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Atomic force constants and apparent electron densities in elemental sulfur
Speotrochimica Acts, Vol. 31A, PP.1421 to 1425. Pergamon Press,1975. Printedin Northern Ireland
Atomic force constants and apparent electron densities in elemental sulfur w.
T. &NQ
Metcalf Researoh Laboratory, Brown University, Providence, Rhode Island 02912, U.S.A. (Received24 August 1974) &&a&-The atomio foroe constants for sulfur in the ring compounds S,, S, and S,, are found to be 476 f 2 N/m, and to be transferable between these three sulfur compounds. Using a simple “atoms in molecules” model to approximate the electron density for a sulfur atom, the magnitudes of the force constant for sulfur was computed and found to be consistent with the structures of these compounds.
INTRODUCTION In a recent paper, STEUDEL and EGGERS [l, 21 reported the vibrational
assignments and force con-
stants in S,,, and compared their results with those found by SCOTT, MCCULLOUGH and KRUSE [3, 41 from a similar analysis of S,.
tion of the generalized harmonio valence force constants usually considered in a vibrational analysis [S]. Atomic force constants are related to the normal modes of molecules by the frequency sum rule, originally derived by DECIUS and WILSON [13], but expressed in a Cartesian coordinate representation [8, 141,
Earlier, a comparable
analysis of the spectra of S, was reported by NIMON and NEW
[5, 61, who also compared their results
with the force constants in S,.
It was found that
the normal modes in these ring compounds accounted potential eters.
for by a modified Urey-Eradley function
containing
Consequently,
were model
only a few psram-
it was suggested
that
this
model is generally applicable to sulfur ring systems, and that the small, but significant differences in some of the model parameters in the different systems were explicable in terms of the interactions between lone pair electrons in these ring structures. In this paper the similarity between S,, S, and S,, is also examined,
but from the different point
of view provided by the so-called atomic force constants [7, 81. These force constants constitute one important
property
of molecular
potential
I
in which the wj are the normal harmonic frequencies (0, = 27rcovj), and the prrare the reciprocals of atomic masses. The summations extend over all normal modes, j, and over all atoms, a, respectively. Although an atomic force constant describes only one property of the total molecular potential function, that property is of considerable interest for several reasons. Of primary importance here, the sum rule (2) relating these force constants to molecular frequencies does not depend explicitly upon molecular geometry. This makes it possible to compare the atomic force constants for an atom in different molecules directly, without introducing additional assumptions about the effects of redundancies and other constraints on the force constants or about the specific molecular force field. For example, since the sulfur atoms in S, and S, are all symmetrically equivalent [3-61, the sum over c(in (2) can be reduced to a single term,
func-
2 wje = ,usNsVsaU
tions that is readily determined for these systems, without
introducing
models.
It is found that the atomic force constant
specific
potential
function
for sulfur is essentially identical in these three ring systems, and that their magnitudes
are accounted
by a simple “atoms in molecules” model for atomic force constants applied to these structures [B-12]. THEORY The atomic force constant, V,*lJ, for an atom ccin a molecule, is defined as the Laplacian of the molecular potential energy function U(R), differentiated with respect to the Cartesian coordinates of the atom considered, V,=U =
awlax, + awlay,= +
aw/a2,8 (1)
and is nothing more than a particular linear combina-
a-
(3)
in which Ns is the number of sulfur atoms in the ring. Consequently, the atomic force constants for sulfur in S, or S, are found from (3) simply by computing the appropriate squared frequency sums. Although the sulfur atoms in S,, are not all exactly equivalent, equation 3, with N, = 12, is used here to determine an averaged value for VsaU in S,,, and, based upon the theoretical analysis outlined below, it is anticipated that the dispersion of this averaged value is quite small. A second reason for the interest in atomic force constants is that they are simply related to the electron densities in molecules. It has been shown that [lO-121
v,‘u
= ~-%p(R,) - %(v,p - V,(l/lr
- R,])) (4)
where p(R,) denotes the total electron density at nucleus a, and 2, is the nuclear charge. If the electron
1421
W. T. Kma
1422
CALCULATIONS AND RESULTS
density is represented by an expansion in atomic orbitals centered on each nucleus [15] p(r) =c
x C/VXS&
B>Y
-
WXYA
-
BYI
(6)
i.j
in which, for instance, xpi(v --Rg) denotes an orbital on nucleus /?in quantum state i, and Cp,o is an appropriate density matrix element, then (4) can be reduced to the sum of three terms [9, 10, 121, v,2u
= 471.%[ 2 ps(%) Bita
+ c
analysis
atomic
force
termined
of the sulfur ring systems,
constants
cies for these systems cited
above,
using
@@rW (6)
~a(%)
= c C~‘%i(R&pr(%)
Qgy(R,) = --@a) 2 k;i IV&lb i.j
(7)
- R,I)I xrj * v,Cpr*9 (8)
and (9) i.’
