Modelling of chromatographic and electrophoretic behaviour of imidazoline and alpha adrenergic receptors ligands under different acid-base conditions

Solutions for HPLC analysis

The working solutions were prepared by dissolving the substances in methanol to obtain a concentration of 0.7 mg/mL for rilmenidine and 0.1 mg/mL for the other compounds.

HPLC equipment and working conditions

The HPLC working conditions are described in our previously published work [20]. HPLC analysis was performed using an Agilent Technologies 1200 (Wilmington, DE, USA) liquid chromatography system equipped with an online degasser, a binary pump, a column oven and a photodiode array detector. The data was recorded and analyzed using Agilent's ChemStation software (Chemstation for LC 3D system (Rev. B. 02. 01-SR2 [260]).

Separation was performed on the XTerra® RP18 column, 4.6×100 mm, particle size 3.5 μm (Waters Corporation, Milford, MA, USA) using three different constant ionic strength buffer solutions (I = 25 mmol/L) prepared at pH values 4.4, 7.4 and 9.1, as the aqueous component in the mobile phase while methanol added as an organic modifier. All measurements were performed at 25°C with a constant flow rate of 0.8 mL min^-1 and UV detection in the range of 200-280 nm. The injection volume was 20 μL. Retention times were determined in the isocratic elution mode using at least six mobile phases of methanol/buffer (pH 4.4, 7.4 or 9.1) with a methanol concentration of 75-2 % depending on the retention properties of compounds. The retention factor k was calculated for each mobile phase composition according toEquation (1):

(1)

where t_r is the retention time of the tested compound and t₀ is the dead volume measured with KNO₃ as a non-retentive marker. The values corresponding to 100 % of the buffered eluent (log k_w) were determined by extrapolation according toEquation (2):

(2)

where log k_w is the intercept, S is the slope of the regression line, and φ is the volume fraction of the organic modifier in the mobile phase. Log k_w of the analyte at three different experimental conditions, methanol/buffer pH 4.4, methanol/buffer pH 7.4 and methanol/buffer pH 9.1 (log k_w4.4, log k_w7.4 and log k_w9.1, respectively) were calculated for all investigated compounds and used for the QSRR analysis.

Solutions for CE analysis

Stock solutions of harman, harmine, clopamide, indapamide, rilmenidine, mianserin, doxazosin, carvedilol, clozapine, olanzapine and triamterene were prepared in methanol (c = 1 mg/mL) and diluted with water to a final concentration of 5.8 μg/mL for triamterene, 60 μg/mL for rilmenidine and 30 μg/mL for the other substances. Brimonidine was dissolved in 0.1 % formic acid, while the remaining substances were dissolved in water. Acetone 2 vol.% was used as electroosmotic flow (EOF) marker. Depending on UV responsiveness and solubility, samples were prepared at different concentrations, from 5.8 to 60 μg/mL.

CE equipment and working conditions

The CE working conditions are described in our previously published paper [20]. All experiments were performed using the SpectraPhoresis 500-capillary electrophoresis system (Spectra Physics Analytical, USA) with UV detector. Data were recorded and analyzed using ChromQuest software version 4.0 (Thermo Finnigan, USA).

The separations were performed with an uncoated fused capillary (total length 31.5 cm, 50 μm id, effective length 24 cm, Polymicro Technologies, USA) applying a voltage of 11 kV and at 25 °C. The samples were injected hydrodynamically and detection was performed in the 200-280 nm range. The new capillary was rinsed stepwise with 0.1 M NaOH (15 min), water (10 min) and a running buffer (10 min). Finally, a 10 min high voltage was applied through the background electrolyte-filled capillary to equalize the inner surface, stabilize the electroosmotic flow and ensure good reproducibility of injections from run to run. Background solutions with constant ionic strength (I = 25 mmol/L) were prepared at three different pH values by mixing the corresponding amounts of CH₃COOH/NaOH, NaH₂PO₄/NaOH and H₃BO₃/NaOH for pH 4.4, 7.4 and 9.1, respectively. All compounds were injected in three replicates at each pH (4.4; 7.4 and 9.1). Between runs, the capillary was rinsed with the background electrolyte for 1 minute. The effective electrophoretic mobility, μ_eff, of the analyte at three different pH values 4.4; 7.4 and 9.1 (μ_eff4.4, μ_eff7.4 and μ_eff9.1, respectively) is expressed in cm² / V s and was calculated using theEquation (3):

(3)

where L_t is the total length of the capillary (cm), L_eff is the effective length of the capillary (cm), U is the applied voltage (V), t_m is the migration time of the analyte (s) and t_eof is the migration time of the electroneutral EOF marker acetone (s). The calculated μ_eff values (μ_eff4.4, μ_eff7.4 and μ_eff9.1) were used as dependent variables in QSMR analysis.

