Confined crystallization in the binary blends of diblock copolymers bearing stereoisomeric isotactic and syndiotactic polypropylene

Free energies G(X)n of 12 1,ω‐dihydrooligomers (X)n (n, number of the monomeric units) have been determined by quantum calculations. We note that these values are correlated by (a) an excellent linear relationship: G(X)n = An – 761.86 ± 10 (kcal mol–1) (TPSS‐TPSS/6.311 + + G(dp)); (b) for two oligomers (X)n and (Y)n, the difference of weighted free energies—G(X)n/n – G(Y)n/n—is a constant irrespective of n which results from the difference of free energies of the substituent. Consequently, from the Gn values of 1,ω‐dihydrooligoethenes (in fact n‐alkanes), a determination of the free energies of a 1,ω‐dihydrooligomers (X)n is obtained with a good accuracy by the calculation of the G value of its substituent; (c) the corresponding increments G(X)n/n – G(X)(n–1)/(n–1) are equaled and led to a single power law: [Gn/n – G(n–1)/(n–1) = 1282/n2.156 (kcal mol–1), R = 0.9992] or a linear relationship: [Gn/n – G(n–1)/(n–1) = 756.73/n(n–1) + 0.0211 (kcal mol–1), R = 1]. Syndiotactic and isotactic 1,ω‐dihydrooligomers (X) are illustrated in the Electronic Supporting Information.

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Oligomers. Relations between their computed free energies

Audran

Joly

Marque

et al. 2023

Applied Research

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Confined crystallization in the binary blends of diblock copolymers bearing stereoisomeric isotactic and syndiotactic polypropylene

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Oligomers. Relations between their computed free energies

Oligomers. Relations between their computed free energies

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