It should be pointed out here that Equation 6 is essentially exact, in that only theBorn-Oppenheimer approximation and a few mathematioal approximations concerned with the expansion in (6) have been used in its derivation. The first term represents the interaction of the nuclear charge on 0: with the charge distributions, pb[R,], centered on the other atoms in the molecule, the second term represents the interaations resulting from the redistribution of charge due to nuclear displacement, and the third term represents the interaction of the nuclear charge with the non-classical “interference” electron density [15] in the moleoule. According to Equation 6, then, atomio force oonstants depend upon properties of the total electron density in molecules. Because of this it is possible to reduce this equation to a more tractable approximate form and to obtain a useful structural interpretation of atomic force constants. To this end, a very simple form of the “atoms in molecules” model [16] is adopted whereby the terms (8) and (9) are assumed to be negligible, so that (6) is reduced to a linear superposition of two center terms called “bond constants,” V,‘u where K,,M,p)
N c K&W ##Cc
(16)
= 4n-%p,M,)
The approximations by which (6) is reduced to (10) are based upon the general observation that total molecular electron densities are very nearly equal to those obtained by superimposing the densities of the constituent atoms, and they are justified in detail, at least for first and second row elements, elsewhere [g-12]. A third reason for the interest in atomic force constants that is not directly related to the goals of this paper, is nonetheless mentioned in passing here. These force constants play a direct role in determining heat capacities of materials and the effects of isotopic substitution on the kinetic and thermal properties of materials, particularly at high temperatures [9, 17-191. Consequently, their characterization through (2) or (6) is of considerable interest in establishing the relationship between the structure of a material and its properties.
estimated
and
Second
if they are consis-
the electron by
density
in sulfur is
computing
in hydrogen
the
atomic
sulfide.
The sums of the squares of the normal cies for these sulfur compounds
frequen-
are listed in Table
1, and the resulting atomic force constants and S,,, given by Equation 2 [22].
stants
in S,, S,
3 (Ms32 = 31.97207 u21)
are listed in the column headed Table
the
are estimated,
of these sulfur compounds.
tested
force constants
are defrequen-
in the references 3 [20].
10, to determine
tent with the structures For this purpose
where
reported
of these force constants
using Equation J_
Vs2U,
fundamental
Equation
S,, S,
First, empirical
for sulfur,
from the observed
magnitudes
%y(R,)
B,Y +
The
and S,,, is carried out in two steps.
vs2U(observed)
in
It is found that the atomic force con-
are essentially
equal
and, therefore,
trans-
ferable between
all three ring systems.
test, a common
value for Vs2U in these compounds
was determined the resulting
by least squares adjustment,
value
shown in Table The
squared
averaged
frequency
with
is given
and is found
(S),
are
average.
using
in Table
to differ
this 1 as
from
the
sums by less than one percent in all cases.
addition
to these
force constants
ring
in hydrogen
systems,
H,S
and
D,S
sums are listed
[23J.
frequencies
The
in Table
tlie
atomic
sulfide were also com-
puted using the fundamental for
and
its dispersion
sums derived
constant
z:y2(calculated), In
along
2 in the row labelled
force
observed
As a further
squared
reported frequency
1 and the atomic
force
constants derived from, using (3) (Mn
= 1.00783 u,
M,
Table
= 2.01410 uzl),
Vs2U(observed) are used to test constants,
are
the analysis
proceeding
implications
considered,
estimated.
expression
densities
the proper-
the relationship
(10).
of the
using the approximate For this purpose,
in sulfur and hydrogen
the
need be
One rough estimate that has been found
to be adequate
in most cases is the approximation
using nodeless Slater orbitals Q(R,)
of any of the
their structures and the magnitudes
theoretical
as
below.
of these results regarding
force constants is examined,
2
These data
of the srrlfur force
to a discussion
ties of the compounds
electron
in
and will be considered
Before
between
listed
and VH2U(observed).
