Chlorido(dimethyl sulfoxide-κS)[2-(2-pyrid­yl)phenyl-κ2N,C1]platinum(II)

Kobayashi, M.; Masaoka, S.; Sakai, K.

doi:10.1107/S1600536808030109

metal-organic compounds

CRYSTALLOGRAPHIC
COMMUNICATIONS

ISSN: 2056-9890

Volume 64| Part 10| October 2008| Page m1325

doi:10.1107/S1600536808030109

Open

access

Chlorido(dimethyl sulfoxide-κS)[2-(2-pyridyl)phenyl-κ²N,C¹]platinum(II)

Masayuki Kobayashi,^a Shigeyuki Masaoka ^a and Ken Sakai ^a ^*

^aDepartment of Chemistry, Faculty of Science, Kyushu University, Hakozaki 6-10-1, Higashi-ku, Fukuoka 812-8581, Japan
^*Correspondence e-mail: ksakai@chem.kyushu-univ.jp

(Received 16 September 2008; accepted 18 September 2008; online 27 September 2008)

In the title compound, [Pt(C₁₁H₈N)Cl(C₂H₆OS)], the S atom of dimethyl sulfoxide is trans to the pyridyl N atom [Pt—S = 2.2181 (11) Å] and the chlorido ligand is trans to the carbon donor of 2-(2-pyridyl)phenyl [Pt—Cl = 2.4202 (10) Å]. The [2-(2-pyridyl)phenyl]platinum(II) unit forms a one-dimensional stack along the c axis with two independent interplanar separations of 3.44 (9) and 3.50 (2) Å.

Related literature

For background information, see: Herber et al. (1994 ); Mdleleni et al. (1995 ); Newman et al. (2007 ); Ozawa et al. (2006 , 2007 ); Sakai & Ozawa (2007 ); Sakai et al. (1993 ); Ozawa & Sakai (2007 ); Kobayashi et al. (2008 ).

Experimental

Crystal data

[Pt(C₁₁H₈N)Cl(C₂H₆OS)]
M_r = 462.85
Monoclinic, C 2/c
a = 22.414 (3) Å
b = 10.0205 (16) Å
c = 14.057 (2) Å
β = 124.512 (2)°
V = 2601.6 (7) Å³
Z = 8
Mo Kα radiation
μ = 11.14 mm⁻¹
T = 100 (2) K
0.09 × 0.08 × 0.04 mm

Data collection

Bruker SMART APEXII CCD-detector diffractometer
Absorption correction: multi-scan (SADABS; Sheldrick, 1996 ) T_min = 0.486, T_max = 0.640
7004 measured reflections
2850 independent reflections
2448 reflections with I > 2σ(I)
R_int = 0.018

Refinement

R[F² > 2σ(F²)] = 0.023
wR(F²) = 0.064
S = 1.11
2850 reflections
165 parameters
H-atom parameters constrained
Δρ_max = 2.05 e Å⁻³
Δρ_min = −1.43 e Å⁻³

Data collection: APEX2 (Bruker, 2006 ); cell refinement: APEX2; data reduction: SAINT (Bruker, 2004 ); program(s) used to solve structure: SHELXS97 (Sheldrick, 2008 ); program(s) used to refine structure: SHELXL97 (Sheldrick, 2008); molecular graphics: KENX (Sakai, 2004 ); software used to prepare material for publication: SHELXL97, TEXSAN (Molecular Structure Corporation, 2001 ), KENX and ORTEPII (Johnson, 1976 ).

Supporting information

Crystal structure: contains datablocks global, I. DOI: 10.1107/S1600536808030109/at2633sup1.cif

Structure factors: contains datablock I. DOI: 10.1107/S1600536808030109/at2633Isup2.hkl

