METHOD FOR NON-TARGETED CHARACTERISATION OF A SOLUTION COMPRISING A PLURALITY OF SOLUTES

Abstract

A method for characterising a solution S.sub.0 comprising a plurality of solutes, which comprises at least the steps consisting in: subjecting the solution S.sub.0 to a sequence of N successive rows of liquid-liquid extractions, this sequence leading to a total of [2.sup.(N+1)−1] different phases, 2.sup.N phases of which are issued from the last row N of partitions; acquiring experimental data by measuring an extensive and conservative quantity X in the 2.sup.N phases issued from the last row N of partitions of said sequence; and subjecting the experimental data to mathematical processing allowing to determine the distribution of the solutes of the solution S.sub.0, which contribute to the values of the quantity X obtained experimentally, according to various hydrophilicity/lipophilicity values.

Claims

1. A method for characterising a solution S.sub.0 comprising a plurality of solutes, which comprises at least the steps consisting in: a) subjecting the solution S.sub.0 to a sequence of N rows i of partitions, i ranging from 1 to N and N being greater than or equal to 2, the rows i of partitions comprising: for i=1, a mixture of a sample of the solution S.sub.0 with a volume of an organic S.sub.org or aqueous S.sub.aq solution immiscible with the solution S.sub.0 to obtain, after separation of the mixture into two phases, an aqueous phase φ(i=1,aq) and an organic phase φ(i=1,org); and for i=2 to N: a mixture of each aqueous phase φ(i−1,aq) with a volume of the solution S.sub.org to obtain, after separation of the mixture into two phases, an aqueous phase φ(i,aq) and an organic phase φ(i,org); a mixture of each organic phase φ(i−1,org) with a volume of the solution S.sub.aq to obtain, after separation of the mixture into two phases, an aqueous phase φ(i,aq) and an organic phase φ(i,org); b) subjecting all the aqueous and organic phases obtained at the row N to a measurement of an extensive and conservative quantity X to obtain an experimental vector {right arrow over (V)}exp comprising 2.sup.N measured values of X; c) defining theoretical vectors {right arrow over (V)}theor(D.sub.k) for y partition coefficient values D.sub.k, with y greater than or equal to 2 and k ranging from 1 to y, each theoretical vector comprising 2.sup.N values of X calculated for the aqueous and organic phases obtained at the row N and for one of the y values D.sub.k; d) carrying out a parametric adjustment between the vectors {right arrow over (V)}theor(D.sub.k) and the vector {right arrow over (V)}exp to obtain a distribution of the solutes of the solution S.sub.0, which contribute to the 2.sup.N measured values of X, as a function of to the y values D.sub.k.

2. The method of claim 1, wherein N is between 2 and 20.

3. The method of claim 1, wherein the solution S.sub.0 is an aqueous solution.

4. The method of claim 3, wherein the solution S.sub.org is an organic solvent immiscible in water and the solution S.sub.aq is water, optionally comprising a ground salt or a pH buffer or both.

5. The method of claim 1, wherein the solution S.sub.0 is an organic solution.

6. The method of claim 5, wherein the solution S.sub.aq is water and the solution S.sub.org is an organic solvent immiscible in water.

7. The method of claim 4, wherein the organic solvent is a C8 to C12 alcohol, a C5 to C16 alkane, cyclohexane or an aromatic hydrocarbon.

8. The method of claim 6, wherein the organic solvent is a C8 to C12 alcohol, a C5 to C16 alkane, cyclohexane or an aromatic hydrocarbon.

9. The method of claim 1, wherein the quantity X is an amount of substance, a concentration, an absorbance, a fluorescence, a radioactivity or an opacity.