[9, lo],
N (Ne/~)[(268)2”+1/(2n)!](R,g/a,)2(”-” x exp
in which afl = 2,*/n
(--2~~-&la,J
(11)
Atomic force constants and apparent eleatron densities in elemental sulfur
1423
Table 1. The squared frequency sums for elemental sulfur and the hydrogen sulfides in kilo Kayser units (kK)a.
Iv2
cv2a
(ohs)
b S.5 Sa
c
S12
d
Error
(talc)
%
1.517
1.513
-0.3
2.035
2.017
-0.9
3.009
3.026
0.6
H*S e
15.134
c2s e
7.887
.a The calculated values derived from averaged value of V S% b
Ref. (5); =
Ref. (3); d
Ref. (1); e
see text;
Ref. (23).
Table 2. Observed and calculated atomic force constants, in N/M elemental sulfur and hydrogen sulfide.
(calc.1) a
Cobs)
(calc.1) a
(calc.11) b
479
Ss
472
S12 (S)*W
475k2 1184
H2S
b
(ohs)
476
s6
a
(calc.11) b
units, for
574(20.8)'= 1317(11.2)
46S(-1.5) 1186(0.2)
431
472(9.5)
444(3.0)
Slater charges for S and H are 5.45 and l.OO,respectively, ref. (25); Adjusted Slater charges for S and Hare
text; '
5.60 and 1.05, respectively, see
Vercent error shown in parentheses.
where VI is the principle quantum
number of the
Only the valence shell need be considered in (ll),
valence shell of atom /?, e the electronic charge, N
for the inner shell, core electrons make negligible
the number of valence electrons and a, the Bohr radius. The parameter Zs * is a screened nuclear
lengths,
charge.
neighbor atoms need be considered in (10).
This approximation
assumes that the elec-
contributions
to pS(R,)at normal covalent bond Rap. For the same reasons, only nearest
tron density of an atom in a molecule is essentially
Using standard Slater charges, 1.00 for Hydrogen
a spherical one, in which all orbitals in the valence
1s orbitals and 5.45 for sulfur third shell orbitals
shell are described by the same screening constant
[25], the atomic force constants were calculated and
a.nd are equally occupied by the valence electrons.
are shown in the columns
headed Caloulation
1.
W. T. KING
1424 In these calculations an averaged S-S of 0.2060 nm [l], and R,,
bond length
= 0.1328 nm [26] were
heat capacities per degree of freedom, is also equal at high temperatures,
used in ( 11). Considering the rather crude estimates
systems,
of the electron densities in these atoms, the results
molecular geometry [Q].
of this calculation are quite good.
values of the atomic
Consequently,
Finally, it is found that the atomic force constant for sulfur is not transferable between all sulfur com-
for hydrogen,
charges
2, Calculation
to (lo),
was carried out
of 5.60 for sulfur and 1.05
and the resulting
given in Table According
force constants.
a second calculation
using adjusted
force constants
are
2.
the magnitudes
sulfur ring compounds
of Vs2U in the
and VH2U in hydrogen
sul-
pounds.
Unlike
the atomic presumably
good agreement
of the derived
both of these force constants, adjustment validity
of Z,*
obtained
in calculation
by a small
2 supports
the
the constant
depends
Vs2U in hydrogen
upon the magnitude
small adjustment
of Zn*,
in its magnitude
good agreement
analysis
the atomic
is required
a to
with experiment.
indicates
that
force constants
deed consequences
the magnitudes
other
of their similarity
interatomic
sulfur
atoms
distances,
of
in S,, S, and S,, are inin structure.
