Biphenyl: A stress tensor and vector-based perspective explored within the quantum theory of atoms in molecules

Abstract: We use quantum theory of atoms in molecules (QTAIM) and the stress tensor topological approaches to explain the effects of the torsion u of the C-C bond linking the two phenyl rings of the biphenyl molecule on a bond-by-bond basis using both a scalar and vector-based analysis. Using the total local energy density H(r b ), we show the favorable conditions for the formation of the controversial H-H bonding interactions for a planar biphenyl geometry. This bond-by-bond QTAIM analysis is found to be agreement with… Show more

“…Thus, analogously to the QTAIM descriptor, we calculate a stress tensor stiffness, S σ = | λ 1 σ |/| λ 3 σ |, which has been found as a good descriptor of the “resistance” of the bond‐path to the twist, as well as the eigenvector, e 1 σ indicating the direction of the π‐bond . Previously, it was found that the stress tensor stiffness, S σ produced results that were in line with physical intuition …”

“…Therefore, the basin‐path set area is defined as the area of the surface swept out by the ∇ ρ ( r ) trajectories undergoing torsion. A recent investigation on biphenyl found that the basin‐path set areas of the C atomic basins defined by the e 2 eigenvector of the BCP undergoing a torsion φ was always greater than for the corresponding e 1 eigenvector except at the planar conformation, φ = 0.0° . The converse was found to be true for the H atomic basins associated with the H—H BCPs …”

“…The ellipticity defined as ε = | λ 1 |/| λ 2 | − 1, where λ 1 and λ 2 are negative eigenvalues of the corresponding Hessian matrix at a BCP, provides the relative accumulation of ρ ( r b ) in the two directions perpendicular to the bond‐path at the BCP. Previously, we defined a bond‐path stiffness, S = λ 2 / λ 3 , as a measure of rigidity of the bond‐path …”

“…The quantum stress tensor, σ ( r ), which is directly related to the Ehrenfest force by the virial theorem, therefore, provides a physical explanation of the low frequency normal modes that accompany structural rearrangements . Diagonalization of the stress tensor, σ ( r ), returns the principal electronic stresses.…”

“…For the 11‐cis retinal subjected to a torsion ± α , we have recently demonstrated that the e 2 and e 1 σ eigenvectors of the torsional BCP corresponded to the preferred + α direction of rotation as defined by the PES profile . In this work, we choose to use the stress tensor response β σ because earlier it was found to produce more consistent results for torsion …”

A QTAIM and stress tensor investigation of the torsion path of a light-driven fluorene molecular rotary motor

“…Thus, analogously to the QTAIM descriptor, we calculate a stress tensor stiffness, S σ = | λ 1 σ |/| λ 3 σ |, which has been found as a good descriptor of the “resistance” of the bond‐path to the twist, as well as the eigenvector, e 1 σ indicating the direction of the π‐bond . Previously, it was found that the stress tensor stiffness, S σ produced results that were in line with physical intuition …”

“…Therefore, the basin‐path set area is defined as the area of the surface swept out by the ∇ ρ ( r ) trajectories undergoing torsion. A recent investigation on biphenyl found that the basin‐path set areas of the C atomic basins defined by the e 2 eigenvector of the BCP undergoing a torsion φ was always greater than for the corresponding e 1 eigenvector except at the planar conformation, φ = 0.0° . The converse was found to be true for the H atomic basins associated with the H—H BCPs …”

“…The ellipticity defined as ε = | λ 1 |/| λ 2 | − 1, where λ 1 and λ 2 are negative eigenvalues of the corresponding Hessian matrix at a BCP, provides the relative accumulation of ρ ( r b ) in the two directions perpendicular to the bond‐path at the BCP. Previously, we defined a bond‐path stiffness, S = λ 2 / λ 3 , as a measure of rigidity of the bond‐path …”

“…The quantum stress tensor, σ ( r ), which is directly related to the Ehrenfest force by the virial theorem, therefore, provides a physical explanation of the low frequency normal modes that accompany structural rearrangements . Diagonalization of the stress tensor, σ ( r ), returns the principal electronic stresses.…”

“…For the 11‐cis retinal subjected to a torsion ± α , we have recently demonstrated that the e 2 and e 1 σ eigenvectors of the torsional BCP corresponded to the preferred + α direction of rotation as defined by the PES profile . In this work, we choose to use the stress tensor response β σ because earlier it was found to produce more consistent results for torsion …”

A QTAIM and stress tensor investigation of the torsion path of a light-driven fluorene molecular rotary motor

A stress tensor and QTAIM perspective on the substituent effects of biphenyl subjected to torsion

QTAIM and stress tensor interpretation of the (H₂ O)₅ potential energy surface