10. The method of claim 1, wherein defining each of the theoretical vectors {right arrow over (V)}theor(D.sub.k) comprises: applying to the partition of the sample of the solution S.sub.0, the equations (1a) and (1b): $\begin{array}{cc}{X}_{\left(i=1,\mathrm{aq}\right)}\left(D_k\right)=X_0⨯\frac{1}{\left(1+D_k⨯\frac{V_{\left(0,\mathrm{org}\right)}}{V_{\left(0,aq\right)}}\right)}& \left(1a\right)\end{array}$ $\begin{array}{cc}{X}_{\left(i=1,\mathrm{org}\right)}\left(D_k\right)=X_0⨯\frac{D_k⨯\frac{V_{\left(0,\mathrm{org}\right)}}{V_{(0,\mathrm{aq}})}}{\left(1+D_k⨯\frac{V_{\left(0,\mathrm{org}\right)}}{V_{\left(0,\mathrm{aq}\right)}}\right)}& \left(1b\right)\end{array}$ applying to the partitions of the phases φ(i,aq), the equations (2a) and (2b): $\begin{array}{cc}{X}_{\left(i+1,\mathrm{aq}\right)}\left(D_k\right)=X_{\left(i,\mathrm{aq}\right)}\left(D_k\right)⨯\frac{1}{\left(1+D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{\left(i,\mathrm{aq}\right)}}\right)}& \left(2a\right)\end{array}$ $\begin{array}{cc}{X}_{\left(i+1,\mathrm{org}\right)}\left(D_k\right)=X_{\left(i,\mathrm{aq}\right)}\left(D_k\right)⨯\frac{D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{(i,\mathrm{aq}})}}{\left(1+D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{\left(i,\mathrm{aq}\right)}}\right)}& \left(2b\right)\end{array}$ applying to the partitions of the phases φ(i,org), the equations (3a) and (3b): $\begin{array}{cc}{X}_{\left(i+1,\mathrm{aq}\right)}\left(D_k\right)=X_{\left(i,\mathrm{org}\right)}\left(D_k\right)⨯\frac{1}{\left(1+D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{\left(i,\mathrm{aq}\right)}}\right)}& \left(3a\right)\end{array}$ $\begin{array}{cc}{X}_{\left(i+1,\mathrm{org}\right)}\left(D_k\right)=X_{\left(i,\mathrm{org}\right)}\left(D_k\right)⨯\frac{D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{(i,\mathrm{aq}})}}{\left(1+D_k⨯\frac{V_{\left(i,\mathrm{org}\right)}}{V_{\left(i,\mathrm{aq}\right)}}\right)}& \left(3b\right)\end{array}$ where: X.sub.(i=1,aq) is an expected value of X for solutes having the value D.sub.k and for the phase φ(i=1,aq), X.sub.(i=1,org) is an expected value of X for solutes having the value D.sub.k and for the phase φ(i=1,org), X.sub.0 is a value of X measured in the solution S.sub.0, V.sub.(0,org) is a volume of the sample of solution S.sub.0 if the solution S.sub.0 is an organic solution or the volume of solution S.sub.org used to partition the sample of the solution S.sub.0 if the solution S.sub.0 is an aqueous solution, V.sub.(0,aq) is a volume of the sample of solution S.sub.0 if the solution S.sub.0 is an aqueous solution or the volume of solution S.sub.aq used to partition the sample of the solution S.sub.0 if the solution S.sub.0 is an organic solution, X.sub.(i+1,aq) is an expected value of X for solutes having the value D.sub.k and for a phase φ(i+1,aq) issued from the partition of a phase φ(i,aq) or of a phase φ(i,org), X.sub.(i+1,org) is an expected value of X for solutes having the value D.sub.k and for a phase φ(i+1,org) issued from the partition of a phase φ(i,aq) or of a phase φ(i,org), X.sub.(i,aq) is an expected value of X for solutes having the value D.sub.k and for the partitioned phase φ(i,aq), X.sub.(i,org) is an expected value of X for solutes having the value D.sub.k and for the partitioned phase φ(i,org), V(i,aq) is a volume of the partitioned phase φ(i,aq) or the volume of solution S.sub.aq used to partition the phase φ(i,org), V(i,org) is a volume of the partitioned phase φ(i,org) or the volume of solution S.sub.org used to partition the phase φ(i,aq), whereby, for the aqueous and organic phases issued from the row N, 2.sup.N expected values of X are obtained for solutes having the value D.sub.k.

11. The method of claim 1, wherein the parametric adjustment comprises determining a set of percentages P.sub.k as weighting coefficients such that:
{right arrow over (V)}exp≈Σ(P.sub.k(%)×{right arrow over (V)}théor(D.sub.k)).

12. The method of claim 11, wherein the adjustment also comprises adjusting the values D.sub.k.

13. The method of claim 1, which comprises expressing the distribution of the solutes of the solution S.sub.0, which contribute to the 2.sup.N measured values of X, as a function of the y values D.sub.k, in the form of a histogram.

14. The method of claim 1, wherein the solutes are organic solutes.

Description

BRIEF DESCRIPTION OF THE FIGURES

[0062] FIG. 1A and FIG. 1B illustrate, schematically and as an example, the usefulness of subjecting two solutions 1 and 2 having different compositions to a sequence of N rows of partitions for their characterisation and, thus, the highlighting of their difference in composition.

[0063] FIG. 2 illustrates, schematically and as an example, the phases that are obtained in the case in which a solution S.sub.0 is subjected to a sequence of 3 rows of partitions.