Computational methods

Clonidine, moxonidine, tizanidine, brimonidine, rilmenidine, and tramazoline are cyclic guanidines or amidine structures that can exist in two main tautomeric forms (amino and imino). The stability of their amino and imino tautomers was investigated at the B3LYP/6–31G(d, p) level of density functional theory-(DFT) [25,26] using the Gaussian 98 program [27]. Based on the Self Consistent Field Energy calculated for neutral amino and imino tautomers of the compounds, it was shown that clonidine, moxonidine, tizanidine, brimonidine and tramazoline exist as more stable imino tautomers, while the predominant tautomeric form of rilmenidine is the amino form. The calculation of pK_a and the selection of the dominant molecule/cation species under experimental conditions (pH 4.4, 7.4 and 9.1) were performed for 29 α-adrenergic and imidazoline receptor ligands using the Marvin 5.5.1.0 ChemAxon program [28].

Structural optimization (selected tautomers and molecules/cations species at three different pH values) was performed using the B3LYP/3–21(d,p) levels of the DFT in the Gaussian 98 program [27]. Molecular descriptors were calculated for all investigated compounds in the programs Dragon [29], Gaussian 98 (B3LYP/3-21G(d,p) basis set) [27], Marvin 5.5.1.0 ChemAxon [28], and Chem3D Ultra 7.0.0 [30]. In addition, descriptors such as hardness (η), global softness, chemical potential (μ), electronegativity (χ) and electrophilicity index (ω), which have been extensively used to interpret various aspects of chemical bonding and reaction mechanism, were included in the set of calculated properties [31]. The partial least squares regression analysis started with 3445 computed descriptors. The descriptors with constant values were excluded from the modelling, as were descriptors with an intercorrelation greater than 0.996. For a pair of correlated descriptors, the one with the better correlation to Y was retained, while the other was excluded from the analysis. In the case of the MLR analysis, the cut-off value for the intercorrelation was set at 0.9 [32].

Quantitative structure-retention relationship and quantitative structure-mobility relationship modelling QSRR and QSMR modelling studies were performed for 29 imidazoline and α-adrenergic receptors ligands using PLS and stepwise MLR statistical methods at pH values of 4.4, 7.4 and 9.1 and on both HPLC and CE systems. An overview of the dataset was performed for each pH value and each chromatographic or electrophoretic system was examined in order to identify and exclude possible outliers before modelling. For this purpose, the scatter plots in the Simca P 12+ program were used [33], in which the pool of calculated molecular descriptors and the response variables are organised as an X-matrix. The scatter plot t₁ vs. t₂ is a window in X-space, showing how the X observations relate to each other, where t₁ and t₂ are scores (one vector for each model dimension) representing new variables computed as linear combinations of X. The score t₁ (first component) explains the largest variation of the X space, followed by t₂ and so on. For a two-dimensional score plot, the tolerance ellipse is presented based on Hotelling's T2. Observations that lie outside the ellipse are outliers. The t-u plot (t₁ vs. u₁) shows the relationship between X and Y. In addition, the degree of fit (a good fit corresponds to a small scatter around the straight line), indications of curvature and outliers can also be seen. The u score (one vector for each model dimension) is new variable summarizing Y, so as to maximize the correlation with the scores t. Based on the plots (t₁ vs. t₂ and t₁ vs. u₁), the remaining compounds were distributed among the training and test sets such that each chemical group (i.e., guanidine, 2-aminoimidazoline, 2-arylmethylimidazoline, phenylethylamine etc.) has a representative in the test set and the log k_w4.4, log k_w7.4, log k_w9.1, μ_eff4.4, μ_eff7.4 and μ_eff9.1 of the compounds in the test set are homogeneously distributed over the entire range of values of log k_w4.4, log k_{w 7.4}, log k_w9.1, μ_eff4.4, μ_eff7.4 and μ_eff9.1, respectively. The selected training and test sets contained at least 20 compounds used for model building and at least 5 compounds used for external validation. In order to perform a meaningful comparison between the different methods (MLR and PLS) used to develop the QSRR models, the same training and test set was used for each pH value. Therefore, six independent training and test sets were created, one for each dependent variable (log k_w4.4, log k_w7.4, log k_w9.1, μ_eff4.4, μ_eff7.4 and μ_eff9.1). The predictive power and robustness of the models were estimated using the cross-validated parameter R² (Q²), which was calculated fromEquation (4):

