3.1 Passing and circling process

The graphical representation of the energy changes involved during the inclusion passing process of O-AN in β-CD at different Z positions for both orientations are illustrated in Fig. 3.

The first remark is that all complexation energies are negative, which show that the inclusion process of O-AN in β-CD is thermodynamically favorable. Second, the curves show several local minima, where the lowest minimum energy is precisely located at Z value of –6 Å and 0 Å respectively for neutral and cationic species of O-AN for the A orientation. The energy minimum for the B orientation is located at Z values of –3 Å and 1 Å respectively for neutral and cationic species of O-AN.

We can also notice that the lowest energy is obtained when θ is equal to 330° and 210° respectively for neutral and cationic species of O-AN for A orientation, but for the B orientation, it is located at 0° and 60° respectively for neutral and cationic species of O-AN. The energy changes of 1 and 2 complexes are exhibited in Fig. 4.

3.2 The optimization

The calculated energies for the most stable structures obtained by PM6 study are summarized in Table 1. The values of the energy minimum for both A orientation and B orientation in anionic and cationic forms are respectively equal to –13.20, –13.50, –35.13 and –35.51 kcal/mol, which indicates that the complexation energy is slightly in favor of the B orientation in cationic form. This weak difference in the complexation obtained with PM6 does not allow determining the nature of the driving forces and their relative contributions. So, we did consider a higher level of calculation.

The gap energetic between the two orientations for neutral and cationic species of O-AN obtained with PM6 is increased using single point calculations at B3LYP/6-31G*, M05-2X/6-31G*, B3PW91/6-31G*, MPW1PW91/6-31G* and HF/6-31G* levels and confirm the preference for the B orientation (O-AN2/β-CD) over the other three complexes (Table 1).

The results of the investigation of deformation energy reported in Table 1 show that the cationic form of O-AN molecule for orientation B requires slightly more energy than for orientation A (in neutral and cationic species) in order to adapt its structure to bind within the cavity of β-CD as indicated by the DEF [O-AN] of about 11.28 kcal/mol. This can be supported by the fact that flexibility of the guest structure is an important structural requirement for β-CD upon complexation.

3.3 Thermodynamics parameters

The statistical thermodynamic calculation was carried out at 1 atm pressure and 298.15 K temperature by PM6 method. The thermodynamic quantities the enthalpy changes (ΔH), Gibbs energy changes (ΔG) and entropy changes (ΔS) contributions are depicted in Table 1. As can be seen from Table 1, ΔG is negative which suggests that the inclusion process proceeded spontaneously at 298K. ΔH and ΔS are also negative, which indicates that the inclusion process is an exergonic and enthalpy-controlled process. The negative enthalpy change (ΔH) arose from the van der Waal's interaction, while the negative entropy change (ΔS) is the steric barrier caused by molecular geometrical shape and the limit of β-CD cavity to the freedom of shift and rotation of O-AN molecule. The same results are also given with the experimental observation [9].

3.4 Charge transfer

Liu and Guo suggest that charge–transfer interactions play a relevant role in the stabilization of their inclusion complexes [33]. The Mulliken charges of the heavy atoms of O-AN1 and O-AN2, charge transfer of complexes O-AN1/β-CD and O-AN2/β-CD are summarized in Table 2 by B3LYP/6-31G* and PM6 methods. The data show that the β-CD molecule accepts the electron from O-AN and the charge transfer of O-AN2/β-CD in B orientation (PM6: 1.079e, B3LYP/6-31G*: 1.018e) is the largest of all complexes.

For the O-AN1/β-CD complex, Mulliken charge distribution indicates that there is a small but non-trivial transferred charge. The amount of this charge is pretty similar in both A and B orientation. Hence, in spite of that charge–transfer interaction, is a non-trivial driving force in the complexation of O-AN1 and β-CD, the stability of the A orientation in relation to the B one is not necessary assessed by this interaction [34,35].

3.5 The structure parameters of inclusion complexes

Among the structures of the four inclusion complexes shown in Fig. 5, we could notice that O-AN2/β-CD in B orientation presents several intermolecular H-bonds in the structure. Here, the H-bond is defined as C–H-O or O–H-O and the N–H-O H bond lengths are less than 3 Å, which is in agreement with the reported data [36]. Obviously, the hydrogen bonds of O-AN2/β-CD are more than those of the other three. This explains why the complexation energy of the inclusion O-AN2/β-CD in B orientation is lower than the other three complexes.

Table 3 presents the most interesting bond distances, bond angles and dihedral angles of the O-AN before and after complexation in β-CD obtained from PM6 and B3LYP/6-31G* calculations for the most stable structure (Fig. 5). It was evident that after complexation, the conformation of O-AN was completely altered. The alterations were significant in dihedral angles, which indicated that the O-AN adopted a specific conformation to form a stable complex.

3.6 ONIOM calculations

In order to further understand molecular recognition between the guest and the host, we adopted ONIOM2 methods. In our hybrid model study, we submitted the host molecule β-CD to the low level of quantum calculations (PM6) since we assumed it provides only an environmental effect and contains the larger number of atoms, while the guest molecule O-AN (neutral and cationic species) is treated at a high level of calculation HF/6-31G*, B3LYP/6-31G*, M05-2X/6-31G* and MPW1PW91/6-31G*. Table 4 emphasizes the computational results of the ONIOM2 study. It is interesting to note that the results indicate that the complexation according to the B orientation in cationic species is significantly more favorable than the other three complexes. ONIOM2 calculations confirm PM6 results.

Furthermore, it can be seen that the gap of the complexation energy between the two orientations in the four calculations vary considerably to –0.37 at –0.60 kcal/mol and –0.19 at –0.50 kcal/mol respectively in neutral and cationic species of O-AN. The more stable complex is obtained with [(B3LYP/6-31G*:PM6)] and [(HF/6-31G*:PM6)] level.

3.7 Natural Bond Orbital (NBO) analysis

NBO analysis provides an efficient method for studying intra- and intermolecular bonding and interaction between bonds, and also provides a convenient basis for investigating charge transfer or conjugative interaction in molecular systems. Some electron donor orbital, acceptor orbital and the interacting stabilization energy resulted from the second-order micro-disturbance theory are reported [37,38]. The second-order Fock matrix was carried out to evaluate the donor–acceptor interactions in the NBO analysis [39]. For each donor (i) and acceptor (j), the stabilization energy E⁽²⁾ associated with the delocalization i → j is estimated as:

From Table 5, it can be seen that a great number of donor σ C–H or σ N–H and acceptor σ*C–H interactions occur between the cavity and the guest molecule. The interactions energies of these contacts are in the range of 1.32–4.19 kcal/mol. The interactions are in detail:

• • when O-AN plays the role of acceptor, the important interaction is observed between LP (O 71) and σ* N 156 - H 162 (3.94 kcal/mol from B3LYP/6-31G* calculations);
• • vacant orbital σ *C–H of b-CD accepts donor σ C–H from guest molecule, where the greater interaction is formed between σ C 151 - H 160 and σ* C 41 - H 123 (4.19 kcal/mol from B3LYP/6-31G* calculations).