1. Introduction

Halogenated borane derivatives are successfully used as Lewis acids [1,2], as Brønsted superacids [3,4,5], as weakly coordinating anions [6,7], and as components of ionic liquids [8] and solid-state electrolytes [9,10]. Radio-halogenated boron clusters are used in tumor imaging and therapy [11].

Di- and tri-substituted halogenated derivatives of BH₄⁻ (BH₂X₂⁻ and BHX₃⁻) can be obtained through MBH₄–MBX₄ (X = F, Cl) exchange [12,13,14]. However, this reaction always leads to a mixture of products (due to disproportionation and low selectivity of the process), as well as to the formation of by-products as a result of the interaction of substitution products with the initial reagents [12]. Another possible approach to the synthesis of halogenated derivatives is direct halogenation; however, the reported halogenation of BH₄⁻ by the reaction with HF has resulted in the formation of a mixture of substitution products [14]. However, as exemplified in [15], the use of ¹H NMR monitoring during the bubbling of tBuNH₂·BH₃ with anhydrous hydrogen halides HX (X = F, Cl, Br) allows for the reaction to be stopped when the desired halogenation product is formed.

The halogenated derivatives of [B₆H₆]²⁻ are typically obtained by the reaction in highly alkaline aqueous solutions in the presence of free halogens X₂ (X = Cl, Br, I) [16,17]. However, this approach always results in mixtures of several components. Moreover, due to the fast rate of halogenation, the mono- and dihalogen derivatives are available as minor products, while tri- and penta-substituted derivatives are major products. Therefore, the use of preparative scale ion exchange column chromatography is essential for the isolation of pure compounds. However, for geometrical isomers with the same degree of halogenation, the difference in phase mobility is small (5–15%); thus, their separation could be achieved only by repeated ion exchange column chromatography [18].

Due to these factors, there are difficulties in the synthesis of halogen-derived borohydrides. These reactions are not selective; in a general case, a mixture of various substitution products is obtained, and to isolate the desired substitution product, additional separation and purification are necessary. To overcome these difficulties and develop an approach for the targeted synthesis of these compounds, we undertook DFT calculations for the halogenation of tetrahydroborate-anion (BH₄⁻, which is the smallest available boron hydride model) and hexahydro-closo-hexaborate dianion ([B₆H₆]²⁻, which is the smallest stable closo-borane anion) with hydrogen halides.

Previously, a DFT investigation of halogenation was performed, albeit only for [B₆H₆]²⁻ on the example of interaction with HOX (X = Cl, Br) and only for the first two steps [17]. In the case of BH₄⁻, the DFT study of the stepwise hydrolysis [19] and alcoholysis [20] were reported. Its interaction with strong acids was investigated only for the first reaction step — and only for CF₃OH [21]. From one side, hydrogen halides (such as HCl and HBr) are strong inorganic acids which violently react with BH₄⁻ and cause halogenation of closo-boranes via the electrophile-induced nucleophilic substitution (EINS) mechanism [22,23]. From the other side, the halogen is the electron-withdrawing group (EWG), which should increase electron deficiency at the boron atom, altering the reactivity of the B–H bond in halogen-substituted derivatives. In this regard, it was interesting to investigate the direct halogenation of BH₄⁻ and [B₆H₆]²⁻ by hydrogen halides.

In the course of our work, we began with the DFT study of the mechanism of direct successive halogenation using the example of the reaction of BH₄⁻ with HX (X = F, Cl, Br) in acetonitrile (MeCN). Then, using the knowledge gained, we studied halogenation of [B₆H₆]²⁻ with HCl in MeCN, which proceeded as an electrophile-induced nucleophilic substitution (EINS) process. Thus, in this work, a principal mechanism of direct halogenation was established for BH₄⁻ and [B₆H₆]²⁻. The changes in the reactivity of the B–H bond entailed by halogens’ introduction were evaluated via calculations of their hydride donor ability (HDA) and proton donor ability (PDA). Hydride donor ability (HDA)—i.e., thermodynamic hydridicity, defined as the Gibbs free energy (∆G°[H⁻]) value for the reaction of hydride ion (H⁻) detachment—is an important reactivity characteristic in transition metals [24,25] and the main group hydrides [20,26,27,28,29]. Similarly, the proton donor ability (PDA), i.e., thermodynamic acidity, was calculated as the Gibbs free energy (∆G°[H⁺]) for the reaction of proton (H⁺) detachment. In the case of anionic boron hydrides, both HDA and PDA parameters have been estimated by only a few researchers [30,31].

2. Results and Discussion

2.1. Interaction Tetrahydroborate-Anion with Hydrogen Halides

In our previous work [20], we showed (by DFT investigation of stepwise alcoholysis of tetrahydroborate-anion BH₄⁻) that first proton-hydride transfer is the rate-limiting stage of the reaction, and that the energy profile takes the form of a cascade, since the energy of each next transition state is lower than the one previous. That, in turn, is associated with a decrease in Lewis acidity of the corresponding neutral borane (RO)_xBH_(3−x) and a weakening of B–H bond in [(RO)_xBH_(4−x)]⁻ (x = 0−3) anion entailed by the successive substitution of H⁻ by RO⁻ at the boron atom. Thus, the B–H bond activation of BH₄⁻ and its ability to hydride transfer appeared to be crucial to this process.

It is known that alkaline tetrahydroborates react violently with concentrated mineral acids (such as H₂SO₄, HF, etc.) [14,32], yielding the substituted products and diborane, which is formed as a result of interaction between the reaction products. However, as we demonstrated in [30], an introduction of EWG (X⁻, X = F, Cl, Br) to boron atoms increases the Lewis acidity of the parent borane BH_(3−x)X_x and reduces the ability of B–H bonds in [BH_(4−x)X_x]⁻ (x = 0−3) to hydride transfer. In this regard, it was interesting to investigate, in the current work, the reaction of BH₄⁻ with strong mineral acids such as hydrogen halides. For these purposes, we investigated this stepwise process of halogenation of BH₄⁻ with HX (where X = F, Cl, Br) in acetonitrile (MeCN) at M06/6-311++G(d,p) and wB97XD/6-311++G(d,p) levels of theory.