(4)

InEquation (4), PRESS is a parameter calculated using the leave-one-out (LOO) approach where each compound from the training set was deleted once and a new model was created with the remaining compounds and used to predict the Y-value of the deleted compound. The procedure was repeated until all compounds had been deleted once. For all created models, the squared sum of the differences between observed and LOO-predicted values (e(i)) (PRESS) was calculated according toEquation (5):

(5)

The models with Q² ≥ 0.5 can be considered to have good predictive capability [34]. The root mean squared error of estimation (RMSEE) was calculated to characterize the predictive ability of the models for the compounds in the training set,Equations (6):

(6)

where n is the number of compounds in the training set, while Y_{obs(training)} and Y_{pred(training)} denote the experimental and predicted values for the compounds in the training set.

In addition to internal validation, the predictive power of all created models was estimated by external validation using the following parameters inEquations (7) and(8):

(7)

where RMSEP is the root mean square error of prediction, n is the number of compounds in the test set, while Y_obs(test) and Y_pred(test) are the experimental and predicted values for the compounds in the test set.

(8)

where Y_pred(test) and Y_obs(test) are the predicted and observed values of the dependent variables of the compounds in the test set, respectively, and Y̅_training indicates the mean values of the dependent variables of the compounds in the training set. For a predictive QSRR/QSMR model, the R²_pred value should be higher than 0.5 [35].

The rigorous external validation parameters proposed by Roy () [24] and Golbraikh and Tropsha [22,23] were also applied to all created models and were used to select the most reliable models for the prediction of chromatographic and electrophoretic behaviour at each pH value.

According to Ojha and Roy [35], is validation metric calculated according toEquation (9) using observed (y-axis) and predicted (x-axis) values:

(9)

where r² is the determination coefficient for the least squares regression line (with intercept) correlating observed (y-axis) and predicted (x-axis) values and is the determination coefficient for the least squares regression line (without intercept) correlating observed (y-axis) and predicted (x-axis) values, is validation metric calculated according toEquation (10) using observed (x-axis) and predicted (y-axis) values

(10)

where is the determination coefficient for the least squares regression line (without intercept) correlating observed (x-axis) and predicted (y-axis) values. is average of and , while is the absolute difference between and .

Models were considered acceptable if they met all of the following conditions:

According to criteria proposed by Golbraikh and Tropsha, following conditions should be achieved: (i) Q² > 0.5; (ii) R² > 0.6, (iii) [(R² - R₀²) / R²] < 0.1 or [(R² - R'₀²) / R²] < 0.1; (iv) 0.85 ≤ k ≤ 1.15 or 0.85 ≤ k' ≤ 1.15 where Q² is the cross-validated correlation coefficient calculated for the training set, but all other criteria are calculated for the test set [22,23]. R₀² is the coefficient of determination (predicted versus observed values) for regressions through the origin. R'₀² is the coefficient of determination (observed versus predicted values) for regressions through the origin. K and K′ are slopes of regression lines through the origin.

Determination of log k_w values

The retention behaviour in HPLC system was monitored by calculating extrapolated retention factors log k_w corresponding to pure buffer as mobile phase. The log k_w values are considered to be better lipophilicity indices compared to the isocratic log k, as their values are of the same order of magnitude as the log P / log D octanol-water [38]. The values of log k_w (intercepts) and slopes (S) at all investigated pH values: 4.4, 7.4 and 9.1 are shown inTable S2 (Supplementary material). In an acidic environment (pH 4.4), the obtained log k_w values are in the range from 0.09 (phenilephrine) to 3.75 (carvedilol). Under the given conditions, only two compounds (clopamide and indapamide) are present in neutral (molecular) form, while the majority of the other compounds are completely ionized (over 99 %) [28]. This is also the reason for the lower log k_w values of the investigated compounds at pH 4.4 compared to pH 7.4 and 9.1, where the compounds are present in ionized form to a lesser extent or are predominantly non-ionized (pH 9.1). Therefore, as the pH increases, the lipophilicity of the compounds and, consequently, their log k_w values increase (Table S2, Supplementary material).