checkCIF report

Comment top

Interests over many years have concentrated on the molecular catalysis of Pt^II complexes in photochemical hydrogen production from water (Sakai et al., 1993; Ozawa et al., 2006; Sakai & Ozawa, 2007; Ozawa, Yokoyama et al., 2007). The results obtained so far suggest that destabilization of the HOMO, which generally corresponds to the filled Pt^II d_z2 orbital, gives rise to the higher H₂-evolving activity of the complexes (Sakai & Ozawa, & Sakai, 2007). It has also been ascertained that the mononuclear Pt^II complexes possessing a cis-PtCl₂ unit, such as cis-PtCl₂(NH₃)₂, PtCl₂(4,4'-dicarboxy-2,2'-bipyridine), and PtCl₂(2,2'-bipyrimidine), exhibit considerably higher H₂-evolving activity in comparison with those only having the amine or pyridyl type of neutral ligands, such as [Pt(NH₃)₄]²⁺ and [Pt(bpy)₂]²⁺ (Ozawa, Yokoyama et al., 2007). In this context, the 2-phenylpyridinate (ppy) ligand was selected because of the well known strong σ-donating character of the C(ppy) donor, expecting the higher energy level of the HOMO for the Pt^II(ppy) complexes. As a result, the first water-soluble salt of [Pt(ppy)Cl₂]^-, that is, [K(18-crown-6)][Pt(ppy)Cl₂]^.0.5H₂O (18-crown-6 = 1,4,7,10,13,16-hexaoxacyclooctadecane) [abbreviated as compound (II)], was recently prepared in our group and its catalytic activity in photochemical hydrogen production from water was examined in detail (Kobayashi et al., in submission). The title compound, Pt(ppy)Cl(DMOS-S) (DMSO = dimethyl sulfoxide) [abbreviated as compound (I)], was first prepared from recrystallization of (II) from DMSO, but an improved synthetic route is reported in this work (see Experimental Section). It has been ascertained that the H₂-evolving activity of (I) is much lower than that of (II), the reason for which remains ambiguous at the moment.

The donor atoms, except for the sulfur atom S1, comprise a planar geometry and the Pt atom (Pt1) does not deviate from this plane at all. The four-atom r.m.s. deviation, given in the best-plane calculation for the plane defined by atoms N1, C11, Cl1, and Pt1, was negligible (0.0003). Hereafter, this plane is defined as the Pt coordination plane. The sulfur atom (S1) and the oxygen atom (O1) of DMSO are only slightly shifted out of this plane by 0.067 (5) and 0.045 (8) Å, respectively. The torsion angles given by C11—Pt1—S1—O1 = 2.4 (2) and Cl1—Pt1—S1—O1 = -177.83 (17)° also reveal that the oxygen atom of DMSO is not largely shifted out of the coordination plane. Thus, it can be considered that (I) adopts a pseudo mirror symmetry. The benzene ring consisting of atoms C6—C11 is nearly coplanar with the coordination plane, where the dihedral angle between the benzene and the coordination planes is calculated as 0.7 (2)°. The pyridyl plane defined by atoms N1 and C1—C5 is slightly declined with respect to the coordination plane by 2.8 (2)°. The dihedral angle between the two aromatic rings is 2.5 (2)°.

The ppy ligand in compound (I, Fig. 1) does not suffer from any disorder problem. Indeed, there is a clear difference in the bond lengths of Pt—N(ppy) and Pt—C(ppy); Pt1—N1 = 2.069 (3) and Pt1—C11 = 2.002 (4) Å. Because of the strong trans influence originated by the C(ppy) donor, Pt1—Cl1 distance [2.4202 (10) Å] is longer than those reported for PtCl₂(2,2'-bipyridine) [2.281 (4) - 2.306 (2) Å; Herber et al., 1994]. Th Pt1—Cl1 distance is comparable to the value reported for Pt(ppy)(Hppy)Cl [2.4145 (23) Å; Mdleleni et al., 1995]. In addition, the Pt1—S1 bond distance [2.2181 (11) Å], in the position trans to the N(ppy) donor, is comparable to those previously reported for Pt(2-(4-fluorophenyl)pyridine)Cl(DMSO) [2.2161 (16) Å; Newman et al., 2007].

On the other hand, compound (I) forms a one-dimensional stack along the c axis based on the π-π stacking interactions between the phenylpyridinatoplatinum(II) units (see Fig. 2). The separation between the two adjacent planes is estimated as 3.44 (9) Å for the stack shown in Fig. 4 and 3.50 (2) Å for that in Fig. 5. In the former (Fig. 4), atoms C1ⁱ, C5ⁱ, N1ⁱ, and Pt1ⁱ have an interaction to the phenylpyridinate moiety originally located and therefore shifts of these atoms from the best plane defined by atoms N1 and C1—C11 are used to calculate the separation of the two stacked planes at this geometry. In the latter (Fig. 5), atoms N1ⁱⁱ, C1ⁱⁱ, Cⁱⁱ2, C5ⁱⁱ, C6ⁱⁱ, C10ⁱⁱ, C11ⁱⁱ, and Pt1ⁱⁱ are involved in the π-stacking association and their shifts from the best plane defined by atoms N1 and C1—C11 are similarly used to calculate the separation at this geometry. In these geometries, strong d-π interactions also contribute to the stabilization of stacking associations [Pt1—C4ⁱ = 3.525 (4) and Pt1—C4ⁱⁱ = 3.523 (4) Å; symmetry codes: (i) -x, y, 0.5 - z; (ii) -x, 1 - y, 1 - z]. Finally, it must be noted that metal-metal interactions are unimportant in this crystal [Pt1—Pt1ⁱ = 5.9946 (8) and Pt1—Pt1ⁱⁱ = 5.4225 (9) Å], where the symmetry operations are same to those given in Fig. 4 and Fig. 5.