[0064] FIG. 3 illustrates, schematically and as an example, a mathematical processing of the experimental data and of the result obtained by this mathematical processing.

[0065] FIG. 4 illustrates, schematically and as an example, the results of an experiment that was carried out with a known mixture of three solutes and allowed to validate the method of the invention.

[0066] FIG. 5 illustrates, as an example, the results of applying the method of the invention to the evaluation of the degree of purity of a commercial substance, namely bisphenol A marked with .sup.14C, and to the characterisation of the quantity and of the lipophilicity of an impurity that this substance has.

DETAILED DISCLOSURE OF PREFERRED EMBODIMENTS

Reminders of Theory

[0067] The partition coefficient of a solute A expresses the distribution of this solute between two immiscible phases, respectively aqueous and organic, that are placed in contact with one another.

[0068] It is typically defined by a ratio of concentrations, noted below as D(A), according to the equation (4):

[00004]$\begin{array}{cc}D\left(A\right)=\frac{{\left[A\right]}_{\mathrm{org}}}{{\left[A\right]}_{aq}}& \left(4\right)\end{array}$

[0069] where:

[0070] [A].sub.org is the molar concentration of the solute A in the organic phase at equilibrium, and

[0071] [A].sub.aq is the molar concentration of the solute A in the aqueous phase at equilibrium.

[0072] For a solute A that appears in solution as several species (such as a weak acid that is dissociated into a base A.sup.− and a proton), the partition coefficient D(A) is defined by the equation (5):

[00005]$\begin{array}{cc}D\left(A\right)=\frac{{\Sigma \left[A_i\right]}_{\mathrm{org}}}{{\Sigma \left[A_i\right]}_{aq}}& \left(5\right)\end{array}$

[0073] where:

[0074] [A.sub.i].sub.org is the molar concentration of each species of the solute A in the organic phase at equilibrium,

[0075] [A.sub.i].sub.aq is the molar concentration of each species of the solute A in the aqueous phase at equilibrium.

[0076] It is also possible to define the partition coefficient by a ratio in numbers of moles, noted below as D′(A), according to the equation (6):

[00006]$\begin{array}{cc}{D}^{\prime }\left(A\right)=\frac{{n\left(A\right)}_{\mathrm{org}}}{{n\left(A\right)}_{aq}}=D\left(A\right)\frac{V_{\mathrm{org}}}{V_{aq}}& \left(6\right)\end{array}$

[0077] where:

[0078] n(A).sub.org is the number of moles of the solute A present in the organic phase at equilibrium,

[0079] n(A).sub.aq is the number of moles of the solute A present in the aqueous phase at equilibrium,

[0080] V.sub.org is the volume of the organic phase, and

[0081] V.sub.aq is the volume of the aqueous phase.

[0082] For a solute A that appears in solution as several species, the equation (6) becomes the equation (7):

[00007]$\begin{array}{cc}{D}^{\prime }\left(A\right)=\frac{\Sigma {n\left(A_i\right)}_{\mathrm{org}}}{\Sigma {n\left(A_i\right)}_{aq}}& \left(7\right)\end{array}$

[0083] where:

[0084] n(A.sub.i).sub.org is the number of moles of each species of the solute A present in the organic phase at equilibrium, and

[0085] n(A.sub.i).sub.aq is the number of moles of each species of the solute A present in the aqueous phase at equilibrium.

[0086] It should be noted that the partition coefficients D and D′ do not have a dimension and are generally expressed in the form of their logarithm to the base ten, respectively noted below as log D and log D′.

[0087] The partition of a solute A in solution between two phases, respectively aqueous and organic, leads to the following outcomes (8a), (8b), (9a) and (9b):

[00008]$\begin{array}{cc}{C}_{aq}=C_0⨯\frac{1}{\left(1+D\right)}& \left(8a\right)\end{array}$$\begin{array}{cc}{C}_{\mathrm{org}}=C_0⨯\frac{D}{\left(1+D\right)}& \left(8b\right)\end{array}$$\begin{array}{cc}{n}_{aq}=n_0⨯\frac{1}{\left(1+D^{\prime }\right)}& \left(9a\right)\end{array}$$\begin{array}{cc}{n}_{\mathrm{org}}=n_0⨯\frac{D^{\prime }}{\left(1+D^{\prime }\right)}& \left(9b\right)\end{array}$

[0088] where:

[0089] C.sub.0 is the initial concentration of the solute A (or the sum of the initial concentrations of its species) in the solution subjected to the partition,

[0090] C.sub.aq is the concentration of the solute A (or the sum of the concentrations of its species) in the aqueous phase issued from the partition,

[0091] C.sub.org is the concentration of the solute A (or the sum of the concentrations of its species) in the organic phase issued from the partition,

[0092] n.sub.0 is the number of moles of the solute A (or the sum of the moles of its species) initially present in the solution subjected to the partition,

[0093] n.sub.aq is the number of moles of the solute A (or the sum of the moles of its species) present in the aqueous phase issued from the partition, and

[0094] n.sub.org is the number of moles of the solute A (or the sum of the moles of its species) present in the organic phase issued from the partition.