Determination of effective electrophoretic mobility

The effective electrophoretic mobility of the investigated compounds was determined in the presence of acetone as a neutral marker, and the results obtained under the examined conditions (pH 4.4, 7.4 and 9.1) are presented inTable S4 (Supplementary Material). At pH 4.4, 27 compounds that move faster than the neutral marker are in the form of cations and reach their maximum effective mobility, while the effective mobility of clopamide and indapamide, which are in neutral form under the studied conditions, is zero. The range of the obtained μ_eff4.4 values is between 0 (indapamide, clopamide) and 28.19×10^-5 cm² / V s (harmane). At a physiological pH of 7.4, compounds with pK_a values around 7.4 have reached their intermediate mobility, indapamide and clopamide co-migrate with the EOF marker (μ_eff = 0), and compounds with a pK_a value above 10 (Table S1, Supplementary material), a high percentage of which are in the form of cations under the given conditions, have maintained an effective mobility similar to that in an acidic environment. The resulting range of effective mobility is between 0 and 24.18×10^-5 cm² / V s (naphazoline). In an alkaline environment at pH 9.1, negatively charged ions of clopamide and indapamide migrate to the cathode more slowly than EOF markers and exhibit negative values of effective mobility. Uncharged compounds migrate together with the EOF marker and their mobility is zero, while the derivatives of 2-methylimidazoline with pK_a values above 10 maintain a high degree of mobility (μ_eff = 25.05×10^-5 cm² / V s, tetrahydrozoline) (Table S1 andTable S4).

Quantitative structure-mobility relationship models

As a result of the QSMR studies applied to the μ_eff data obtained at three pH values (μ_eff4.4, μ_eff7.4 and μ_eff9.1), six models were created: MLR-QSMR (μ_eff4.4), PLS-QSMR (μ_eff4.4), MLR-QSMR (μ_eff7.4), PLS-QSMR (μ_eff7.4), MLR-QSMR (μ_eff9.1), and PLS-QSMR (μ_eff9.1).

The QSMR models, which describe the mobility of the investigated compounds at a pH of 4.4, were created with 20 compounds in the training set. Three compounds, one with the highest electrophoretic mobility (olanzapine μ_eff4.4 = 33.632 ± 0.036 10^-5 cm² / V s) and two with the lowest electrophoretic mobility (clopamide μ_eff4.4 = 0.000 ± 0.000 and indapamide μ_eff4.4 = 0.000 ± 0.000) clearly showed a significant deviation from the regression line on the t₁ vs. u₁ scater plot and were therefore identified as outliers. The remaining 6 compounds (amiloride, carvedilol, ephedrine, mianserin, tizanidine and xylometazoline) were used for external validation.

The most significant MLR-QSMR model at pH 4.4 was formed with 4 descriptors,Equation (17):

(17)

The PLS analysis also selected the model with the four descriptors that showed the greatest influence on the dependent variable μ_{eff 4.4},Equation (18)

(18)

According to the better statistical parameters of the PLS-QSMR model (Q² = 0.931, F = 115.508, p = 1.28×10^-10, R²_test = 0.897 and RMSEP = 0.984) compared to the MLR-QSMR model (Q² = 0.880, F = 64.338, p = 2.92×10^-9, R²_test = 0.876 and RMSEP = 1.063) (Tables 3 and4), the PLS-QSMR model can be selected as the optimal and reliable model for predicting the electrophoretic mobility of related compounds at pH 4.4.

Table 4. External validation parameters for QSMR models, based on Golbraikh, Tropsha, and Roy [22-24]

Model	R2	R02	(R2-R02)/R2	k	R'02	(R2-R'02)/R2	k'	R2pred
MLR-QSMR (μeff 4.4)	0.876	0.862	0.016	0.999	0.876	0.000	0.999	0.869	0.772	0.865	0.819	0.094
PLS QSMR (μeff 4.4)	0.893	0.882	0.013	1.002	0.893	0.000	0.996	0.888	0.798	0.888	0.843	0.089
MLR-QSMR (μeff 7.4)	0.788	0.771	0.022	1.003	0.781	0.009	0.980	0.799	0.685	0.722	0.703	0.037
PLS-QSMR (μeff 7.4)	0.686	0.563	0.178	0.938	-0.818	2.192	1.030	0.570	0.446	-0.155	0.145	0.601
MLR-QSMR (μeff 9.1)	0.879	0.860	0.022	0.843	0.814	0.075	1.096	0.802	0.758	0.654	0.706	0.104
PLS-QSMR (μeff 9.1)	0.873	0.834	0.045	0.813	0.750	0.141	1.118	0.747	0.701	0.567	0.634	0.134

QSMR models at pH 7.4 were formed with 20 compounds in the training set, while 5 compounds (ephedrine, olanzapine, oxymetazoline, tamsulosin and tizanidine) were retained in the test set. Considering the fact that the investigated data sets are very different in their acid-base properties, the resulting differences in effective electrophoretic mobility are significant (Table S1, Supplementary material).