The dihydrogen-bonded (DHB) complexes are active intermediates of the BH₄⁻ reaction with HX [33] and HOR [20,21,34,35]. DHB complexes with hydrogen halides HX (X = F, Cl, Br) found in this work (Table S1) were monodentate (except for H₃BH⁻···HF) with H···H distances of 1.425–1.850 Å and angles ∠X–H···H = 159–178°. Their structures were similar to those found in BH₄⁻ alcoholysis [20,21], with the geometric parameters typical of DHB complexes [36,37,38]. It should be noted, that for [H₂XBH]⁻ and [HX₂BH]⁻ (X = F, Cl, Br) molecules, two coordination modes were found, where halogen atom X was located in trans- and cis-position to the dihydrogen-bonded HX molecules. The formation energies of DHB complexes with a halogen atom in trans-position are slightly less favorable than those of DHB complexes with X in cis-position; the difference in the Gibbs free energy of these two complexes, ∆∆G_f°_MeCN = ∆G_f°_MeCN(INTn^DHB_trans)– ∆G_f°_MeCN(INTn^DHB_cis), reaches 1.8 kcal/mol. Moreover, the transition states of H₂ elimination (TSn^ELIM and TSn^CONC, see below) are energetically destabilized when X is located in trans-position, compared to those where X is located in cis-position. The difference ∆∆G°_MeCN ^‡ = ∆G°_MeCN ^‡(TSn_trans) − ∆G°_MeCN ^‡(TSn_cis) can reach up to 2.2 kcal/mol. Thus, herein, we considered only the configurations with X located in cis-position to HX.

Upon going from HF to HBr, the enthalpy of DHB complexes’ formation (∆H_f°_MeCN, Table S1) and other parameters characterizing the H···H interactions strength (E_H···H and E² are given in Table S1, and Wiberg bond indices (WBI) and QTAIM delocalization indices (DI)—in Table S3) decreased, in agreement with the HX acidity and hydrogen bond donor strength [39].

Substitution of one H⁻ by X⁻ (X = F, Cl, Br) in BH₄⁻ led to an increase of s-character of the B–H bond hybrid orbital in the resulting [BH₃X]⁻, from 25.0% up to 31.9% (from sp³ to sp², Table S3). In general, an increase of s-character of a B–H bond, as in the case of BH₄⁻ alcoholysis [20], is associated with strengthening of B–H bonds (according to QTAIM delocalization index, DI, Table S4) and weakening of DHB bonds. However, in the case of the BH₄⁻ reaction with HF for the H₂FBH⁻···HF and HF₂BH⁻···HF complexes (Figure 1), there was an increase of DHB interaction strength (E² = 19.2 kcal/mol and 18.6 kcal/mol, respectively, Table S1). In fluoroborohydrides, the strong electron-withdrawing inductive σ-effect—due to the large difference in boron and fluorine electronegativity (∆χ_A-R = 2.1) [40]—led to the large positive charge on the boron atom (1.53 for BF₃) [41]. On the other hand, this effect was compensated by the strong back donation from nonbonding 2p_π electron pairs of F to vacant 2p_π (B) orbital of the same symmetry [42,43]. For BCl₃ and BBr₃, due to a larger size of 2p_π orbitals, their effective overlap with vacant boron 2p_π orbital decreased; therefore, back-donation for BF₃ was stronger than for BCl₃ and BBr₃, and Lewis acidity decreased in the row BF₃ > BH₃ > BCl₃ > BBr₃ (as can be seen from their hydride affinity values, HA_298K, Table S3).

The reaction of BH₄⁻ with HX (where X = F, Cl, Br) in acetonitrile (MeCN) occurs as a successive proton-hydride transfer and H₂ elimination, yielding [BH_(4−x)X_x]⁻ (x = 1−3) halogenated products (Figure 2, Figures S1 and S2). In the case of weak acids like HF (pK_a^MeCN_(estim) = 25.2 [44]) only one product-like concerted transition state (TS) of proton-hydride transfer and H₂ elimination was found (TS1^CONC_HF, Figure 3). In the case of stronger acids HCl (pK_a^MeCN= 10.3 [45]) or HBr (pK_a^MeCN = 5.4 [45]), two TS’s were observed: a reagent-like transition state of proton transfer (TS1^PT_HCl) and a product-like transition state of H₂ elimination (TS1^ELIM_HCl). Both concerted TS of proton-hydride transfer/H₂ elimination TSn^CONC_HX and TS of H₂ elimination TSn^ELIM_HX (preceded by proton transfer step TSn^PT_HX) exhibited a similar triangle-shaped form of front-side nucleophilic substitution of H₂ by halide-ion X⁻. The B···H₂ and H···H distances (Tables S5 and S6) in TSn^ELIM_HX could be considered indirect indicators of activation barrier height. With the increase of the activation energy, the B···H₂ distances decreased for the borohydrides with EWG substituents, while at the same time, H···H distances shortened for weak proton donors (such as HF, ROH, Table S7). Similar transition states were described previously in a theoretical study of BH₄⁻ alcoholysis by weak (MeOH, CF₃CH₂OH) and strong (CF₃OH) proton donors [21].

In the case of strong acids (like HCl, HBr), the formation of a metastable H₂ intermediate X⁻(η²-H₂)BH₃ (INTn^H2) was observed (Figure 3). This resembled the intermediates of transition metal hydrides’ protonation [46], which have also been proposed for the protonation of main group element hydrides [21,47,48,49,50,51]. It should be noted that INTn^H2 was formed only at the first and second reaction step for HCl, and at the first step for HBr. This was due to an increase in electron deficiency of BH₂Cl, BH₂Br, and BHCl₂ fragments, strengthening of B–H and X···H(H) (X = Cl, Br) bonds, and a decrease of the donation from σ(B–R) (where R = H, Cl, Br) to σ*(H–H–B), which ultimately destabilized the H₂ intermediate (Table S2). It should be noted that σ(B–R) to σ*(H–H–B) donation from R group in trans position to H₂ complex was the greatest (E²₁ = 8.8–13.3 kcal/mol) and had a key effect on the stabilization of (η²-H₂) complex. This is also in line with the less energy-demanding attack of HX in the case of [H₂XBH]⁻ and [HX₂BH]⁻ bearing X in trans-position to HX, in comparison to complexes with X in cis-position.