2. Usefulness of a Sequence of N Rows of Partitions and Application to the Method of the Invention (Step a) of the Method)

[0095] When a solution comprising several solutes is subjected to a single row of partitions, the measurement of a quantity X, such as a concentration, in the aqueous and organic phases issued from the first row of partitions provides a weighted average of the partition coefficient of each of the solutes contributing to this quantity.

[0096] Consequently, for a given quantity X, it is possible to obtain identical partition coefficients for solutions having different compositions if these solutions are subjected to a single row of partitions.

[0097] However, if these solutions are subjected to a second row of partitions, then the partition coefficients obtained for the phases issued from the second row of partitions allow to differentiate the solutions.

[0098] This is illustrated in FIGS. 1A and 1B for two solutions, one of which—called solution 1—only comprises one solute which is as hydrophilic as lipophilic (log D=0) whereas the other—called solution 2—comprises two solutes in equimolar quantities, one of which is hydrophilic (log D=−1) and the other of which is lipophilic (log D=+1), and which are subjected to two rows of partitions, each partition being carried out with identical volumes, noted as V, of aqueous and organic solutions.

[0099] In FIGS. 1A and 1B:

[0100] C.sub.0 corresponds to the total concentration of solute(s) measured in the solutions 1 and 2, and the extensive quantity X would thus be n.sub.0=C.sub.0×V.

[0101] C.sub.11 and C.sub.12 correspond respectively to the total concentrations in the two phases, respectively aqueous and organic, issued from the first row of partitions, noted as i=1, of the solutions 1 and 2.

[0102] C.sub.21 and C.sub.23 correspond to the total concentrations in the two aqueous phases issued from the second row of partitions, noted as i=2, while

[0103] C.sub.22 and C.sub.24 correspond to the total concentrations in the two organic phases issued from the second row of partitions.

[0104] As visible in FIG. 1B, the solutes of solution 2 are distributed between aqueous phase and organic phase differently from the solute of solution 1 during the first row of partitions. Nevertheless, their respective contributions to the quantity X “balance themselves” (C.sub.11=C.sub.12=0.5×C.sub.0) so that in the case of solution 2, an average log D of 0 and, therefore, equal to that obtained for solution 1 is obtained. The solutions 1 and 2 cannot therefore be differentiated.

[0105] However, the logs D obtained for the phases issued from the second row of partitions of solution 2, which are respectively equal to −1 and +1, allow to differentiate this solution from solution 1, the log D of which is equal to O.

[0106] It is this principle that is put to good use in the method of the invention according to which the solution S.sub.0 that it is sought to characterise is subjected to a sequence of N rows of partitions, N being an integer greater than or equal to 2.

[0107] The first row of partitions corresponds to the partition of a sample of the solution S.sub.0 that is carried out by mixing this sample with a volume of a solution immiscible with the solution S.sub.0 in order for the solutes present in the solution S.sub.0 to be distributed between the two phases forming the mixture, then, once the solutes are at equilibrium, by separating the two phases of the mixture from one another, for example by decantation or centrifugation.

[0108] If the solution S.sub.0 is an aqueous solution, then the solution immiscible with it is an organic solution, typically an organic solvent immiscible in water, for example n-octanol (that has been, preferably, previously hydrated, that is to say pre-balanced by contact with water).

[0109] If the solution S.sub.0 is an organic solution, then the solution immiscible with it is an aqueous solution, typically water, preferably distilled.

[0110] After the first row of partitions, two phases, respectively aqueous and organic, are thus obtained.

[0111] Each row of partitions after the first row of partitions corresponds to the partitions of the phases issued from the row of partitions that precedes it, partitions that are carried out:

[0112] by mixing each aqueous phase with a volume of an organic solution then, once the solutes are at equilibrium, by separating the mixture thus obtained into two phases, respectively aqueous and organic, for example by decantation or centrifugation, and

[0113] by mixing each organic phase with a volume of an aqueous solution then, once the solutes are at equilibrium, by separating the mixture thus obtained into two phases, respectively aqueous and organic, for example by decantation or centrifugation.