In these systems each sulfur atom is coordinated two
for sulfur in (S),
different
in other sulfur compounds
in these compounds,
and analogous
compounds
second
by Equation
row
Be-
of Vs2U
differences
in
elements
[Q], is
in molecules”
model
10, it is suggested
is a useful, though
of molecular
as well.
the values
for by the “atoms
this model analysis
of other
com-
from that in H,S and
potential
limited
that
one for the
functions
of com-
pounds of first and second row elements.
sulfide,
and only
DIsCUSSION This
in com-
of (10) applied to these two force constants.
Similarly,
obtain
values of
constant
between
accounted
The very
observed
cause the differences
summarized
bond distances.
force
pounds is distinctly
at the appropriate
or H-S
the behavior
pounds of first-row elements [7], the magnitude of
fide both depend upon the electron density in sulfur S-S
of their
the screening
Zg* in (11) to better reproduce the ex-
perimental
independent
The errors can
be reduced, of course, by adjusting constants
and is, therefore,
C,/(3%6),
for all three
at very
nearly
0.2060 nm [l].
to
the same
According
to
(lo), then, the atomic force constants, even for S,,, in which the atoms are not all equivalent,
should
all be equal, as observed. There
is, apparently,
bond length
tions for thermal
motion
diffraction
data.
a corrected
S-S
ment
the bond
with
a question
in S, arising from
about the S-S
the proper
in the analysis
correc-
of X-ray
CARON and DONOHUE [27] report bond length of 0.2060 nm in agreelengths
reported
for S, and
S i2. ABRAEAMS [ZS] on the other hand, states that 0.2045 nm is the correct value for this bond length. Using this shorter bond length in (11) yields a value of 507NJm
for Vs2U,
than that computed
a value
about
at 0.2060 nm.
differences
in the observed
are found,
it is suggested
bond length reported
atomic
6% greater
Because no such force constants
that the corrected
by Caron and Donohue
S-S is the
more accurate. Another
similarity
fur compounds cause the atomic three systems,
in the properties
is implied force
by these
constants
the vibrational
of these sulresults.
Be-
are equal in all
contribution
to the
REFERENCES [I] R. STEUDEL and D. F. BQaERS, JR., Spectrochim. Acta 31A, No. 7 (1976). [Z] R. STEUDEL and M. REBSCH, J. Mol. Spectry. 51, 189 (1974). [3] D. W. SCOTT, J. P. McCaLoUaH and F. H. K&USE, J. Mol. &m&y. 13, 313 (1964). [4] D. W. SCOTT and J. P. MCCULLOULXX,J. Mol. &e&y. 6, 372 (1961). [a L. A. NIMON and V. D. NEFF, J. Mol. Spectry. 26, 175 (1968). [61 L. A. NIMON, V. D. NEFF, R. E. CANTLEY and R. 0. BUTTLAR, J. Mol. Spectry. 22, 105 (1967). 171 R. R. GAUQHAN and W. T. KINQ, J. Chem. Phys. 57,463O (1972). PI W. T. KINQ aud A. J. ZELANO, J. Chem. Phys. 47, 3197 (1967). [91 W. T. KINQ, J. Chem. Phys. J. Chem. Phys. 61, 4026 (1974). [lOI W. T. KING, J. Chem. Phys. 57, 4636 (1972). PII A. B. ANDERSON and R. G. PARR, Theor& China. Acta (Bed.) 25, 1 (1972). WI A. B.‘ AN&R&IN, j. C&n. Phys. 58, 381 (1973). u31 E. B. WILSON, JR.. J. C. DECIUS and P. C. CROSS, Molecular V&at&, McGraw-Hill, New York, (1965). P41 J. BIEQLEISEN, J. Chem. Phys. 28, 694 (1958). WI See, for instance, K. RUDENBERQ, Rev. Mod. Phyu. 34, 326 (1962). [I61 See, in particular, T. ARAI, Rev. Mod. PhyS. 32, 370 (1960). P71 W. T. KINQ, J. Phya. Ohem. 77,277O (1973). WI J. BIEQELEISEN and M. WOLFSBERQ,Advarb. Chem. Phya. 1, 15 (1958). [I91 J. BIEQELEISEN, J. Chem. Phys. 23, 2264 (1955). WI Calculated values for the unobserved A,, and A,, modes for S,, in Ref. [I] were used to compute the sum in the Equation 3. WI A. H. WAPSTRA and N. B. GOVE, Nuclear Data Tables, AQ, 265 (1971).