Thus, for the appearance of the transition state of proton transfer, which is absent in the case of weak acids and leads to the (η²-H₂) complex formation, two conditions must apparently be satisfied. First, the pK_a of the acid should be greater than the pK_a of H₃B(η²-H₂) and, second, R₃B borane should be a good Lewis acid; at that, σ(B–R) orbital (such as R = H, SiH₃, SiF₃ [51]) should donate to σ*(B–H–H) orbital and R should not be able to π-back-donate to a vacant 2p_π(B) orbital.

In addition, a strong acid can significantly lower the activation energy of the 2nd reaction stage—that is, the H₂ elimination. However, the process of H₂ elimination will still be rate-limiting and will always have the highest value of the activation barrier, because of the relatively high B–H bond strength and its hydride transfer ability. In this regard, the reactivity of substituted borohydrides in reactions involving hydride transfer can be evaluated via their hydride donor ability (HDA_MeCN, Table S3). In the case of BH₄⁻ reaction with HF (Figures S1 and S2), the substitution led to HDA_MeCN values of [BH₃F]⁻, [BH₂F₂]⁻ and [BHF₃]⁻, reduced in comparison with BH₄⁻ (54.64 kcal/mol, 53.12 kcal/mol and 61.08 kcal/mol vs. 64.86 kcal/mol, respectively, for their Li salts; Table S3). As a result, the activation energy decreased by 7.6 and 2.4 kcal/mol for the reaction with the 2nd and 3rd molecule of HF. However, it increased by 6.3 kcal/mol at the last stage (Table 1). Thus, the reaction of BH₄⁻ with HF followed a trend similar to that of THF·BH₃ and Me₂NH·BH₃ alcoholysis by (CF₃)₂CHOH [20,52].

In the case of HCl (Figure 2, Figure S3) and HBr (Figures S4 and S5), the reaction featured two distinct TS’s, i.e., for proton transfer (TSn^PT) and H₂ elimination (TSn^ELIM). The activation barriers of TSn^PT were small (0.5–4.1 kcal/mol in the case of M06/6-311++G(d,p) and 3.2–7.1 kcal/mol in the case of wB97XD/6-311++G(d,p), see Figures S3 and S5), comparable to the first step of the gas phase reaction between BH₄⁻ and CF₃OH (4.2 kcal/mol) [21]. The case of HCl demonstrates how the energy of the complex with molecular hydrogen Cl⁻ [(η²-H₂)BH_(3−x)Cl_x] (x = 0−3) changes during the reaction (Figure 2). At the first step (n = 1, Figure 2), η²-H₂ complex was a local minimum with ∆G°_MeCN = 3.8 kcal/mol. Then, at the second step (n = 2, Figure 2), the energy rose, and it became a quasi-stationary intermediate at 11.7 kcal/mol. Over the next two steps, it disappeared, and the transition state became concerted. These changes were not surprising; during the reaction, as H⁻ was replaced by X⁻ (X = Cl, Br), the electron deficiency of the boron atom increased and, on the other hand, π-back-donation from occupied 2p_π(X) orbital to vacant 2p_π(B) orbital decreased. This led to an increase in the HDA_MeCN of B–H bond in substitution products, and hence to a decrease of the B–H bond’s capability to hydride transfer. As a result, the hydrohalogenation process became concerted, and the activation barriers (∆G°_MeCN^‡(span), Tables S5 and S6) increased (from 9.1 to 26.1 kcal/mol for HCl and from 14.6 to 29.5 kcal/mol for HBr; and, in the case of wB97XD/6-311++G(d,p), from 10.1 to 28.6 kcal/mol for HCl and from 13.1 to 29.2 kcal/mol for HBr). In addition, due to the high electrophilicity of boron atoms in chloro- and bromoborohydrides the propensity of B–H bonds to proton and hydride transfer become comparable in magnitude (PDA^MeCN = 85.5 and 83.5 kcal/mol vs. HDA^MeCN = 73.0 and 77.6 kcal/mol for Li[BHCl₃] and Li[BHBr₃] respectively).

Thus, the value of the activation energy was influenced by two factors: the strength of the acid, which significantly lowered the activation barrier by increasing the polarization of the B–H bond in DHB complexes, and the ability of the occupied 2p_π(X) orbital to effectively back-donate to vacant 2p_π(B). In view of both of these factors, hydrogen chloride was the golden reactant, and the observed activation energy values the reaction of BH₄⁻ with HCl were the lowest (Table 1). Taking into account these findings, the DFT investigation of the reactivity of [B₆H₆]²⁻ in electrophile-induced nucleophilic substitution (EINS) was carried out only on an example of the interaction with HCl in acetonitrile (MeCN).

2.2. Interaction of Hexahydro-Closo-Hexaborate Dianion with Hydrogen Chloride

Polyhedral closo-boranes are characterized by rather high values of hydride donor ability (e.g., HDA_MeCN = 71.9 kcal/mol for [B₆H₆]²⁻ and 79.6 kcal/mol for [B₁₂H₁₂]²⁻), which indicates the weak ability of the nonactivated B–H bond in closo-boranes to hydride transfer [29]. It is not surprising, therefore, that the most common method of functionalization of polyhedral boron hydrides follows the mechanism of electrophile-induced nucleophilic substitution (EINS) (Scheme 1). At the first stage, an electrophile promoter E⁺ is attached to the boron skeleton of a closo-borane. Then, the hydride bound to the electrophile is eliminated, with the formation of a quasi-borinium cation [53]. Finally, at the last stage, the nucleophile attachment occurs. At that point, if E⁺ = H⁺, the protonated closo-borane intermediate should convert into a η²-H₂ complex—which is generally unstable and readily loses H₂, making the addition of the nucleophile easier.