[0114] If the solution S.sub.0 is an aqueous solution, then:

[0115] the organic solution, which is used in each of the rows of partitions after the first row of partitions, is the same as that which is used in the first row of partitions, whereas

[0116] the aqueous solution, which is used in each of the rows of partitions after the first row of partitions, is an aqueous solution that has, preferably, an ionic strength and a pH close to those of the aqueous solution S.sub.0 and that comprises, if necessary, a ground salt such as KCl or NaClO.sub.4 and/or a pH buffer in water, preferably distilled.

[0117] If the solution S.sub.0 is an organic solution, then:

[0118] the aqueous solution, which is used in each of the rows of partitions after the first row of partitions, is the same as that used in the first row of partitions, whereas

[0119] the organic solution, which is used in each of the rows of partitions after the first row of partitions, is either the same organic solvent as that which the solution S.sub.0 comprises or, otherwise, an organic solvent immiscible in water, optionally previously hydrated, such as n-octanol.

[0120] A total of [2.sup.(N+1)−1] phases is thus obtained (counting the solution S.sub.0 that it is sought to characterise), 2.sup.N phases of which come from the last row of partitions.

[0121] For example, FIG. 2 schematically illustrates the phases obtained in the case of a sequence of 3 rows of partitions (N=3).

[0122] In this figure, the phases inscribed in rectangles, the contours of which are solid lines correspond to aqueous phases while the phases inscribed in rectangles, the contours of which are dotted lines correspond to organic phases, and the solution S.sub.0 can indifferently be aqueous or organic.

[0123] Moreover, in this figure, all the phases are assigned an index with two digits, the first digit of which corresponds to the row of partitions, noted as i, from which they come and the second digit of which corresponds to the order, noted as j, in which they lie in this row of partitions.

[0124] Thus, for example, the phase φ.sub.34 is the 4th phase (j=4) issued from the 3.sup.rd row (i=3) of partitions.

[0125] It goes without saying that the greater N, the finer the characterisation of the solution S.sub.0, N being limited, however, by the sensitivity of the technique used to measure the quantity X since the values of the quantity X decrease as the number of rows of partitions increases.

[0126] This is why N is typically between 2 and 20 and, preferably, between 3 and 10.

3. Measurements of the Quantity X (Step b) of the Method)

[0127] As mentioned above, according to the method of the invention, a quantity X is measured in all the phases, aqueous and organic, obtained in the last partition row N.

[0128] The quantity X can be any quantity allowing to target a property of interest that the solutes or some of the solutes of the solution S.sub.0 have as long as this quantity is extensive on the one hand and conservative on the other hand, that is to say that:

.sup.jΣx.sub.(ij)=.sup.jEX.sub.(i+1,j).

[0129] Thus, this can in particular be:

[0130] an amount of substance (molar, by weight or other) or a concentration (relative to an amount of substance by multiplying by the volumes of the solution S.sub.0 or of the phases measured) such as total organic carbon (TOC), total nitrogen (according to the Kjeldahl method), chemical oxygen demand (COD), biochemical oxygen demand (BOD), suspended solids (SS), etc.,

[0131] an absorbance at a given wavelength,

[0132] a fluorescence at a given excitation or emission wavelength,

[0133] a radioactivity (such as the activity of the .sup.14C for example),

[0134] a content of colloids, or

[0135] an opacity.

[0136] 2.sup.N measured values of X are thus obtained that allow to define an experimental vector {right arrow over (V)}exp which, in the case, for example, of the sequence of partitions shown in FIG. 2 has 8 values, respectively X.sub.31, X.sub.32, X.sub.33, X.sub.34, X.sub.35, X.sub.36, X.sub.37 and X.sub.38, each value of X being assigned the same index as that affecting the phase, aqueous or organic, for which it was obtained.

[0137] It should be noted that, according to the invention, the quantity X can be measured in all the phases, aqueous and organic, obtained in each of the N rows of partitions in order to improve the experimental accuracy. However, this is not indispensable, only the measurement of the quantity X in all the aqueous and organic phases issued from the last row N of partitions being necessary.

4. Mathematical Processing of the Measured Values of X (Steps c) and d) of the Method)

[0138] 4.1. Definition of the Theoretical Vectors {right arrow over (V)}theor(D.sub.k):

[0139] To define the vectors {right arrow over (V)}theor(D.sub.k), first, for all the aqueous and organic phases obtained in each of the N rows of partitions, the expected values of X for solutes having y different values of D, noted as D.sub.k, are calculated, y being greater than or equal to 2.