Related literature top

For related literature, see: Herber et al. (1994); Mdleleni et al. (1995); Newman et al. (2007); Ozawa et al. (2006); Ozawa, Yokoyama, Haga & Sakai (2007); Sakai & Ozawa (2007); Sakai et al. (1993); Ozawa & Sakai (2007); Kobayashi et al. (2008). It would be much more useful to readers if the "Related literature" section had some kind of simple sub-division, so that, instead of just "For related literature, see···" it said, for example, "For general background, see···. For related structures, see···.? etc. Please revise this section as indicated.

Experimental top

A mixture of cis-PtCl₂(DMSO)₂ (0.21 g, 0.50 mmol) and 2-phenylpyridine (0.078 g, 0.50 mmol) in methanol (10 ml) was sealed in a pressure-resistant vial and was stirred at 393 K for 3 h. After the solution was cooled down to room temperature, the yellow precipitate of compound (I) was filtrated and dried in vacuo (Caution! Do not open the vial while it is hot, since the solution splashes out because of the violent boiling phenomenon upon a sudden decrease in pressure). Yield: 0.14 g (60%). Analysis calculated for C₁₃H₁₄ClNOPtS: C 33.73, H 3.05, N 3.03. Found: C 33.95, H 2.99, N 3.02. ¹H NMR (300.53 MHz, acetone-d₆), p.p.m.: δ 9.63 [d, J = 5.97 Hz, ³J(¹⁹⁵Pt-¹H) = 17.8 Hz, 1H], 8.37 [d, J = 6.81 Hz, ³J(¹⁹⁵Pt-¹H) = 22.8 Hz, 1H], 8.16–8.06 (m, 2H), 7.25 (d, J = 6.46 Hz), 7.48 (t, J = 6.43 Hz), 7.20–7.11 (m, 2H), 3.63 [s, ³J(¹⁹⁵Pt-¹H) = 12.2 Hz, 6H]. A good quality single-crystal was prepared by diffusion of methanol into a DMSO solution of (I).

Computing details top

Data collection: APEX2 (Bruker, 2006); cell refinement: APEX2 (Bruker, 2006); data reduction: SAINT (Bruker, 2004); program(s) used to solve structure: SHELXS97 (Sheldrick, 2008); program(s) used to refine structure: SHELXL97 (Sheldrick, 2008); molecular graphics: KENX (Sakai, 2004); software used to prepare material for publication: SHELXL97 (Sheldrick, 2008), TEXSAN (Molecular Structure Corporation, 2001), KENX (Sakai, 2004) and ORTEPII (Johnson, 1976).

Figures top

	Fig. 1. The molecular structure of (I) showing the atom-labeling scheme. Displacement ellipsoids are drawn at the 50% probability level.
	Fig. 2. Views down the c axis, showing the manner how the phenylpyridinatoplatinum(II) units are stacked along the c axis to give a one-dimensoinal network. Hydrogen atoms are omitted for clarity.
	Fig. 3. Views down the b axis, showing the manner how the phenylpyridinatoplatinum(II) units are stacked along the c axis to give a one-dimensoinal network. Hydrogen atoms are omitted for clarity.
	Fig. 4. Views perpendicular to the aromatic systems that are stacked at two independent geometries [Symmetry code: (i) -x, y, 0.5 - z].
	Fig. 5. Views perpendicular to the aromatic systems that are stacked at two independent geometries [Symmetry code: (ii) -x, 1 - y, 1 - z].