However, the main problems of functionalization of polyhedral boron hydrides through this mechanism are low specificity of nucleophilic substitution and difficulties in controlling the degree of substitution [54]. The reactivity of the remaining BH groups in nucleophilic substitution products can be estimated using the hydride donor ability (HDA_MeCN). Thus, as discussed in this section, applying this approach, we explored the EINS successive mechanism on the example of the reaction of [B₆H₆]²⁻ with HCl in acetonitrile.

The [B₆H₆]²⁻ is the smallest stable closo-borane dianion [29,55,56], where the bulk of electron density is located on the boron atoms of the octahedral skeleton. The high nucleophilicity of boron atoms [57] in [B₆H₆]²⁻ leads to its easy protonation. However, an attempt to isolate protonated species from Cs₂[B₆H₆] in acidic aqueous solutions was unsuccessful due to irreversible hydrolysis of [B₆H₆]²⁻ to borates and boric acid under these conditions [58]. Nevertheless, [^facHB₆H₆]⁻ (pK_a^H2O = 7.00) [18,59], in the form of Bu₄N⁺ and Ph₄P⁺ salts, was isolated from weakly acidic (pH = 4.5) H₂O-HCl solutions and characterized by X-ray diffraction [58,60]. It was found that the ^facH⁺ proton was located above the B₃ triangle facets of the octahedron and coordinated through the 4c–-3e bond [18,58,60]. The tendency of [B₆H₆]²⁻ to hydrolyze in an acidic environment can be explained by the instability of the hypothetical doubly-protonated B₆H₈ closo-borane [18,61,62]. However, [B₆H₆]²⁻ could be stable in acidic solutions if the protonation were stopped at the stage of [^facHB₆H₆]⁻ formation [61].

It should be noted that the mechanisms of [B₆H₆]²⁻ consecutive halogenation remain practically unexplored. Only the addition of the second halogen to [B₆H₅X]²⁻ in the presence of X₂ and H₂O (X = Cl, Br) has been explored by DFT, which proceeds with the partial opening of the boron cluster [17].

Thus, herein, we focused on the investigation of the EINS successive mechanism, simulated on the example of a model reaction in acetonitrile (MeCN) at DFT/M06/6-311++G(d,p) (Figure 4) and wB97XD/6-311++G(d,p) (Figure S7, Table S12) theory levels. It was found that the reaction of [B₆H₆]²⁻ with HCl proceeded via preliminary formation of hydrogen-bonded complex on B₃ triangle facets (INTn^HB3) in three stages (Figure 5). These stages were: (1) protonation of the closo-borane cluster (TSn^PT) on one of the B₃ triangle facets with the formation of protonated form Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ (x = 0–5) (INTn^PT); (2) structural isomerization with H⁺ migration from B₃ triangle facet to B apex (TSn^ISOfac-apx) with the formation of complexes with molecular hydrogen Cl⁻ [(η²-H₂)B₆H_(5−x)Cl_x]⁻ (η²-H₂-intermediate, INTn^H2); and (3) H₂ elimination followed by frontal nucleophilic attack on boron atoms by Cl⁻ (TSn^ELIM), which is the last—and rate-limiting—stage. As can be seen (Figure 4), the activation barrier of the protonation stage was very low for all dianions [B₆H_(6−x)Cl_x]²⁻ (x = 0−5) (∆G^‡ of TSn^PT = 2.5–10.7 kcal/mol); therefore, it did not matter which type of acid we chose to use for protonation. The only important limitation is that the pK_a of the proton donor used should be higher than the pK_a of Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ (x = 0−5). After protonation, the reaction turned into a classical one—isomerization of Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ to Cl⁻ [(η²-H₂)B₆H_(5−x)Cl_x]⁻ (x = 0–5) (TSn^ISOfac-apx) and H₂ elimination (TSn^ELIM) in the presence of a nucleophile (Cl⁻). As can be seen from the reaction profile (Figure 4), the H₂ elimination was the rate-limiting stage and, therefore, the activation barrier of this stage and the selectivity of this process should be determined by the metastable η²-H₂ reaction intermediate.

The first reaction intermediate was the hydrogen-bonded complex (INTn^HB3) with HCl coordination on π-density of the B₃ triangle facet of the [B₆H_(6−x)Cl_x]²⁻ (x = 0–5) polyhedron [63]. It should be noted that the electron density of hydride atoms in [B₆H₆]²⁻ is much lower than the electron density of B₃ triangle facets; therefore, in contrast to BH₄⁻ [34,35,64], [B₁₀H₁₀]²⁻ [49,65], and [B₁₂H₁₂]²⁻ [65], the complexation of proton donors occurred exclusively on B₃ triangle facets [66,67]. Upon the successive replacement of H⁻ with Cl⁻ in the closo-borane structure, gradual increases in the electron deficiency of the skeleton of closo-borane and the electrophilicity of boron atoms were observed. As the result, the values of hydride donor ability (HDA_MeCN, Table S8) increase, whereas the values of proton donor ability (PDA_MeCN) decrease (Table S8). This indicates a change in the character of boron atoms in closo-borane from nucleophilic to highly electrophilic and an increase of the Lewis acidity of the corresponding quasi-borinium cations [B₆H_(5−x)Cl_x]⁻ formed as the result of H⁻ transfer from [B₆H_(6−x)Cl_x]²⁻. Thus, for example, for [B₆HCl₅]²⁻, the proton transfer becomes more favorable than hydride transfer, which correlates with better hydrolytic stability of tetra- and penta-halogen derivatives of [B₆H₆]²⁻ in acidic aqueous solutions and increased acidity of protonated monosubstituted halogenated derivatives [^facHB₆H₅X]⁻ (pK_a^H2O for X = Cl, Br, I were 5.35, 5.00 and 4.65, respectively; in comparison, pK_a^H2O = 7.00 for [^facHB₆H₆]⁻) [42,43]. The study of the electronic structure of polyhedral closo-borane dianions [B₆H_(6−x)Cl_x]²⁻ (x = 1−5) utilizing the NBO method showed that, as the substitution proceeded, the polarization of the hydrogen atom occurred. which It became less hydridic (the charge of the hydrogen atom varied from −0.027 to 0.002). These changes were manifested in a weakening of the hydrogen bond (decrease of E_H···B(B2) and E², Table S8), an elongation of H···B₃ distances (Table S9), and a decrease in the enthalpy of H···B₃ (INTn^HB3) complexes’ formation (Table S9).

