1. Chemical context

The tri­fluoro­methane­sulfonato anion is usually weakly coordinating to metals, and the salts thereof are consequently important starting compounds for the exchange with other ligands. In an attempt of such a synthesis on iron(II) we obtained the starting material back with tetra­hydro­furan (THF) mol­ecules from the solvent completing the sixfold coordination environment. The overall composition of the title compound (I) is then [Fe(CF₃SO₃)₂(C₄H₈O)₄].

2. Structural commentary

A mol­ecular plot of (I) is shown in Fig. 1 with selected bond lengths and bond angles given in Table 1. The present Fe compound is isostructural to the corresponding Co, Ni and Zn compounds known from the literature (Amel'chenkova et al., 2006). An isostructural Cu compound is mentioned in the same publication but no further details are given. An overlay of the isostructural compounds is presented in Fig. 2. The comparison of metal–oxygen distances in Table 2 follows the trend of effective ionic radii (Shannon, 1976) with 0.92 Å for octa­hedral Fe²⁺ (high-spin), 0.885 Å for Co²⁺ (high-spin), 0.83 Å for Ni²⁺ and 0.88 Å for Zn²⁺. From this comparison we can conclude that the Fe ion in (I) has a high-spin electronic configuration. It should also be noted that there are no significant differences in metal–oxygen distances between the partially negative triflate and the neutral THF.

Figure 1 A view of the molecular structure of (I), with atom labelling. Displacement ellipsoids are drawn at the 50% probability level. For clarity, H atoms have been omitted.

Figure 2 Overlay plot of the isostructural Co, Ni, and Zn complexes (Amel'chenkova et al., 2006) with respect to the Fe complex (I). The coordinates of the Ni and Zn complexes have been inverted for this comparison. Hydrogen atoms are omitted for clarity. The quaternion fit algorithm (Mackay, 1984) as implemented in PLATON (Spek, 2009) was used for the preparation of the plot. Color scheme: Fe complex (blue),Co complex (green), Ni complex (red), and Zn complex (black).

In the octa­hedral compound (I), the triflate ligands are in trans positions and the equatorial plane is formed by O atoms of THF. The Fe atom is approximately in the equatorial plane at a distance of 0.0079 (3) Å from the least-squares plane of the THF oxygen atoms. The FeO₆ octa­hedron is nearly undistorted with a quadratic elongation of 1.001 and an angle variance of 2.79°² (Robinson et al., 1971). To the best of our knowledge, the crystal structure of compound (I) is the first of a trans triflate Fe complex with an FeO₆ chromophore. Similar complexes with N atoms in the equatorial plane are known from the literature. In the aceto­nitrile complex [Fe(CF₃SO₃)₂(CH₃CN)₄], the core octa­hedron is similarly undistorted (Hagen, 2000), while the pyridine complex [Fe(CF₃SO₃)₂(C₅H₅N)₄] is slightly tetra­gonally compressed (Haynes et al., 1986).

As expected, all four coordinated THF mol­ecules are puckered. The rings at O7 and O8 are best described as having an envelope conformation, the rings at O9 and O10 as being in a twist conformation. The O atoms are coordinated to the metal in a trigonal geometry with angle sums of 358.7 (2)–360.0 (2)°.

The two triflate ligands adopt a staggered conformation with O—S—C—F torsion angles between 56.6 (2) and 64.11 (19)°. The S—O distances to the coordinating oxygen atoms are significantly longer than to the non-coordinating oxygen atoms (Table 1). A search in the Cambridge Structural Database (update May 2019; Groom et al., 2016) shows a large variation between 99.3 and 178.2° in S—O—metal bond angles for the weakly coordinating triflate ligand (1501 observations, non-disordered structures). The angles of 135.31 (9) and 142.51 (9)° in compound (I) are well within this range.

The octa­hedral symmetry of the inner-sphere coordination environment (see above) is reduced to approximate C₂ symmetry by the arrangement of the triflate anion (Fig. 3). If the THF mol­ecules are considered as well, the overall symmetry reduces to C₁. Despite the achiral ligands, the metal complex is thus chiral in the crystal.

Figure 3 The approximate Oh symmetry of the FeO6 polyhedron (left, r.m.s.d. 0.0489 Å) is reduced by the tri­fluoro­methane­sulfonate coordination in the second coordination shell to approximate C2 (center, r.m.s.d. 0.1460 Å). If the coordinated THF mol­ecules are taken into consideration, the symmetry is only C1 (right). The algorithm of Pilati & Forni (1998) was used to calculate the r.m.s.d. values.

3. Supra­molecular features

The crystal structure of (I) has a packing index (Kitajgorodskij, 1973) of only 68.7%, which is at the lower end of the 65–75% range expected for organic solids (Dunitz, 1995). Indeed, the packing is determined by only weak C—H⋯O inter­actions with the THF atoms as donors and the non-coordinated triflate oxygen atoms as acceptors (Table 3). Every mol­ecule of (I) is the donor and acceptor of three inter­molecular C—H⋯O hydrogen bonds and has thus a coordination number of six. This results in a three-dimensional network.