[0140] These calculations can be carried out by applying the equations (10a) and (10b):

[00009]$\begin{array}{cc}{X}_{\left(i+1,2j-1\right)}\left(D_k\right)=X_{\left(ij\right)}\left(D_k\right)⨯\frac{1}{\left(1+D_k⨯\frac{V_{\left(\mathrm{ij}\right)\mathrm{org}}}{V_{\left(\mathrm{ij}\right)\mathrm{aq}}}\right)}& \left(10a\right)\end{array}$$\begin{array}{cc}{X}_{\left(i+1,2j\right)}\left(D_k\right)=X_{\left(\mathrm{ij}\right)}\left(D_k\right)⨯\frac{D_k⨯\frac{V_{\left(\mathrm{ij}\right)\mathrm{org}}}{V_{\left(\mathrm{ij}\right)\mathrm{aq}}}}{\left(1+D_k⨯\frac{V_{\left(\mathrm{ij}\right)\mathrm{org}}}{V_{\left(\mathrm{ij}\right)\mathrm{aq}}}\right)}& \left(10b\right)\end{array}$

[0141] which are merely the application of the above equations (9a) and (9b) to the partition of a phase ij (that is to say having a row i and order j in this row) and a synthesis, on the one hand, of the above equations (1a), (2a) and (3a) for the equation (10a) and, on the other hand, of the above equations (1b), (2b) and (3b) for the equation (10b).

[0142] In the equations (10a) and (10b):

[0143] X.sub.(i+1,2j−1)(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the aqueous phase issued from the partition of the phase ij,

[0144] X.sub.(i+1,2j)(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the organic phase issued from the partition of the phase ij,

[0145] X.sub.(ij)(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the phase

[0146] V.sub.(ij)org is the volume of the organic phase subjected to the partition ij or the volume of organic solution S.sub.org used to carry out the partition of the phase ij (if the phase ij is an aqueous phase), and

[0147] V.sub.(ij)aq is the volume of the aqueous phase subjected to the partition ij or the volume of aqueous solution S.sub.aq used to carry out the partition of the phase ij (if the phase ij is an organic phase).

[0148] Thus, applied, for example, to the partition of the aqueous phase φ.sub.21 shown in FIG. 2 via a volume of organic solution S.sub.org, noted as V.sub.21(S.sub.org), the equations (10a) and (10b) respectively become:

[00010]$X_{31}\left(D_k\right)=X_{21}\left(D_k\right)⨯\frac{1}{\left(1+D_k⨯\frac{V_{21}\left(S_{\mathrm{org}}\right)}{V\left({\phi }_{21}\right)}\right)}$$X_{32}\left(D_k\right)=X_{21}\left(D_k\right)⨯\frac{D_k⨯\frac{V_{21}\left(S_{\mathrm{org}}\right)}{V\left({\phi }_{21}\right)}}{\left(1+D_k⨯\frac{V_{21}\left(S_{\mathrm{org}}\right)}{V\left({\phi }_{21}\right)}\right)}$

[0149] where:

[0150] D.sub.k is as defined above,

[0151] X.sub.31(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the aqueous phase φ.sub.31,

[0152] X.sub.32(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the organic phase φ.sub.32,

[0153] X.sub.21(D.sub.k) is the expected value of X for solutes having the value D.sub.k and for the aqueous phase φ.sub.21,

[0154] V.sub.21(S.sub.org) is the volume of organic solution S.sub.org used to carry out the partition of the aqueous phase φ.sub.21, and

[0155] V.sub.21 is the volume of the aqueous phase φ.sub.21 subjected to the partition.

[0156] As indicated above, the values D.sub.k are at least two in number but can be more in number, for example 3, 4, 5, 6, 7, 8 or more in number with:

[0157] when they are 3 in number, for example D.sub.1=10.sup.−1 (i.e. log D.sub.1=−1), D.sub.2=10°, (i.e. log D.sub.2=0) and D.sub.3=10 (i.e. log D.sub.3=+1), or

[0158] when they are 5 in number, for example D.sub.1=10.sup.−2 (i.e. log D.sub.1=−2), D.sub.2=10.sup.−1 (i.e. log D.sub.2=−1), D.sub.3=10° (i.e. log D.sub.3=0), D.sub.4=10 (i.e. log D.sub.4=+1) and D.sub.5=10.sup.2 (i.e. log D.sub.5=+2), etc.

[0159] It should be noted that the application of the equations (10a) and (10b) to the partition of the solution S.sub.0 requires knowing the value of X, noted as X.sub.0, for this solution and, thus, having previously measured it.