Chlorido(dimethyl sulfoxide-κS)[2-(2-pyridyl)phenyl-κ²N,C¹]platinum(II) top

Crystal data top

[Pt(C₁₁H₈N)Cl(C₂H₆OS)]	F(000) = 1744
M_r = 462.85	D_x = 2.363 Mg m⁻³
Monoclinic, C2/c	Mo Kα radiation, λ = 0.71073 Å
Hall symbol: -C 2yc	Cell parameters from 3936 reflections
a = 22.414 (3) Å	θ = 2.5–27.9°
b = 10.0205 (16) Å	µ = 11.14 mm⁻¹
c = 14.057 (2) Å	T = 100 K
β = 124.512 (2)°	Prisms, yellow
V = 2601.6 (7) Å³	0.09 × 0.08 × 0.04 mm
Z = 8

Data collection top

Bruker SMART APEX CCD-detector diffractometer	2850 independent reflections
Radiation source: rotating anode with a mirror focusing unit	2448 reflections with I > 2σ(I)
Graphite monochromator	R_int = 0.018
ϕ and ω scans	θ_max = 27.1°, θ_min = 2.2°
Absorption correction: multi-scan (SADABS; Sheldrick, 1996)	h = −28→28
T_min = 0.486, T_max = 0.640	k = −12→9
7004 measured reflections	l = −18→15

Refinement top

Refinement on F²	Primary atom site location: structure-invariant direct methods
Least-squares matrix: full	Secondary atom site location: difference Fourier map
R[F² > 2σ(F²)] = 0.023	Hydrogen site location: inferred from neighbouring sites
wR(F²) = 0.064	H-atom parameters constrained
S = 1.11	w = 1/[σ²(F_o²) + (0.0295P)² + 15.2156P] where P = (F_o² + 2F_c²)/3
2850 reflections	(Δ/σ)_max = 0.002
165 parameters	Δρ_max = 2.05 e Å⁻³
0 restraints	Δρ_min = −1.43 e Å⁻³

Crystal data top

[Pt(C₁₁H₈N)Cl(C₂H₆OS)]	V = 2601.6 (7) Å³
M_r = 462.85	Z = 8
Monoclinic, C2/c	Mo Kα radiation
a = 22.414 (3) Å	µ = 11.14 mm⁻¹
b = 10.0205 (16) Å	T = 100 K
c = 14.057 (2) Å	0.09 × 0.08 × 0.04 mm
β = 124.512 (2)°

Data collection top

Bruker SMART APEX CCD-detector diffractometer	2850 independent reflections
Absorption correction: multi-scan (SADABS; Sheldrick, 1996)	2448 reflections with I > 2σ(I)
T_min = 0.486, T_max = 0.640	R_int = 0.018
7004 measured reflections

Refinement top

R[F² > 2σ(F²)] = 0.023	0 restraints
wR(F²) = 0.064	H-atom parameters constrained
S = 1.11	w = 1/[σ²(F_o²) + (0.0295P)² + 15.2156P] where P = (F_o² + 2F_c²)/3
2850 reflections	Δρ_max = 2.05 e Å⁻³
165 parameters	Δρ_min = −1.43 e Å⁻³

Special details top

Experimental. The first 50 frames were rescanned at the end of data collection to evaluate any possible decay phenomenon. Since it was judged to be negligible, no decay correction was applied to the data.

Geometry. All e.s.d.'s (except the e.s.d. in the dihedral angle between two l.s. planes) are estimated using the full covariance matrix. The cell e.s.d.'s are taken into account individually in the estimation of e.s.d.'s in distances, angles and torsion angles; correlations between e.s.d.'s in cell parameters are only used when they are defined by crystal symmetry. An approximate (isotropic) treatment of cell e.s.d.'s is used for estimating e.s.d.'s involving l.s. planes.

Least-squares planes (x,y,z in crystal coordinates) and deviations from them (* indicates atom used to define plane)

-14.3368 (0.0269) x - 0.3580 (0.0127) y + 13.9887 (0.0034) z = 5.0906 (0.0091)

* 0.0000 (0.0001) N1 * -0.0003 (0.0009) C11 * -0.0002 (0.0007) Cl1 * 0.0004 (0.0015) Pt1 - 0.0669 (0.0049) S1 - 0.0453 (0.0077) O1

Rms deviation of fitted atoms = 0.0003

-15.0609 (0.0266) x - 0.5670 (0.0181) y + 13.9054 (0.0039) z = 4.9585 (0.0082)

Angle to previous plane (with approximate e.s.d.) = 2.77 (0.16)

* -0.0032 (0.0026) N1 * 0.0072 (0.0030) C1 * -0.0025 (0.0030) C2 * -0.0058 (0.0029) C3 * 0.0096 (0.0029) C4 * -0.0052 (0.0027) C5 - 0.1020 (0.0055) Pt1

Rms deviation of fitted atoms = 0.0061

-14.3427 (0.0315) x - 0.4723 (0.0194) y + 13.9812 (0.0035) z = 5.0095 (0.0158)

Angle to previous plane (with approximate e.s.d.) = 2.52 (0.18)