The energy barrier of the proton transfer reaction was very low (2.5–7.5 kcal/mol); thus, in the presence of acids, the protonated reaction intermediates Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ (x= 0−5) (INTn^PT) were immediately formed (Figure S3). At the early stages of the reaction, these were characterized by significant energy formation (∆G_f°_MeCN from −8.5 kcal/mol for Cl⁻ [^facHB₆H₆]⁻ to −0.4 kcal/mol for Cl⁻ [^facHB₆H₂Cl₄]⁻). Previously, instability of [B₆H₆]²⁻ in acidic water solutions was explained by possible further protonation and formation of doubly protonated products [18,61,62]. The calculated energy barrier of Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ (x = 0−5) protonation by an equivalent of HCl was higher by 8.8–16.0 kcal/mol (∆G°_MeCN^‡ = 9.5–23.0 kcal/mol for TSn^PT_2nd, Table S10) than protonation of [B₆H_(6−x)Cl_x]²⁻, and its energy increased over the course of halogenation. It should be noted that the formation of doubly-protonated intermediates Cl⁻ (^facHB₆H_(6−x)Cl_x^facH)·Cl⁻ (x = 0−5) is endoergic (∆G_f°_MeCN values ranged from 9.7 kcal/mol for Cl⁻ (^facH₂B₆H₆^facH)·Cl⁻ to 29.3 kcal/mol for Cl⁻ (^facHB₆HCl₅^facH)·Cl⁻). The activation energy of the reverse reaction (TS^PT_2nd(rev), Table S10) was less than 3.8 kcal/mol. All this indicated that it was possible to stop the protonation reaction at the stage of the monoprotonated product, in the presence of equimolar amounts of the proton donor.

It should be noted that the structure of [^facHB₆H_(6−x)Cl_x]⁻ (x = 0−5) anions is nonrigid and, in solutions, they are prone to the fluctuation of ^facH⁺ proton between octahedral edges [18]. During [B₆H₆]²⁻ halogenation, the Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ to Cl⁻ [(η²-H₂)B₆H_(5−x)Cl_x]⁻ (x = 0−5) isomerization (TSn^ISOfac-apx, Figure 5) was observed, with energy barriers decreasing from 20.1 kcal/mol at the first step to 13.8 kcal/mol at the sixth (Table 2)—correlating with an increase in the electrophilic nature of boron atoms during halogenation.

There was also a competitive Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ to [B₆H_(6−x)Cl_xH^fac*]⁻·Cl⁻ (x = 0−5) isomerization process (TSn^ISOfac-fac*, Table S9), which corresponded to ^facH/H^term exchange. As is known, [B₆H₆]²⁻ can be completely deuterated in D₂O solution—and activation energy of the deuteration (18.0 kcal/mol) [18,59] was close to the calculated activation energy of 17.3 kcal/mol for the TSn^ISOfac-fac* isomerization of [^facHB₆H₆]⁻. Thus, the exchange between ^facH and H^term ligands (TSn^ISOfac-fac*, Scheme 2) featuring a lower barrier than TSn^ELIM did not result in H₂ elimination—which requires η²-H₂ complex formation.

A third reaction intermediate, which is Cl⁻ [(η²-H₂)B₆H_(6−x)Cl_x]⁻ complex (INTn^H2) (Table S10) was observed for almost all stages of reaction of [B₆H_(6−x)Cl_x]²⁻ (x = 0−5) with HCl (except [B₆HCl₅]²⁻). This complex is a key intermediate of the process which determines the selectivity of nucleophilic substitution, since stabilization of H₂ at one of the vertices of the closo-borane octahedron determines the position of nucleophilic substitution at this vertex. Notably, this complex was not revealed at the gas phase calculations of Cl⁻ [^facHB₆H₆]⁻ [68]. Similarly to the Cl⁻ [(η²-H₂)B₁₀H₉]⁻ [49] it could be stabilized only in the presence of HX acid residue X⁻.

As the halogenation of [B₆H₆]²⁻ progressed, the formation energy of the H₂ intermediate decreased, and B–H and Cl···H bonds became stronger while H···H interaction weakened. This coincided with a trend toward an increase in the electrophilicity of the B–H bond and an increase in its acidity. Thus, the established regularities allowed for the use of the stabilization of H₂ complex to control the process of nucleophilic substitution and lower the activation energy of this process.

The same trend was observed for the rate-limiting stage of H₂ elimination, for which the energy barrier increased from 19.6 to 42.3 kcal/mol (∆G°_MeCN^‡(TSn^PT), shown in Table 2, and from 24.6 to 44.6 kcal/mol for wB97XD/6-311++G(d,p), shown in Table S12. It should be noted that nucleophilic substitution by Cl⁻ and solvation contributed greatly to the stabilization of the transition state—which was noticeable, as the activation energies obtained were compared with gas-phase activation energies for H₂ elimination from [^facHB₆H₆]⁻ (∆E = 45.9 kcal/mol) [69].

In the reaction of [B₆H₆]²⁻ with HCl there were three branch points at the second, third, and fourth steps (Scheme 3) of halogenation when several geometries of halogenated derivatives were possible (Table 2). However, the optimal reaction pathway (with the lowest activation energy of TSn^ELIM at 2nd and 3rd steps) was [B₆H₆]²⁻ → 1-[B₆H₅Cl]²⁻ → 1,2-[B₆H₄Cl₂]²⁻ (cis) → 1,2,3-[B₆H₃Cl₃]²⁻ (fac) → 1,2,3,4-[B₆H₂Cl₄]²⁻ (cis) → 1,2,3,4,6-[B₆HCl₅]²⁻. The existence of such branch points was found for 1-[B₆H₅Cl]²⁻, 1,2-[B₆H₄Cl₂]²⁻ (cis) and 1,2,6-[B₆H₃Cl₃]²⁻ (mer)-halogenated derivatives, in which there were two types of hydrides with different reactivities (as can be seen from HDA_MeCN values, Table S8. As follows from Table 2, the smallest activation barrier corresponded to nucleophilic substitution at the boron atom, the bond of which was characterized by the smallest HDA_MeCN value.