[0160] On the basis of these calculations, it is then possible to establish, for the last row N of partitions, y vectors {right arrow over (V)}theor(D.sub.k) each having a dimension 2.sup.N and the elements of which represent the theoretical contribution of the solutes, which have the value D.sub.k, to the quantity X measured in the aqueous and organic phases issued from this row of partitions, i.e. the n.sup.th element of the {right arrow over (V)}theor(D.sub.k) is V.sub.ntheor(D.sub.k)=X.sub.n(D.sub.k)/X.sub.0 (in %).

[0161] Thus, as illustrated for example on the right side of FIG. 3, the vectors {right arrow over (V)}theor(D.sub.k) for the sequence of partitions shown in FIG. 2, noted as V.sub.1(D.sub.1), V.sub.2(D.sub.2), V.sub.3(D.sub.3), . . . , V.sub.y(D.sub.y), each have 8 elements, respectively X.sub.31, X.sub.32, X.sub.33, X.sub.34, X.sub.35, X.sub.36, X.sub.37 and X.sub.38, each element being assigned, here also, the same index as that affecting the phase, aqueous or organic, to which it corresponds.

[0162] 4.2. Parametric Adjustment:

[0163] As illustrated in FIG. 3, once the vector {right arrow over (V)}exp and the {right arrow over (V)}theor(D.sub.k) have been established, a comparison of the data of the vector {right arrow over (V)}exp to a linear combination of the vectors {right arrow over (V)}.sub.1(D.sub.1), {right arrow over (V)}.sub.2(D.sub.2), {right arrow over (V)}.sub.3(D.sub.3), . . . , {circumflex over (V)}.sub.y(D.sub.y) allows to adjust the parameters which are P.sub.k (%) on the one hand, and, optionally, D.sub.k on the other hand, so that:

{right arrow over (V)}exp≈Σ(P.sub.k(%)×{right arrow over (V)}theor(D.sub.k)).

[0164] A histogram such as that shown in FIG. 3 can thus be obtained, y being, in the case of this histogram, equal to 8 and the hydrophilicity/lipophilicity being expressed in terms of log D.sub.k.

5. Validation of the Method of the Invention

[0165] An aqueous mixture comprising 3 standard solutes having different lipophilicities (that is to say values of log D), namely benzoic acid, theophylline and benzimidazole, is prepared.

[0166] In the experimental conditions used for this validation, the log D of the benzoic acid is equal to −1.24, that of the theophylline is equal to −0.02, while that of the benzimidazole is equal to +1.34.

[0167] The total quantity of moles of the solutes in the mixture (i.e. n.sub.0) is approximately 5×10.sup.−4 moles. The pH of the mixture is approximately 7.4 (phosphate buffer: PBS).

[0168] A sequence of 3 rows of partitions—as illustrated in FIG. 2—is applied to the mixture by using hydrated n-octanol for the partition of the aqueous mixture and that of the aqueous phases issued from the partitions of rows 1 and 2 (i.e. the phases φ11, φ21 and φ23), and an aqueous solution comprising PBS buffer having a pH of 7 in distilled water for the partition of the organic phases issued from the partitions of rows 1 and 2 (i.e. the phases φ12, φ22 and φ24). The ratio V.sub.org/V.sub.aq used is approximately ¼.

[0169] The concentration of each solute in the phases issued from the partitions of rows 1, 2 and 3 (i.e. the phases φ11 to φ38) is monitored by UV-visible spectroscopy but only with the goal of verifying the proper running of the experiment.

[0170] As shown in the left part of FIG. 4, which shows the partition coefficients, expressed in terms of log D, as verified experimentally in each of the rows of partitions and for each of the solutes, the theophylline and the benzimidazole are distributed between aqueous phases and organic phases in a manner sufficiently homogenous for their concentration to be able to be measured in all the phases (except for the benzimidazole in the phase φ31). However, due to its hydrophilic nature, the quasi-totality of the benzoic acid is extracted in the aqueous phases: φ11 then φ21 and φ31. The measurement of its partition coefficient is thus only possible starting from the separation of these three latter phases. The partition coefficients measured individually for the three compounds are close to the theoretical values indicated in dotted lines, attesting to the proper running of the successive experiments.

[0171] The results obtained by applying the mathematical processing described in point 4 above are illustrated in the following table as well as on the right of FIG. 4.