* -0.0053 (0.0030) C6 * 0.0050 (0.0034) C7 * 0.0011 (0.0036) C8 * -0.0071 (0.0033) C9 * 0.0068 (0.0030) C10 * -0.0006 (0.0029) C11 0.0196 (0.0064) Pt1

Rms deviation of fitted atoms = 0.0050

-14.3368 (0.0269) x - 0.3580 (0.0127) y + 13.9887 (0.0034) z = 5.0906 (0.0091)

Angle to previous plane (with approximate e.s.d.) = 0.66 (0.17)

* 0.0000 (0.0001) N1 * -0.0003 (0.0009) C11 * -0.0002 (0.0007) Cl1 * 0.0004 (0.0015) Pt1 - 0.0669 (0.0049) S1 - 0.0453 (0.0077) O1

Rms deviation of fitted atoms = 0.0003

-14.6775 (0.0205) x - 0.4790 (0.0073) y + 13.9524 (0.0028) z = 4.9852 (0.0045)

Angle to previous plane (with approximate e.s.d.) = 1.36 (0.14)

* 0.0328 (0.0031) N1 * 0.0226 (0.0035) C1 * -0.0212 (0.0037) C2 * -0.0380 (0.0034) C3 * -0.0016 (0.0037) C4 * 0.0177 (0.0038) C5 * 0.0052 (0.0039) C6 * 0.0303 (0.0041) C7 * 0.0139 (0.0042) C8 * -0.0215 (0.0039) C9 * -0.0223 (0.0033) C10 * -0.0180 (0.0035) C11 - 3.4480 (0.0042) N1_$1 - 3.3136 (0.0062) C1_$1 - 3.5267 (0.0045) C5_$1 - 3.4606 (0.0029) Pt1_$1

Rms deviation of fitted atoms = 0.0228

-14.6775 (0.0205) x - 0.4790 (0.0073) y + 13.9524 (0.0028) z = 4.9852 (0.0045)

Angle to previous plane (with approximate e.s.d.) = 0.00 (0.12)

* 0.0328 (0.0031) N1 * 0.0226 (0.0035) C1 * -0.0212 (0.0037) C2 * -0.0380 (0.0034) C3 * -0.0016 (0.0037) C4 * 0.0177 (0.0038) C5 * 0.0052 (0.0039) C6 * 0.0303 (0.0041) C7 * 0.0139 (0.0042) C8 * -0.0215 (0.0039) C9 * -0.0223 (0.0033) C10 * -0.0180 (0.0035) C11 3.4700 (0.0040) N1_$2 3.4803 (0.0050) C1_$2 3.5240 (0.0050) C2_$2 3.4851 (0.0048) C5_$2 3.4977 (0.0053) C6_$2 3.5252 (0.0047) C10_$2 3.5209 (0.0046) C11_$2 3.5174 (0.0022) Pt1_$2

Rms deviation of fitted atoms = 0.0228

Refinement. Refinement of F² against ALL reflections. The weighted R-factor wR and goodness of fit S are based on F², conventional R-factors R are based on F, with F set to zero for negative F². The threshold expression of F² > σ(F²) is used only for calculating R-factors(gt) etc. and is not relevant to the choice of reflections for refinement. R-factors based on F² are statistically about twice as large as those based on F, and R- factors based on ALL data will be even larger.

Fractional atomic coordinates and isotropic or equivalent isotropic displacement parameters (Å²) top