Clopamide and indapamide, which carry a weakly acidic sulfonamide group, are still predominantly unionized at pH 7.4 and move together with the electroosmotic flow, resulting in an electrophoretic mobility of zero.

A very low effective electrophoretic mobility is also obtained for triamterene (μ_eff7.4 = 1.140±0.053××10^-5 cm² / V s) as a weak base and guanfacine (μ_eff7.4 = 5.083 ± 0.025×10^-5 cm² / V s). The Y-values of these compounds in relation to the calculated X-values showed a significant deviation in the scatter plot t₁ vs. u₁ and were identified as outliers. The most significant MLR-QSMR model is composed of 4 descriptors,Equation (19):

(19)

Using PLS analysis, a model was constructed with 5 molecular descriptors that significantly affect the electrophoretic mobility of the studied compounds at pH 7.4,Equation (19):

(20)

For the MLR-QSMR model, lower values for RMSEE and RMSEP, slightly better parameters Q² and F value as well as significantly higher values for R²_trening and R²_test were obtained compared to the PLS-QSMR model (Tables 3 and4). In addition, the PLS-QSMR model did not meet external validation criteria established by Golbraikh and Tropsha [22] [(R² - ) / R² = 0.178 > 0.1; R'₀²= -0.818; (R²- R'₀² ) / R² = 2.192 > 0.1] (Table 4); and Roy [23,24] [ =0.446 and = -0.155 are not closed; = 0.145 < 0.5; = 0.601 > 0.2] (Table 4) indicating that the MLR-QSMR regression equation can be reliably applied to predict the electrophoretic mobility of related compounds at pH 7.4.

At a pH of 9.1, nine compounds migrate together with EOF and have an effective mobility of 0. Five compounds with an effective mobility of zero remain in the training set, while four compounds move to the test set taking into account that all chemical clusters have a representative in the test set. Since all created models were unable to predict the mobility of harman and mianserin (μ_eff = 0) and taking into account that these two compounds had the greatest deviation on the t₁ vs. u₁ plot, among others from the training set with zero mobility, these two compounds were excluded from further analysis.

QSMR models at pH 9.1 were created with 21 compounds in the training set, while 6 compounds (doxazosin, ephedrine, idazoxan, olanzapine, tizanidine, xylometazoline) were used for external validation.

By MLR analysis, four significant molecular descriptors were selected,Equation (21):

(21)

While the statistically best PLS model was formed with 5 important molecular parameters,Equation (22):

(22)

Appropriate validation criteria were met for both MLR-QSMR/PLS-QSMR models created (Tables 3 and4), with the exception of the value (R²-R'₀²)/R² 0.141 > 0.1 of the PLS-QSMR (μ_eff9.1) model (Table 4). Due to the higher values of Q², F, R²_trening, R²_test (Q² = 0.891, F = 58.736, R²_traning = 0.936 and R²_test =0.879) for the MLR model than for the PLS model (Q² = 0.882, F = 29.464, R²_trening = 0.916 and R²_test = 0.873) and the lower RMSEE and RMSEP (RMSEE = 2.640 and RMSEP = 3.794) for the MLR model than for the PLS model (RMSEE=3.033 and RMSEP = 4.290), the MLR-QSMR model: MLR-QSMR (μ_eff9.1) = ƒ(SM1_Dz (Z); SM15_EA (dm); HOMO [B3LYP/3--21G (d, p)]; ISH) was selected as the optimal model for predicting the effective mobility of related compounds at a given pH of 9.1.

Plots of observed vs. predicted values for compounds in the training and test sets of the selected QSMR models are depicted inFigure 2.

Figure 2. Observed vs. predicted values in selected QSMR models: A - PLS-QSMR (μeff4.4); B - MLR-QSMR (μeff7.4); C - MLR-QSMR (μeff9.1)

It is interesting to note that inFigure 2B, which shows the correlation between the calculated and predicted values of the QSMR model at pH 7.4, two clusters of data can be observed. The upper cluster includes compounds whose experimentally determined effective mobility is greater than 19×10^-5 cm² / V s and experimental pK_a value is greater than 8, and the lower cluster includes compounds with experimental effective mobility of less than 15×10^-5 cm² / V s and pK_a value less than 8 (Table S1 and S4, Supplementary material). The selected MLR-QSMR model could be used for a rough prediction of the pK_a values of new imidazoline analogs.

The values of the molecular descriptors in the selected QSMR models are listed inTable S5 (Supplementary Material).