It should be noted that under real conditions of halogenation of [B₆H₆]²⁻ by X₂ (X = Cl, Br) in strong alkaline solutions, the reaction is nonspecific. In the second, third, and fourth steps of halogenation, the geometric isomers are formed in different ratios [18]. In this case, for X = I pure geometric isomers, 1,6-[B₆H₄I₂] (trans), 1,6,2-[B₆H₃I₃] (mer) and 1,6,2,4-[B₆H₂I₄] (trans) were observed [70,71]. This was due to the less effective back-donation of larger-sized 2p_π iodine orbitals to vacant 2p_π(B). That, in turn, led to the favorable formation of the protonated complex [^facHB₆H₅X]⁻, where ^facH⁺ was located in antipodal-sphere of the [B₆H₆]²⁻ octahedron [18,72]. Our calculations showed that, for [^facHB₆H₅Cl]⁻, the formation energy of the complex with ^facH⁺ in the ipso-sphere of the [B₆H₆]²⁻ octahedron was higher than that of the complex with ^facH⁺ in the antipodal-sphere (∆∆G_f°_MeCN = 3.0 kcal/mol). Moreover, ipso-[^facHB₆H₅Cl]⁻ was the active intermediate of [B₆H₅Cl]²⁻ halogenation to 1,2-[B₆H₄Cl₂]²⁻ in our mechanism, as well as in that reported in [17]. Apparently, the larger electron-withdrawing effect of iodine in [B₆H_(6−x)I_x]²⁻ (x = 0–5) derivatives increases the difference between ipso/antipodal complexes.

Thus, the above-described reaction mechanism on the example of a model reaction of [B₆H₆]²⁻ with HCl suggests the possibility of controlling the selectivity and the depth of the nucleophilic substitution processes by increasing the stabilization of the H₂ complex on the desired position of the closo-borane cluster. Additionally, at the same time, HDA_MeCN values for the BH groups would permit the carrying out of a nucleophilic substitution of B–H bonds activated by Lewis acids (BL₃).

3. Materials and Methods

Computational Details

In the present manuscript, the calculations were performed at the DFT/M06/6-311++G(d,p) level for comparison to the hydride donor ability (HDA) values of boron hydrides and other main group hydrides, as previously calculated by the same method [28,30,73]. Additionally, the values obtained can be used as a reference for assessing the effectiveness of the B–H bond activation by transition metals. In this regard, M06 is a more versatile method than M06-2X (generally recommended for thermochemistry calculations of main group elements) and can be used in cases where multi-reference systems are or might be involved, since it has been parametrized for both main group elements and transition metals [74]. The continuum solute model based on density (SMD) was used for nonspecific solvation, since this model was parametrized to work with the Minnesota functionals family (such as M06, M06-2X, etc.) and has proven to be effective for use in both charged and uncharged systems [75]. The nature of the stationary points on potential energy surfaces was proved by reoptimization of M06 geometries at wB97XD/6-311++G(d,p) level of theory.

All calculations were performed without symmetry constraints using the M06 hybrid functional [74] and wB97XD dispersion-corrected, range-separated hybrid functional [76] implemented in the Gaussian09 (Revision D.01) [77] software package, using 6-311++G(d,p) [78] basis set. Vibrational frequencies were calculated for all optimized complexes at the same level of theory to confirm a character of local minima on the potential energy surface. Visualization-optimized geometries were realized using the Chemcraft 1.8 graphical visualization program [79].

The inclusion of nonspecific solvent effects in the calculations was performed using the SMD method [75]. Acetonitrile (MeCN, ε = 35.7) was chosen as a solvent for optimization because of significant data, specific to MeCN, already existed on reduction potentials, pKa values, and experimental values of hydride donor ability (HDA) of transition metal hydrides [24,25].

Calculations were carried out with an ultrafine integration grid and a very tight SCF option to improve the accuracy of the optimization procedure.

Hydride donor ability (HDA_MeCN) and proton donor ability (PDA_MeCN) of E–H bond in MeCN were calculated as Gibbs free energy of hydride or proton transfer:

HDA_MeCN = ΔG°[H⁻] _MeCN = G°_MeCN (E+) + G°_MeCN (H−) − G°_MeCN (E−H)(1)

PDA_MeCN = ΔG°[H⁺] _MeCN = G°_MeCN (E−) + G°_MeCN (H+) − G°_MeCN (E−H)(2)

The value of G°_MeCN (H⁻) = −413.9 kcal/mol was calculated by M06/6-311++G(d,p) for the H⁻ in MeCN. The values of G°_MeCN (H⁺) = −260.2 kcal/mol were taken from [80].

From data obtained during the geometry optimization for each molecule, the most stable configuration was chosen. To find the most stable configuration of cationic boranes, the terminal hydrogen atoms (B–H_term) were torn off as H⁻ or as H⁺ from each vertex in optimized molecules. In the case of polyhedral closo-boranes, due to the rigid frame of the boron cluster [49,50], several quasi-borinium cations were observed, localized on vertices from which hydride was torn off.