	x	y	z	U_iso*/U_eq
Pt1	0.121378 (8)	0.501904 (14)	0.501179 (13)	0.01100 (7)
Cl1	0.16776 (5)	0.27601 (10)	0.54289 (9)	0.0177 (2)
S1	0.23482 (5)	0.57296 (10)	0.61446 (9)	0.0135 (2)
O1	0.25415 (16)	0.7153 (3)	0.6395 (3)	0.0207 (7)
N1	0.01517 (18)	0.4393 (4)	0.3907 (3)	0.0130 (7)
C1	−0.0056 (2)	0.3097 (4)	0.3637 (4)	0.0188 (9)
H1	0.0298	0.2412	0.4003	0.023*
C2	−0.0769 (2)	0.2759 (4)	0.2843 (4)	0.0198 (9)
H2	−0.0905	0.1849	0.2656	0.024*
C3	−0.1290 (2)	0.3759 (5)	0.2317 (4)	0.0179 (9)
H3	−0.1784	0.3542	0.1764	0.021*
C4	−0.1079 (3)	0.5076 (4)	0.2611 (4)	0.0156 (9)
H4	−0.1428	0.5771	0.2276	0.019*
C5	−0.0353 (2)	0.5373 (4)	0.3399 (4)	0.0128 (8)
C6	−0.0046 (2)	0.6714 (4)	0.3759 (4)	0.0141 (8)
C7	−0.0479 (2)	0.7861 (4)	0.3361 (4)	0.0226 (10)
H7	−0.0990	0.7784	0.2841	0.027*
C8	−0.0161 (3)	0.9104 (5)	0.3726 (5)	0.0286 (11)
H8	−0.0453	0.9885	0.3455	0.034*
C9	0.0584 (2)	0.9211 (4)	0.4488 (4)	0.0216 (9)
H9	0.0804	1.0066	0.4732	0.026*
C10	0.1010 (2)	0.8066 (4)	0.4897 (4)	0.0158 (8)
H10	0.1519	0.8155	0.5433	0.019*
C11	0.0714 (2)	0.6793 (4)	0.4545 (4)	0.0128 (8)
C12	0.2791 (2)	0.4911 (4)	0.7508 (4)	0.0183 (9)
H12A	0.3312	0.5089	0.7948	0.027*
H12B	0.2706	0.3948	0.7389	0.027*
H12C	0.2598	0.5247	0.7938	0.027*
C13	0.2836 (3)	0.5101 (4)	0.5582 (4)	0.0198 (10)
H13A	0.2636	0.5486	0.4816	0.030*
H13B	0.2791	0.4127	0.5519	0.030*
H13C	0.3348	0.5346	0.6101	0.030*

Atomic displacement parameters (Å²) top

	U¹¹	U²²	U³³	U¹²	U¹³	U²³
Pt1	0.01044 (10)	0.00879 (10)	0.01265 (11)	0.00073 (6)	0.00587 (8)	0.00039 (5)
Cl1	0.0155 (5)	0.0109 (4)	0.0218 (5)	0.0024 (4)	0.0076 (4)	0.0010 (4)
S1	0.0114 (5)	0.0116 (5)	0.0152 (5)	0.0004 (4)	0.0062 (4)	−0.0005 (4)
O1	0.0144 (15)	0.0135 (15)	0.0254 (17)	−0.0006 (12)	0.0061 (13)	−0.0018 (13)
N1	0.0105 (16)	0.0156 (17)	0.0126 (16)	0.0001 (15)	0.0064 (14)	0.0002 (14)
C1	0.019 (2)	0.013 (2)	0.020 (2)	0.0007 (17)	0.0082 (19)	0.0022 (17)
C2	0.022 (2)	0.013 (2)	0.023 (2)	−0.0050 (18)	0.012 (2)	−0.0042 (17)
C3	0.014 (2)	0.021 (2)	0.019 (2)	−0.0037 (17)	0.0096 (18)	−0.0006 (17)
C4	0.017 (2)	0.014 (2)	0.017 (2)	0.0010 (16)	0.0104 (19)	0.0008 (15)
C5	0.015 (2)	0.0156 (19)	0.0109 (19)	0.0004 (17)	0.0088 (17)	0.0003 (16)
C6	0.015 (2)	0.012 (2)	0.015 (2)	0.0003 (16)	0.0081 (17)	−0.0006 (15)
C7	0.017 (2)	0.015 (2)	0.032 (3)	0.0022 (18)	0.012 (2)	0.0014 (19)
C8	0.021 (2)	0.014 (2)	0.041 (3)	0.0067 (18)	0.012 (2)	0.003 (2)
C9	0.018 (2)	0.012 (2)	0.033 (3)	−0.0042 (18)	0.013 (2)	−0.0027 (19)
C10	0.0127 (19)	0.017 (2)	0.016 (2)	0.0009 (17)	0.0064 (17)	0.0016 (16)
C11	0.014 (2)	0.0118 (18)	0.015 (2)	0.0023 (16)	0.0100 (17)	0.0014 (16)
C12	0.013 (2)	0.021 (2)	0.017 (2)	0.0016 (16)	0.0062 (19)	0.0009 (16)
C13	0.017 (2)	0.021 (2)	0.025 (2)	−0.0001 (17)	0.014 (2)	−0.0019 (17)

