SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W2032043486> ?p ?o ?g. }

Showing items 1 to 100 of ±115 with 100 items per page.

W2032043486 endingPage "2088" @default.
W2032043486 startingPage "2075" @default.
W2032043486 abstract "The Fowler−Guggenheim local isotherm corresponding to the lattice model of localized adsorption on a patchwise surface was used to evaluate the statistical distribution of adsorption sites with respect to their adsorption energies from an experimental adsorption isotherm. An accurate low-pressure argon adsorption isotherm at 77 K on muscovite was used as initial information. The calculations were carried out in two ways that imply different surface constructions. The first one is based on the classical hypothesis of Langmuir, who assumed a finite manifold of adsorption sites and wrote an overall isotherm as a series summing the additive contributions of the different sites. The second is derived on the assumption of an infinite manifold of sites, when the sum turns into an integral. Both representations are equivalent only with the exact adsorption model. However, as shown, in a number of cases they can give similar results even with the approximate model. The influence of the ω parameter expressing the reduced energy of lateral interactions was tested for different ω values ranging between 0 and 4 in units of RT. Muscovite possesses crystallinity. Therefore, one may expect that its surface consists of recurring adsorption sites. Peaks on the energy distribution could mean at least a short range ordering (SRO) on this surface. A derivative of a local isotherm for sites of each kind is known to be a bell-shaped curve. The greater the energy of lateral attraction is, the narrower is the bell; that is, the Langmuir local isotherm (the case of ω = 0) corresponds to the widest bell. Hence, if the hypothesis concerning SRO holds true, an energy distribution obtained with ω = 0 must be discrete, inasmuch as a broadening of the calculated partial distributions can lead only to a deteriorating of the approximation accuracy of local derivatives and, correspondingly, of the overall derivative and the overall isotherm. Indeed, the distributions calculated with a small ω represent sums of δ-like peaks. With a small ω, both algorithms show the same results; therefore, any numerical artifacts are excluded. However, SRO on the surface is not proven yet, because with a large ω the algorithms lead to continuous distributions rather than to discrete ones. The relative approximation error of the overall isotherm with ω = 0 is not too large (≅2−3%). However, the large approximation error of the overall derivative (≅15%) unambiguously indicates the unacceptability of the assumption ω = 0 (local Langmuir isotherm). Thus, to make final conclusions about the structure of the surface and validate such an analysis, it is necessary to improve the patchwise model, to test the method by using an independent molecular simulation, and to determine realistic values of the energies of lateral interactions being different and not equal for adsorption sites of each kind." @default.
W2032043486 created "2016-06-24" @default.
W2032043486 creator A5018435193 @default.
W2032043486 creator A5071735219 @default.
W2032043486 creator A5075295105 @default.
W2032043486 date "2002-02-16" @default.
W2032043486 modified "2023-09-26" @default.
W2032043486 title "Adsorption of Spherical Molecules in Probing the Surface Topography. 1. Patchwise Heterogeneity Model" @default.
W2032043486 cites W1766349149 @default.
W2032043486 cites W1964953315 @default.
W2032043486 cites W1968642186 @default.
W2032043486 cites W1978468804 @default.
W2032043486 cites W1983097218 @default.
W2032043486 cites W1986113254 @default.
W2032043486 cites W1986619168 @default.
W2032043486 cites W1988083043 @default.
W2032043486 cites W1998800510 @default.
W2032043486 cites W2001622478 @default.
W2032043486 cites W2004831935 @default.
W2032043486 cites W2012140795 @default.
W2032043486 cites W2014641036 @default.
W2032043486 cites W2024362492 @default.
W2032043486 cites W2026663647 @default.
W2032043486 cites W2043218480 @default.
W2032043486 cites W2043728085 @default.
W2032043486 cites W2048389176 @default.
W2032043486 cites W2051024017 @default.
W2032043486 cites W2058805339 @default.
W2032043486 cites W2077926775 @default.
W2032043486 cites W2078010729 @default.