The Wiberg bond indices [81] (WBI)—as a measure of electron distribution between two atoms [82]—and natural atomic charges were calculated using the natural-bond orbital (NBO) analysis [83] implemented in GAUSSIAN09 (Revision D.01) [77]. Topological analysis of the electron-density distribution function ρ(r) was performed using the AIMALL [84] program package based on the wave function obtained by M06 calculations. The delocalization index (DI) [85,86,87], a measure of electrons that are shared or exchanged between two atoms or basins obtained from the integration of the Fermi hole density, was directly related to the bond order [87,88]. The X–Y bond ellipticity, ε_X–Y, was defined as ε = (λ₁/λ₂ − 1), where λ₁ and λ₂ are the negative eigen values of the Hessian of the electron density at the bond critical point, ordered such that λ₁ < λ₂ < 0 [89,90,91]. The energies of H···H or H···B₃ interactions were calculated as E_H···H = 0.5·V(r), according to [92,93].

4. Conclusions

The mechanism of the sequential halogenation of tetrahydroborate anions [BH₄]⁻ by hydrogen halides (HX, X = F, Cl, Br) and halogenation of hexahydro-closo-hexaborate dianions [B₆H₆]²⁻ was established by ab initio DFT calculations (M06/6-311++G(d,p) and wB97XD/6-311++G(d,p)) in acetonitrile (MeCN), taking into account nonspecific solvent effects (SMD model). The active intermediates of the reaction—XH···HB dihydrogen-bonded (DHB) complexes for [BH₄]⁻ and ClH···B₃ complexes for [B₆H₆]²⁻—were identified, and their geometric parameters, energetic characteristics, and electron structures were deduced. In the case of [B₆H₆]²⁻, an electrophile-induced nucleophilic substitution (EINS) mechanism of halogenation was established. The obtained values of activation energies of H₂ elimination were relatively high. Nonetheless, the identified pattern in the changes of electronic characteristics, the reactivity of B–H bonds (such as thermodynamic hydridicity and acidity of halogenated products) and the structures of H₂ complexes suggests that it should be possible to control the degree of halogenation and carry out the targeted synthesis of products with a low degree of substitution using a wide range of synthetic approaches.

Supplementary Materials

The following are available online, Table S1. M06-computed geometric parameters (distances r_(X–Y) in Å, angles in °) of dihydrogen-bonded (DHB) complexes (INTn^DHB) of [BH_(4−x)X_x] − (x = 0–3) with HX (X = F, Cl, Br) and their energies. Table S2. M06-computed geometric parameters (distances r_(X–Y) in Å, angles in °) of H₂ complexes of X⁻[(H₂)BH_(4−x)X_x]− (x = 1–2, X = Cl, Br) (INT^H2) and their energies. Table S3. Hydride affinity (HA_298K in kcal/mol) of [BH_(4−x)X_x]⁻ (x = 0–3) (X = F, Cl, Br). Hybridization of boron orbitals in B–H moieties, QTAIM delocalization indices (DI) of BH bond in of [BH_(4−x)X_x]⁻ (x = 0–3, X = F, Cl, Br). Hydride (HDA_MeCN in kcal/mol) and proton (PDA_MeCN in kcal/mol) donor abilities for Li[BH_(4−x)X_x] in MeCN. Table S4. QTAIM delocalization indices (DI) and Wiberg bond indices (WBI) for H···H contacts, their differences for XH and HB bonds, and hybridization of boron orbitals in BH moieties of M06-computed geometries of DHB complexes for [BH_(4−x)X_x]⁻ (x = 0–3) with HX (X = F, Cl, Br) (INTn^DHB). Table S5. Free Gibbs activation energy in acetonitrile (∆G°_MeCN^‡ in kcal/mol) of the transition state of H₂ elimination (TSn^ELIM_HX), and concerted transition state of proton-hydride transfer/H₂ elimination (TSn^CONC_HX) for the reaction of BH₄⁻ with HX (X = F, Cl, Br)—and their M06-optimized geometric parameters. Table S6. Free Gibbs activation energy in acetonitrile (∆G°_MeCN^‡ in kcal/mol) of the transition state of H₂ elimination (TSn^ELIM_HX) and concerted transition state of proton-hydride transfer/H₂ elimination (TSn^CONC_HX) for the reaction of BH₄⁻ with HX (X = F, Cl, Br) and their wB97XD-optimized geometric parameters. Table S7. Free Gibbs activation energy in dichloromethane (∆G°_DCM^‡ in kcal/mol) of the concerted transition state of proton-hydride transfer/H₂ elimination (TS^CONC_ROH) for the reaction of BH₄⁻ with HOR [ROH = MeOH, CF₃CH₂OH (TFE), (CF₃)₂CHOH (HFIP)] and their M06-optimized geometric parameters. Table S8. Hydride (HDA_MeCN in kcal/mol) and proton (PDA_MeCN in kcal/mol) donor abilities for [B₆H_(6−x)Cl_x]²⁻ (x = 0−5) in MeCN. Table S9. M06-computed geometric (distances r_(X–Y) in Å, angles in degrees) parameters of hydrogen-bonded complexes of [B₆H_(6−x)Cl_x]²⁻ (x = 0–5) with HCl (INTn^HB) and their energies. Table S10. M06-computed geometric (distances r_(X–Y) in Å, angles in degrees) parameters of hydrogen-bonded complexes of Cl⁻ [^facHB₆H_(6−x)Cl_x]⁻ (x = 0–5) with HCl and their energies. Table S11. M06-computed geometric parameters (distances r_(X–Y) in Å, angles in °) of H₂ complexes of Cl⁻[(H₂)B₆H_(5−x)Cl_x]⁻ (n = 0–5) (INTn^H2) and their energies. Table S12. Activation barriers (∆G°_MeCN^‡, in kcal/mol) for TSs for the reaction of [B₆H₆]²⁻ with HCl (pK_a^MeCN = 10.3) in MeCN, computed at the wB97XD/6-311++G(d,p) theory level. Figure S1. M06-calculated energy profile (∆G°_MeCN in kcal/mol) of the reaction of BH₄⁻ with HF in MeCN. Figure S2. wB97XD-calculated energy profile (∆G°_MeCN in kcal/mol) of the reaction of BH₄⁻ with HF in MeCN. Figure S3. wB97XD-calculated energy profile (∆G°_MeCN in kcal/mol) of the reaction of BH₄⁻ with HCl in MeCN. Figure S4. M06-calculated energy profile (∆G°_MeCN in kcal/mol) of the reaction of BH₄⁻ with HBr in MeCN. Figure S5. wB97XD-calculated energy profile (∆G°_MeCN in kcal/mol) of the reaction of BH₄⁻ with HBr in MeCN. Figure S6. M06-optimized geometries of the protonated forms [^facHB₆H_(6−x)Cl_x]⁻ (n = 0−4) and their free Gibbs formation energies (∆G_f°^MeCN in kcal/mol). Figure S7. wB97XD-calculated energy profile of halogenation of [B₆H_(6−x)Cl_x]²⁻ (x = 0−5) by HCl for the pathway: [B₆H₆]²⁻ → 1-[B₆H₅Cl]²⁻ → 1,2-[B₆H₄Cl₂]²⁻ (cis) → 1,2,3-[B₆H₃Cl₃]²⁻ (fac) → 1,2,3,4-[B₆H₂Cl₄]²⁻ (cis) → 1,2,3,4,6-[B₆HCl₅]²⁻. Animation of the vibration motion at the imaginary frequency for the TSs (GIF). Cartesian coordinates and electronic energies (in Hartrees) for the calculated species (XYZ).