Geometric parameters (Å, º) top

Pt1—C11	2.002 (4)	C3—H3	0.9500
Pt1—N1	2.069 (3)	C4—H4	0.9500
Pt1—S1	2.2181 (11)	C5—C6	1.464 (6)
Pt1—Cl1	2.4202 (10)	C6—C7	1.400 (6)
S1—O1	1.474 (3)	C6—C11	1.413 (6)
S1—C12	1.782 (5)	C7—C8	1.382 (6)
S1—C13	1.788 (5)	C7—H7	0.9500
N1—C5	1.355 (6)	C8—C9	1.386 (6)
N1—C1	1.359 (6)	C8—H8	0.9500
C1—C2	1.377 (6)	C9—C10	1.392 (6)
C2—C3	1.392 (6)	C9—H9	0.9500
C3—C4	1.384 (6)	C10—C11	1.393 (6)
C4—C5	1.385 (6)	C10—H10	0.9500
Pt1—C4ⁱ	3.525 (4)	C12—H12A	0.9800
Pt1—C4ⁱⁱ	3.523 (4)	C12—H12B	0.9800
Pt1—Pt1ⁱ	5.9946 (8)	C12—H12C	0.9800
Pt1—Pt1ⁱⁱ	5.4225 (9)	C13—H13A	0.9800
C1—H1	0.9500	C13—H13B	0.9800
C2—H2	0.9500	C13—H13C	0.9800

C11—Pt1—N1	80.28 (16)	C7—C6—C11	121.5 (4)
C11—Pt1—S1	98.69 (12)	C7—C6—C5	122.1 (4)
N1—Pt1—S1	177.97 (10)	C11—C6—C5	116.3 (4)
C11—Pt1—Cl1	173.26 (12)	C8—C7—C6	119.8 (4)
N1—Pt1—Cl1	92.98 (10)	C8—C7—H7	120.1
S1—Pt1—Cl1	88.05 (4)	C6—C7—H7	120.1
O1—S1—C12	106.22 (19)	C7—C8—C9	119.9 (4)
O1—S1—C13	106.0 (2)	C7—C8—H8	120.0
C12—S1—C13	101.9 (2)	C9—C8—H8	120.0
O1—S1—Pt1	122.98 (13)	C8—C9—C10	120.0 (4)
C12—S1—Pt1	109.74 (15)	C8—C9—H9	120.0
C13—S1—Pt1	107.97 (16)	C10—C9—H9	120.0
C5—N1—C1	119.6 (4)	C9—C10—C11	122.1 (4)
C5—N1—Pt1	116.0 (3)	C9—C10—H10	119.0
C1—N1—Pt1	124.4 (3)	C11—C10—H10	119.0
N1—C1—C2	121.2 (4)	C10—C11—C6	116.7 (4)
N1—C1—H1	119.4	C10—C11—Pt1	129.1 (3)
C2—C1—H1	119.4	C6—C11—Pt1	114.2 (3)
C1—C2—C3	119.5 (4)	S1—C12—H12A	109.5
C1—C2—H2	120.2	S1—C12—H12B	109.5
C3—C2—H2	120.2	H12A—C12—H12B	109.5
C4—C3—C2	119.1 (4)	S1—C12—H12C	109.5
C4—C3—H3	120.5	H12A—C12—H12C	109.5
C2—C3—H3	120.5	H12B—C12—H12C	109.5
C3—C4—C5	119.5 (4)	S1—C13—H13A	109.5
C3—C4—H4	120.3	S1—C13—H13B	109.5
C5—C4—H4	120.3	H13A—C13—H13B	109.5
N1—C5—C4	121.2 (4)	S1—C13—H13C	109.5
N1—C5—C6	113.2 (4)	H13A—C13—H13C	109.5
C4—C5—C6	125.6 (4)	H13B—C13—H13C	109.5

C11—Pt1—S1—O1	2.4 (2)	C4—C5—C6—C7	2.9 (7)
Cl1—Pt1—S1—O1	−177.83 (17)	N1—C5—C6—C11	1.3 (5)
C5—N1—C1—C2	0.9 (6)	C4—C5—C6—C11	−177.9 (4)
N1—C1—C2—C3	−0.8 (7)	C11—C6—C7—C8	0.9 (7)
C1—C2—C3—C4	−0.4 (6)	C5—C6—C7—C8	−179.9 (4)
C2—C3—C4—C5	1.6 (6)	C6—C7—C8—C9	−0.3 (8)
C1—N1—C5—C4	0.3 (6)	C7—C8—C9—C10	−0.9 (7)
C1—N1—C5—C6	−178.9 (4)	C8—C9—C10—C11	1.4 (7)
C3—C4—C5—N1	−1.5 (6)	C9—C10—C11—C6	−0.8 (6)
C3—C4—C5—C6	177.5 (4)	C7—C6—C11—C10	−0.4 (6)
N1—C5—C6—C7	−178.0 (4)	C5—C6—C11—C10	−179.6 (4)

Symmetry codes: (i) −x, y, −z+1/2; (ii) −x, −y+1, −z+1.