Table 3 Hydrogen-bond geometry (Å, °) D—H⋯A D—H H⋯A D⋯A D—H⋯A C3—H3B⋯O2i 0.99 2.55 3.514 (3) 164 C11—H11B⋯O5 0.99 2.59 3.412 (3) 140 C12—H12A⋯O3ii 0.99 2.49 3.388 (3) 151 C14—H14A⋯O2 0.99 2.51 3.429 (3) 155 C16—H16B⋯O6iii 0.99 2.56 3.476 (3) 154 Symmetry codes: (i) x-1, y, z; (ii) ; (iii) .

4. Synthesis and crystallization

The title compound was obtained from an experiment aimed at synthesizing an iron coordination compound based on an oxazine ligand. In a glovebox under a di­nitro­gen atmosphere, 4a,8a-di­methyl­octa­hydro-[1,4]oxazino[3,2-b][1,4]oxazine (159 mg, 0.923 mmol) and Fe(OTf)₂·2MeCN (400 mg, 0.917 mmol) were placed in separate vials. The ligand was dissolved in THF (about 12 mL) and added to the vial containing Fe(OTf)₂·2MeCN under gentle stirring. The color of the solution turned from black to dark red and stirring was maintained overnight at room temperature. The resulting compound was precipitated twice by dropwise addition of a concentrated THF solution into hexane. The slightly pink-colored supernatants were removed by deca­ntation. The precipitated solids were washed with hexa­nes and dried under vacuum. The deca­nted solutions were stored in a freezer at 238 K and over a month light-pink crystals slowly grew.

A second crystallization starting from the isolated precipitate in an 1:1 THF:hexane solution grew similar crystals over several months at 238 K. ¹H-NMR in d₃-MeCN showed no paramagnetic peaks but small diamagnetic peaks of THF (3.64, 1.79 ppm) and hexane (1.28, 0.89 ppm). ¹⁹F-NMR showed a single sharp peak at −79.36 ppm.

5. Refinement

Crystal data, data collection and structure refinement details are summarized in Table 4. H atoms were placed in calculated positions (C—H = 0.99 Å) and refined as riding with U_iso(H) = 1.2U_eq(C).

Table 4 Experimental details Crystal data Chemical formula [Fe(CF3O3S)2(C4H8O)4] Mr 642.40 Crystal system, space group Orthorhombic, P212121 Temperature (K) 150 a, b, c (Å) 8.6618 (3), 16.2610 (6), 19.0572 (4) V (Å3) 2684.20 (14) Z 4 Radiation type Mo Kα μ (mm−1) 0.81 Crystal size (mm) 0.43 × 0.32 × 0.18   Data collection Diffractometer Bruker Kappa APEXII CCD Absorption correction Multi-scan (SADABS; Krause et al., 2015) Tmin, Tmax 0.652, 0.746 No. of measured, independent and observed [I > 2σ(I)] reflections 43720, 6166, 6027 Rint 0.020 (sin θ/λ)max (Å−1) 0.649   Refinement R[F2 > 2σ(F2)], wR(F2), S 0.019, 0.051, 1.07 No. of reflections 6166 No. of parameters 335 H-atom treatment H-atom parameters constrained Δρmax, Δρmin (e Å−3) 0.33, −0.28 Absolute structure Refined as an inversion twin Absolute structure parameter −0.001 (10) Computer programs: APEX2 (Bruker, 2007), PEAKREF (Schreurs, 2016), Eval15 (Schreurs et al., 2010), initial coordinates from isostructural Zn complex (Amel'chenkova et al., 2006), SHELXL2018 (Sheldrick, 2015), PLATON (Spek, 2009) and DRAWxtl (Finger et al., 2007).

The reflection profiles in Eval15 (Schreurs et al., 2010) were based on a split-mosaic model. Two fragments were rotated by 0.56° with respect to each other. An example for a reflection profile is shown in Fig. 4.

Figure 4 Height plot of the pixel intensities of reflection hkl = (5,,). The central frame (scan width 0.3°) is shown. Observed intensities (left) and model intensities (right). A split-mosaic model was assumed for the prediction of the profile.

Because (I) crystallizes in the Sohncke space group P2₁2₁2₁ without second kind symmetry operations, it is susceptible for an absolute structure determination. A full-matrix refinement as inversion twin results in a Flack parameter of x = −0.001 (10) (Flack, 1983). Within standard uncertainties, the crystal structure can consequently be considered as enanti­omerically pure. The standard uncertainty is corrected for the different number of observations in the point group versus the Laue group symmetry (Sheldrick, 2015). If this correction is not applied (program SHELXL97, Sheldrick, 2008), the Flack parameter is x = −0.001 (8). Analysis of 2590 intensity quotients (Parsons et al. 2013) results in an absolute structure parameter of z = −0.001 (2). Similarly, a likelihood analysis on Bijvoet differences (Hooft et al., 2008) gives an absolute structure parameter y = −0.000 (1). This analysis uses a t-value of 99, resulting in a slope of 0.885 and an inter­cept of −0.037. The student-t probability plot is linear with a correlation coefficient of 1.000. All of these different methods give a consistent result for the present crystal. The measurement of a second crystal results in x = 0.015 (11) from an inversion twin refinement, but very low standard uncertainties in the values of z = 0.015 (2) and y = 0.0012 (1) leave reasons for doubt concerning its enanti­opurity, although the Bijvoet difference related probabilities P2/P3 (true) are 1.000 and the probability P3 (false) is 0.000 in both crystals, suggesting that both crystals are enanti­opure.