W2032043486 cites W2078903981 @default.
W2032043486 cites W2170958811 @default.
W2032043486 cites W2331212077 @default.
W2032043486 doi "https://doi.org/10.1021/la010233j" @default.
W2032043486 hasPublicationYear "2002" @default.
W2032043486 type Work @default.
W2032043486 sameAs 2032043486 @default.
W2032043486 citedByCount "6" @default.
W2032043486 crossrefType "journal-article" @default.
W2032043486 hasAuthorship W2032043486A5018435193 @default.
W2032043486 hasAuthorship W2032043486A5071735219 @default.
W2032043486 hasAuthorship W2032043486A5075295105 @default.
W2032043486 hasConcept C115958267 @default.
W2032043486 hasConcept C121332964 @default.
W2032043486 hasConcept C12143843 @default.
W2032043486 hasConcept C127413603 @default.
W2032043486 hasConcept C147789679 @default.
W2032043486 hasConcept C150394285 @default.
W2032043486 hasConcept C159985019 @default.
W2032043486 hasConcept C178790620 @default.
W2032043486 hasConcept C185592680 @default.
W2032043486 hasConcept C192562407 @default.
W2032043486 hasConcept C24890656 @default.
W2032043486 hasConcept C2524010 @default.
W2032043486 hasConcept C2776581184 @default.
W2032043486 hasConcept C2776799497 @default.
W2032043486 hasConcept C2779870107 @default.
W2032043486 hasConcept C2781204021 @default.
W2032043486 hasConcept C32909587 @default.
W2032043486 hasConcept C33923547 @default.
W2032043486 hasConcept C46275449 @default.
W2032043486 hasConcept C529865628 @default.
W2032043486 hasConcept C54936624 @default.
W2032043486 hasConcept C55493867 @default.
W2032043486 hasConcept C7070889 @default.
W2032043486 hasConcept C78519656 @default.
W2032043486 hasConcept C8010536 @default.
W2032043486 hasConcept C97355855 @default.
W2032043486 hasConceptScore W2032043486C115958267 @default.
W2032043486 hasConceptScore W2032043486C121332964 @default.
W2032043486 hasConceptScore W2032043486C12143843 @default.
W2032043486 hasConceptScore W2032043486C127413603 @default.
W2032043486 hasConceptScore W2032043486C147789679 @default.
W2032043486 hasConceptScore W2032043486C150394285 @default.
W2032043486 hasConceptScore W2032043486C159985019 @default.
W2032043486 hasConceptScore W2032043486C178790620 @default.
W2032043486 hasConceptScore W2032043486C185592680 @default.
W2032043486 hasConceptScore W2032043486C192562407 @default.
W2032043486 hasConceptScore W2032043486C24890656 @default.
W2032043486 hasConceptScore W2032043486C2524010 @default.
W2032043486 hasConceptScore W2032043486C2776581184 @default.
W2032043486 hasConceptScore W2032043486C2776799497 @default.
W2032043486 hasConceptScore W2032043486C2779870107 @default.
W2032043486 hasConceptScore W2032043486C2781204021 @default.
W2032043486 hasConceptScore W2032043486C32909587 @default.
W2032043486 hasConceptScore W2032043486C33923547 @default.
W2032043486 hasConceptScore W2032043486C46275449 @default.
W2032043486 hasConceptScore W2032043486C529865628 @default.
W2032043486 hasConceptScore W2032043486C54936624 @default.
W2032043486 hasConceptScore W2032043486C55493867 @default.
W2032043486 hasConceptScore W2032043486C7070889 @default.
W2032043486 hasConceptScore W2032043486C78519656 @default.
W2032043486 hasConceptScore W2032043486C8010536 @default.
W2032043486 hasConceptScore W2032043486C97355855 @default.
W2032043486 hasIssue "6" @default.
W2032043486 hasLocation W20320434861 @default.
W2032043486 hasOpenAccess W2032043486 @default.
W2032043486 hasPrimaryLocation W20320434861 @default.