Experimental details

Crystal data
Chemical formula	[Pt(C₁₁H₈N)Cl(C₂H₆OS)]
M_r	462.85
Crystal system, space group	Monoclinic, C2/c
Temperature (K)	100
a, b, c (Å)	22.414 (3), 10.0205 (16), 14.057 (2)
β (°)	124.512 (2)
V (Å³)	2601.6 (7)
Z	8
Radiation type	Mo Kα
µ (mm⁻¹)	11.14
Crystal size (mm)	0.09 × 0.08 × 0.04

Data collection
Diffractometer	Bruker SMART APEX CCD-detector diffractometer
Absorption correction	Multi-scan (SADABS; Sheldrick, 1996)
T_min, T_max	0.486, 0.640
No. of measured, independent and observed [I > 2σ(I)] reflections	7004, 2850, 2448
R_int	0.018
(sin θ/λ)_max (Å⁻¹)	0.641

Refinement
R[F² > 2σ(F²)], wR(F²), S	0.023, 0.064, 1.11
No. of reflections	2850
No. of parameters	165
H-atom treatment	H-atom parameters constrained
	w = 1/[σ²(F_o²) + (0.0295P)² + 15.2156P] where P = (F_o² + 2F_c²)/3
Δρ_max, Δρ_min (e Å⁻³)	2.05, −1.43

Computer programs: APEX2 (Bruker, 2006), SAINT (Bruker, 2004), SHELXS97 (Sheldrick, 2008), SHELXL97 (Sheldrick, 2008), TEXSAN (Molecular Structure Corporation, 2001), KENX (Sakai, 2004) and ORTEPII (Johnson, 1976).

Acknowledgements

This work was in part supported by a Grant-in-Aid for Scientific Research (A) (No. 17205008), a Grant-in-Aid for Specially Promoted Research (No. 18002016), and a Grant-in-Aid for the Global COE Program (`Science for Future Molecular Systems') from the Ministry of Education, Culture, Sports, Science, and Technology of Japan.

References

Bruker (2004). SAINT. Bruker AXS Inc., Madison, Wisconsin, USA. Google Scholar
Bruker (2006). APEX2. Bruker AXS Inc., Madison, Wisconsin, USA. Google Scholar
Herber, R. H., Croft, M., Coyer, M. J., Bilash, B. & Sahiner, A. (1994). Inorg. Chem. 33, 2422–2426. CrossRef CAS Web of Science Google Scholar
Johnson, C. K. (1976). ORTEPII. Report ORNL-5138. Oak Ridge National Laboratory, Tennessee, USA. Google Scholar
Kobayashi, M., Masaoka, M. & Sakai, K. (2008). Photochem. Photobiol. Sci. Submitted. Google Scholar
Mdleleni, M. M., Bridgewater, J. S., Watts, R. J. & Ford, P. C. (1995). Inorg. Chem. 34, 2334–2342. CrossRef CAS Web of Science Google Scholar
Molecular Structure Corporation (2001). TEXSAN. MSC, The Woodlands, Texas, USA. Google Scholar
Newman, C. P., Casey-Green, K., Clarkson, G. J., Cave, G. W. V., Errington, W. & Rourke, J. P. (2007). Dalton Trans. pp. 3170–3182. Web of Science CSD CrossRef Google Scholar
Ozawa, H., Haga, M. & Sakai, K. (2006). J. Am. Chem. Soc. 128, 4926–4927. Web of Science CrossRef PubMed CAS Google Scholar
Ozawa, H. & Sakai, K. (2007). Chem. Lett. 36, 920–921. Web of Science CrossRef CAS Google Scholar
Ozawa, H., Yokoyama, Y., Haga, M. & Sakai, K. (2007). Dalton Trans. pp. 1197–1206. Web of Science CrossRef Google Scholar
Sakai, K. (2004). KENX. Kyushu University, Japan. Google Scholar
Sakai, K., Kizaki, Y., Tsubomura, T. & Matumoto, K. (1993). J. Mol. Catal. 79, 141–152. CrossRef CAS Google Scholar
Sakai, K. & Ozawa, H. (2007). Coord. Chem. Rev. 251, 2753–2766. Web of Science CrossRef CAS Google Scholar
Sheldrick, G. M. (1996). SADABS. University of Göttingen, Germany. Google Scholar
Sheldrick, G. M. (2008). Acta Cryst. A64, 112–122. Web of Science CrossRef CAS IUCr Journals Google Scholar