Atomic force constants and apparent electron densities in elemental sulfur [22] The International System of Units is used throughout this paper. Force constants are expressed in Newtons per meter (N/m), for this unit conveniently places the decimal point just to the left of insignificant figures in most cases. Force oonstants in millidyne/angstrom units are obtained by dividing these results by 100. [23] T. S~XQ?OUCHI, editor, N&l. St. Ref. Data Ser. N&Z. Bur. of Std. (U.S.) 39 (1972). There seems to be an error in the value reported for vQin D,S here. Using the produot rule and the other fundamentals listed, the value of vs is 1887 K instead of 1999 K as reported. The value consistent with the produot rule is used here.
21
1425
[24] J. A. POPLE end G. A. SEQAL,J. Chem. Phys. 43, 5136 (1962). [25] J. A. POPLE and D. L. BEVEBID~E, Approsimate Molecular Orb&al Theory, McGraw-Hill, N.Y., (1970) [26] L. E. Srrrroa, editor, lnlerotomti Distances Spec. Publ. No. 11 andNo. 18. The Chem. Sot. (London), (1968). [27] A. CAROWand J. DONOEUE, Aok Cryst. 18, 662 (1965). [28] S. C. ABRAHAMS,Aota. @pt. 18, 566 (1966).
Atomic force constants and apparent electron densities in elemental sulfur w.
T. &NQ
Metcalf Researoh Laboratory, Brown University, Providence, Rhode Island 02912, U.S.A. (Received24 August 1974) &&a&-The atomio foroe constants for sulfur in the ring compounds S,, S, and S,, are found to be 476 f 2 N/m, and to be transferable between these three sulfur compounds. Using a simple “atoms in molecules” model to approximate the electron density for a sulfur atom, the magnitudes of the force constant for sulfur was computed and found to be consistent with the structures of these compounds.
INTRODUCTION In a recent paper, STEUDEL and EGGERS [l, 21 reported the vibrational
assignments and force con-
stants in S,,, and compared their results with those found by SCOTT, MCCULLOUGH and KRUSE [3, 41 from a similar analysis of S,.
tion of the generalized harmonio valence force constants usually considered in a vibrational analysis [S]. Atomic force constants are related to the normal modes of molecules by the frequency sum rule, originally derived by DECIUS and WILSON [13], but expressed in a Cartesian coordinate representation [8, 141,
Earlier, a comparable
analysis of the spectra of S, was reported by NIMON and NEW
[5, 61, who also compared their results
with the force constants in S,.
It was found that
the normal modes in these ring compounds accounted potential eters.
for by a modified Urey-Eradley function
containing
Consequently,
were model
only a few psram-
it was suggested
that
this
model is generally applicable to sulfur ring systems, and that the small, but significant differences in some of the model parameters in the different systems were explicable in terms of the interactions between lone pair electrons in these ring structures. In this paper the similarity between S,, S, and S,, is also examined,
but from the different point
of view provided by the so-called atomic force constants [7, 81. These force constants constitute one important
property
of molecular
potential
I
in which the wj are the normal harmonic frequencies (0, = 27rcovj), and the prrare the reciprocals of atomic masses. The summations extend over all normal modes, j, and over all atoms, a, respectively. Although an atomic force constant describes only one property of the total molecular potential function, that property is of considerable interest for several reasons. Of primary importance here, the sum rule (2) relating these force constants to molecular frequencies does not depend explicitly upon molecular geometry. This makes it possible to compare the atomic force constants for an atom in different molecules directly, without introducing additional assumptions about the effects of redundancies and other constraints on the force constants or about the specific molecular force field. For example, since the sulfur atoms in S, and S, are all symmetrically equivalent [3-61, the sum over c(in (2) can be reduced to a single term,
func-
2 wje = ,usNsVsaU
tions that is readily determined for these systems, without
introducing
models.