Author Contributions

Funding acquisition, I.E.G.; Investigation, I.E.G.; Resources, O.A.F.; Supervision, L.M.E. and E.S.S.; Visualization, I.E.G.; Writing—original draft, I.E.G.; Writing—review & editing, O.A.F. and N.V.B. All authors have read and agreed to the published version of the manuscript.

Funding

This research was financially supported by the Russian Science Foundation (RSF grant number 19-73-00309). L.M.E. and E.S.S. thank the Ministry of Science and Higher Education of the Russian Federation for the partial support of this research.

Institutional Review Board Statement

Not applicable.

Informed Consent Statement

Not applicable.

Data Availability Statement

Not applicable.

Conflicts of Interest

The authors declare no conflict of interest.

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Not available.

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Figures, Schemes and Tables

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Figure 1. M06-optimized geometries of DHB complexes of [BH(4−x)Fx]− (x = 0–3) with HF (INTnDHBHF). The r(X···Y) bond distances and ∠H···HF angles shown are in Å and °, respectively.

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Figure 2. M06-calculated energy profile (∆G°MeCN in kcal/mol) of the stepwise reaction of BH4− with HCl in MeCN.

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Figure 3. M06-optimized geometries of transition states (TS) and H2 reaction intermediates (INTH2) for the first stage of reaction between BH4− with HX (X = F, Cl): concerted transition state of proton-hydride transfer and H2 elimination for HF (TS1ELIMHF) and transition states of proton transfer (TS1PTHCl) and H2 elimination (TS1ELIMHCl) and H2 intermediate (Cl−(η2-H2)BH3, INT1H2HCl) for HCl. The r(X···Y) bond distances and ∠H···HF angles shown are in Å and in °, respectively.

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Scheme 1. Mechanism of electrophile-induced nucleophilic substitution (EINS).

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Figure 4. M06-calculated energy profile (∆G°MeCN in kcal/mol) of halogenation of [B6H(6−x)Clx]2−(x = 0−5) by HCl for the pathway: [B6H6]2− → 1-[B6H5Cl]2− → 1,2-[B6H4Cl2]2− (cis) → 1,2,3-[B6H3Cl3]2− (fac) → 1,2,3,4-[B6H2Cl4]2− (cis) → 1,2,3,4,6-[B6HCl5]2−.

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Figure 5. M06-optimized transition states of reaction [B6H6]2− with HCl. The r(X···Y) bond distances shown are in Å.

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Scheme 2. The Hfac/Hfac exchange mechanism in Cl− [facH*B6H6]−. ∆G°MeCN‡(span) shown in bold numbers are in kcal/mol.

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Scheme 3. Pathways of [B6H6]2− halogenation by HCl. Free Gibbs energy span (∆G°MeCN‡(span) in kcal/mol) indicated as black bold numbers. H-atoms are omitted for clarity. Cl atoms added at each particular step are shown in magenta.

Activation barriers (∆G^‡_MeCN, in kcal/mol) for TSn^CONC_HX (or TSn^PT_HX/TSn^ELIM_HX) in the step-wise reaction of BH₄⁻ with hydrogen halides in MeCN, computed at the M06/6-311++G(d,p) theory level relative to the corresponding DHB complexes.

^a An estimated value is taken from [44]; ^b Experimental values are taken from [45]; ^c The values for TSn^PT_HX/TSn^ELIM_HX are given.

Hydride donor ability (HDA_MeCN) of the B–H center in [B₆H_(6−x)Cl_x]²⁻ (x = 0−5), involved in halogenation reactions, and activation barriers (∆G°_MeCN^‡, in kcal/mol) for TSs for the reaction of [B₆H₆]²⁻ with HCl (pK_a^MeCN= 10.3 [42]) in MeCN, computed at the M06/6-311++G(d,p) theory level.

^a HDA^MeCN are given for the corresponding reactive B–H centre in [B₆H_(6−x)Cl_x]²⁻ (x = 0−5) molecule; ^b Calculated as ∆G°_MeCN^‡ (TSn^PT) = G°_MeCN(TSn^PT) − G°_MeCN(INTn^HB3) ^b Calculated as ∆G°_MeCN^‡ (TSn^ISOfac-apx) = G°_MeCN(TSn^ISOfac-apx) − G°_MeCN(INTn^PT); ^c Calculated as ∆G°_MeCN^‡(TSn^ELIM) = G°_MeCN(TSn^ELIM) − G°_MeCN(INTn^H2); ^d Calculated as ∆G°_MeCN^‡(span) = G°_MeCN(TSn^ELIM) − G°_MeCN(INTn^H2) for n = 1−4 and as ∆G°_MeCN^‡(span) = G°_MeCN(TSn^ELIM) − G°_MeCN([B₆H_(6−x)Cl_x]²⁻) − G°_MeCN(HCl) for n = 5−6; * TSn^CONC for 5th and 6th halogenation steps.