The conformation of 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol 1, phase angles of the pseudorotation of five (C3) and six (C14) membered rings, was analyzed with dihedral angles θHnHn+1[deg] calculated only from vicinal coupling constants 3JHH[Hz] with 3-Sphere approach and VISION molecular models. The dimension space around the six and five membered ring are established based on hypersphere equations results from calculation of the dihedral angles from carbon chemical shift. Higher biological activity was observed to date at iminocyclitols having dihedral or vicinal angles calculated in 2D. Tetrahedral angles in close relationships with dihedral angles are calculated from carbon and / or proton chemical shift with manifold equations, conic and rectangle geometries. Equations for calculation of the tetrahedral angles φCn[deg] only from vicinal coupling constant 3JHnHn+1[deg] or from chemical shift δCn[ppm] are analyzed for five and established for six membered ring, resulting general rules for calculation of tetrahedral angles. Conic as manifold in case of six membered ring enable calculation of dihedral angle θHnHn+1[deg] from tetrahedral angle φCn[deg] starting with tetrahedral angle on unit, and in case of five membered ring based on opposite relationship between dihedral and tetrahedral (sin versus tan function), unit start with dihedral angles. Rectangle as manifold enable calculation for both the tetrahedral angle from dihedral angle starting with dihedral angle on unit, for six membered ring using two or three units with three sets angles and in case of five membered ring only one unit with seven set angles. The bond distances lCnCn+1 [A0] of five and six membered ring are calculated from 3-Sphere-dihedral angles θHnHn+1[deg].
| Published in | American Journal of Quantum Chemistry and Molecular Spectroscopy (Volume 8, Issue 1) |
| DOI | 10.11648/ajqcms.20240801.11 |
| Page(s) | 1-12 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
| Copyright |
Copyright © The Author(s), 2024. Published by Science Publishing Group |
3-Sphere-Dihedral Angles, Phase Angle of the Pseudorotation, Tetrahedral Angles, Bond Distances
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APA Style
Moriarty, R. M., Mitan, C., Bartha, E., Filip, P., Naithani, R., et al. (2024). 3-Sphere Approach on 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol. American Journal of Quantum Chemistry and Molecular Spectroscopy, 8(1), 1-12. https://doi.org/10.11648/ajqcms.20240801.11
ACS Style
Moriarty, R. M.; Mitan, C.; Bartha, E.; Filip, P.; Naithani, R., et al. 3-Sphere Approach on 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol. Am. J. Quantum Chem. Mol. Spectrosc. 2024, 8(1), 1-12. doi: 10.11648/ajqcms.20240801.11
AMA Style
Moriarty RM, Mitan C, Bartha E, Filip P, Naithani R, et al. 3-Sphere Approach on 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol. Am J Quantum Chem Mol Spectrosc. 2024;8(1):1-12. doi: 10.11648/ajqcms.20240801.11
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Download@article{10.11648/ajqcms.20240801.11,
author = {Robert Michael Moriarty and Carmen-Irena Mitan and Emerich Bartha and Petru Filip and Rajesh Naithani and Timothy Block},
title = {3-Sphere Approach on 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol},
journal = {American Journal of Quantum Chemistry and Molecular Spectroscopy},
volume = {8},
number = {1},
pages = {1-12},
doi = {10.11648/ajqcms.20240801.11},
url = {https://doi.org/10.11648/ajqcms.20240801.11},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.ajqcms.20240801.11},
abstract = {The conformation of 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol 1, phase angles of the pseudorotation of five (C3) and six (C14) membered rings, was analyzed with dihedral angles θHnHn+1[deg] calculated only from vicinal coupling constants 3JHH[Hz] with 3-Sphere approach and VISION molecular models. The dimension space around the six and five membered ring are established based on hypersphere equations results from calculation of the dihedral angles from carbon chemical shift. Higher biological activity was observed to date at iminocyclitols having dihedral or vicinal angles calculated in 2D. Tetrahedral angles in close relationships with dihedral angles are calculated from carbon and / or proton chemical shift with manifold equations, conic and rectangle geometries. Equations for calculation of the tetrahedral angles φCn[deg] only from vicinal coupling constant 3JHnHn+1[deg] or from chemical shift δCn[ppm] are analyzed for five and established for six membered ring, resulting general rules for calculation of tetrahedral angles. Conic as manifold in case of six membered ring enable calculation of dihedral angle θHnHn+1[deg] from tetrahedral angle φCn[deg] starting with tetrahedral angle on unit, and in case of five membered ring based on opposite relationship between dihedral and tetrahedral (sin versus tan function), unit start with dihedral angles. Rectangle as manifold enable calculation for both the tetrahedral angle from dihedral angle starting with dihedral angle on unit, for six membered ring using two or three units with three sets angles and in case of five membered ring only one unit with seven set angles. The bond distances lCnCn+1 [A0] of five and six membered ring are calculated from 3-Sphere-dihedral angles θHnHn+1[deg].
