (F)\). It is shown that these operators can be characterized by their action on principal order ideals.
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Let \(E, F\) be Riesz spaces. \(T: E \to F\) is called an ideal (inverse ideal) operator if \(T (I) (T^{-1} (J))\) is an order ideal in \(E (F)\) for each order ideal \(I (J)\) in \(E (F)\). It is shown that these operators can be characterized by their action on principal order ideals.
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Carbon dioxide in water and seawater: the solubility of a non-ideal gas
, 1974R. Weiss
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