[0172] This table presents:

[0173] the log D of the solutes as verified experimentally, noted as experimental log D,

[0174] the number of moles of each of the solutes in the starting mixture as verified experimentally, noted as n.sub.mixture,

[0175] the log D used to define the theoretical vectors, noted as target log D, and

[0176] the number of moles obtained for each solute, noted as n.sub.result, and obtained by adjustment of the total quantity of the three solutes measured in each phase.

TABLE-US-00001 Benzoic acid Theophylline Benzimidazole n.sub.tot(moles) experimental −1.24 0.01 1.33 log D n.sub.mixture(moles) 2.05 .Math. 10.sup.−4 4.36 .Math. 10.sup.−5 2.12 .Math. 10.sup.−4   5 .Math. 10.sup.−4 target log D −1 0 1 n.sub.result(moles) 1.86 .Math. 10.sup.−4 <10.sup.−5 1.66 .Math. 10.sup.−4 3.5 .Math. 10.sup.−4

[0177] In the right part of FIG. 4, the results are expressed in percentages in terms of amount of substance of a solute (nX) relative to the total amount of substance of the solutes in the mixture (n.sub.tot), noted as P(X)%, according to the partition coefficient, expressed in terms of log D.

[0178] The mathematical processing only uses the value of the total quantity (in moles) of the solutes in the phases of the last row of partitions, which is relative to the total quantity of these solutes in the starting mixture.

[0179] Various parametric adjustments are tested with a variable number of theoretical vectors (3 or 5) or different values of log D. In each case, the data obtained by the mathematical processing (indicated by signs) is relatively close to the expected values for this known mixture (indicated by circles).

[0180] This type of results was reproduced with various ratios of quantities between the solutes, various ranges of concentrations, other solutes, and various types of quantity X (.sup.14C, TOC, etc.), which demonstrates a general feasibility for the method of the invention.

6. Evaluation of the Degree of Purity of a Bisphenol a Marked by .SUP.14.C and Characterisation of an Impurity

[0181] Reference is now made to FIG. 5 which illustrates an example embodiment of the method of the invention for the evaluation of the degree of purity of a synthetic substance and the characterisation of the quantity and of the lipophilicity of an impurity that this substance comprises, which is one of the potential applications of this method.

[0182] This example was carried out with a commercial source of bisphenol A (BPA) marked with .sup.14C, more simply called .sup.14C-BPA below.

[0183] The quantity X is thus the .sup.14C activity that is measured by liquid scintillation.

[0184] As shown in FIG. 5, the measurement of the .sup.14C activity after a single partition (N=1) of the commercial source of .sup.14C-BPA, carried out with distilled water and n-octanol, provides a log D, noted as log D.sup.EXP (source .sup.14C-BPA), substantially equal to 2.1 (solid line) and, thus, very different from the log D that the BPA theoretically has, noted as log D.sup.THEOR (BPA) and which is 3.32 (dotted line).

[0185] Despite a high purity of the commercial source (≈99%), a significant difference is measured with respect to the theoretical lipophilicity of the BPA because of the presence of an impurity having properties very different from those of the BPA: log D (impurity)<<log D (BPA).

[0186] A second row of partitions (N=2) is carried out on the phases φ.sub.11 and φ.sub.12 issued from the first partition (i=1).

[0187] The .sup.14C activity is measured on the 4 phases, φ.sub.21 to φ.sub.24, issued from this second row of partitions. The results of these measurements are compared using the mathematical processing described in point 4 to the results theoretically obtained for a mixture of two unknown species having different lipophilicities D1 and D2.

[0188] As shown in FIG. 5, the following have thus been highlighted starting from the second row of partitions:

[0189] on the one hand, a quantity of approximately 99% in .sup.14C activity, corresponding to the .sup.14C-BPA with a log D, noted as log D.sup.EXP (BPA), of approximately 3 and, thus, close to the log D that the BPA theoretically has, and

[0190] on the other hand, a quantity of approximately 1.3% in .sup.14C activity, corresponding to an impurity having a log D, noted as log D.sup.EXP (impurity), substantially equal to −0.5.

[0191] It is noted that these results obtained “blindly” agree with the amount of impurity estimated by the supplier, which is approximately 1%, and the presence in the commercial source of .sup.14C-BPA of possible residues of acetone marked with .sup.14C. Indeed, as shown in FIG. 5, the BPA is synthesised by reaction of two molecules of phenol with a molecule of acetone, the theoretical log D of which, noted as log D.sup.THEOR (acetone), is substantially equal to −0.24.

REFERENCES CITED

[0192] Mondeguer et al., Spectra Analyse 2012, 284, 25-33 [0193] Fischer et al., Trends in Analytical Chemistry 2021, 136, 116188