},
year = {2024}
}
TY - JOUR T1 - 3-Sphere Approach on 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol AU - Robert Michael Moriarty AU - Carmen-Irena Mitan AU - Emerich Bartha AU - Petru Filip AU - Rajesh Naithani AU - Timothy Block Y1 - 2024/02/01 PY - 2024 N1 - https://doi.org/10.11648/ajqcms.20240801.11 DO - 10.11648/ajqcms.20240801.11 T2 - American Journal of Quantum Chemistry and Molecular Spectroscopy JF - American Journal of Quantum Chemistry and Molecular Spectroscopy JO - American Journal of Quantum Chemistry and Molecular Spectroscopy SP - 1 EP - 12 PB - Science Publishing Group SN - 2994-7308 UR - https://doi.org/10.11648/ajqcms.20240801.11 AB - The conformation of 9-O-(10,11-di-O-benzyl-12,14-O-benzylidene-α-D-galactopyranosyl)-1-butyl-2,3-O-isopropylidene-1,4-dideoxy-1,4-imino-1-N-dehydro-L-ribitol 1, phase angles of the pseudorotation of five (C3) and six (C14) membered rings, was analyzed with dihedral angles θHnHn+1[deg] calculated only from vicinal coupling constants 3JHH[Hz] with 3-Sphere approach and VISION molecular models. The dimension space around the six and five membered ring are established based on hypersphere equations results from calculation of the dihedral angles from carbon chemical shift. Higher biological activity was observed to date at iminocyclitols having dihedral or vicinal angles calculated in 2D. Tetrahedral angles in close relationships with dihedral angles are calculated from carbon and / or proton chemical shift with manifold equations, conic and rectangle geometries. Equations for calculation of the tetrahedral angles φCn[deg] only from vicinal coupling constant 3JHnHn+1[deg] or from chemical shift δCn[ppm] are analyzed for five and established for six membered ring, resulting general rules for calculation of tetrahedral angles. Conic as manifold in case of six membered ring enable calculation of dihedral angle θHnHn+1[deg] from tetrahedral angle φCn[deg] starting with tetrahedral angle on unit, and in case of five membered ring based on opposite relationship between dihedral and tetrahedral (sin versus tan function), unit start with dihedral angles. Rectangle as manifold enable calculation for both the tetrahedral angle from dihedral angle starting with dihedral angle on unit, for six membered ring using two or three units with three sets angles and in case of five membered ring only one unit with seven set angles. The bond distances lCnCn+1 [A0] of five and six membered ring are calculated from 3-Sphere-dihedral angles θHnHn+1[deg]. VL - 8 IS - 1 ER -
Department of Chemistry, University of Illinois at Chicago, Chicago, US
Department of Chemistry, University of Illinois at Chicago, Chicago, US; Department of Chemistry, “C.D. Nenitescu”, Institute of Organic and Supramolecular Chemistry, Bucharest, Romania
Department of Chemistry, “C.D. Nenitescu”, Institute of Organic and Supramolecular Chemistry, Bucharest, Romania
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