Results 211 to 220 of about 386,155 (244)
Some of the next articles are maybe not open access.
2009
Why do gases obey the simple ideal gas law so well? Even gases of more complicated entities such as CH4 behave the same way. This fact suggests that the internal structure of the entities has little, if anything, to do with the gas law. The observed similarities of the properties of all gases must arise from properties that are common to all atoms and ...
Charles H. Holbrow +4 more
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Why do gases obey the simple ideal gas law so well? Even gases of more complicated entities such as CH4 behave the same way. This fact suggests that the internal structure of the entities has little, if anything, to do with the gas law. The observed similarities of the properties of all gases must arise from properties that are common to all atoms and ...
Charles H. Holbrow +4 more
openaire +1 more source
Equations of state for hard spheres and hard-sphere chains
Fluid Phase Equilibria, 2000Abstract Several well-known equations of state developed for hard spheres are reviewed and applied to describe the properties of hard-sphere chains. Two different types of bonding terms that account for chain connectivity are adapted for hard-sphere-chain equations.
In Ha Kim, Young Chan Bae
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Viscosity of Hard Sphere Suspensions
Journal of Colloid and Interface Science, 2002A simple functional representation of the concentration dependence of the low-shear viscosity eta of hard sphere suspensions is proposed. The representation, which agrees with published literature at all volume fractions phi, has a hitherto-unremarked transition in its functional form at phi approximately 0.42 identical with phi(t).
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Physical Review, 1965
We pose the problem of finding an operator, defined for all relative distances of two particles, which plays the role of a Hamiltonian such that the subsequent eigenvalue problem has as its only solutions precisely the eigenfunctions for two hard spheres, each of core diameter $a$. This operator is explicitly constructed.
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We pose the problem of finding an operator, defined for all relative distances of two particles, which plays the role of a Hamiltonian such that the subsequent eigenvalue problem has as its only solutions precisely the eigenfunctions for two hard spheres, each of core diameter $a$. This operator is explicitly constructed.
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Crystal Polymorph Selection Mechanism of Hard Spheres Hidden in the Fluid
ACS Nano, 2023Willem Gispen +2 more
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Mean-field theory of hard sphere glasses and jamming
Reviews of Modern Physics, 2010Giorgio Parisi, Francesco Zamponi
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