It is found that the atomic force constant
specific
potential
function
for sulfur is essentially identical in these three ring systems, and that their magnitudes
are accounted
by a simple “atoms in molecules” model for atomic force constants applied to these structures [B-12]. THEORY The atomic force constant, V,*lJ, for an atom ccin a molecule, is defined as the Laplacian of the molecular potential energy function U(R), differentiated with respect to the Cartesian coordinates of the atom considered, V,=U =
awlax, + awlay,= +
aw/a2,8 (1)
and is nothing more than a particular linear combina-
a-
(3)
in which Ns is the number of sulfur atoms in the ring. Consequently, the atomic force constants for sulfur in S, or S, are found from (3) simply by computing the appropriate squared frequency sums. Although the sulfur atoms in S,, are not all exactly equivalent, equation 3, with N, = 12, is used here to determine an averaged value for VsaU in S,,, and, based upon the theoretical analysis outlined below, it is anticipated that the dispersion of this averaged value is quite small. A second reason for the interest in atomic force constants is that they are simply related to the electron densities in molecules. It has been shown that [lO-121
v,‘u
= ~-%p(R,) - %(v,p - V,(l/lr
- R,])) (4)
where p(R,) denotes the total electron density at nucleus a, and 2, is the nuclear charge. If the electron
1421
W. T. Kma
1422
CALCULATIONS AND RESULTS
density is represented by an expansion in atomic orbitals centered on each nucleus [15] p(r) =c
x C/VXS&
B>Y
-
WXYA
-
BYI
(6)
i.j
in which, for instance, xpi(v --Rg) denotes an orbital on nucleus /?in quantum state i, and Cp,o is an appropriate density matrix element, then (4) can be reduced to the sum of three terms [9, 10, 121, v,2u
= 471.%[ 2 ps(%) Bita
+ c
analysis
atomic
force
termined
of the sulfur ring systems,
constants
cies for these systems cited
above,
using
@@rW (6)
~a(%)
= c C~‘%i(R&pr(%)
Qgy(R,) = --@a) 2 k;i IV&lb i.j
(7)
- R,I)I xrj * v,Cpr*9 (8)
and (9) i.’
It should be pointed out here that Equation 6 is essentially exact, in that only theBorn-Oppenheimer approximation and a few mathematioal approximations concerned with the expansion in (6) have been used in its derivation. The first term represents the interaction of the nuclear charge on 0: with the charge distributions, pb[R,], centered on the other atoms in the molecule, the second term represents the interaations resulting from the redistribution of charge due to nuclear displacement, and the third term represents the interaction of the nuclear charge with the non-classical “interference” electron density [15] in the moleoule. According to Equation 6, then, atomio force oonstants depend upon properties of the total electron density in molecules. Because of this it is possible to reduce this equation to a more tractable approximate form and to obtain a useful structural interpretation of atomic force constants. To this end, a very simple form of the “atoms in molecules” model [16] is adopted whereby the terms (8) and (9) are assumed to be negligible, so that (6) is reduced to a linear superposition of two center terms called “bond constants,” V,‘u where K,,M,p)
N c K&W ##Cc
(16)
= 4n-%p,M,)
The approximations by which (6) is reduced to (10) are based upon the general observation that total molecular electron densities are very nearly equal to those obtained by superimposing the densities of the constituent atoms, and they are justified in detail, at least for first and second row elements, elsewhere [g-12]. A third reason for the interest in atomic force constants that is not directly related to the goals of this paper, is nonetheless mentioned in passing here. These force constants play a direct role in determining heat capacities of materials and the effects of isotopic substitution on the kinetic and thermal properties of materials, particularly at high temperatures [9, 17-191. Consequently, their characterization through (2) or (6) is of considerable interest in establishing the relationship between the structure of a material and its properties.
estimated
and
Second
if they are consis-
the electron by
density
in sulfur is
computing
in hydrogen
the
atomic
sulfide.
The sums of the squares of the normal cies for these sulfur compounds
frequen-
are listed in Table
1, and the resulting atomic force constants and S,,, given by Equation 2 [22].
stants
in S,, S,
3 (Ms32 = 31.97207 u21)
are listed in the column headed Table
the
are estimated,
of these sulfur compounds.
tested
force constants
are defrequen-
in the references 3 [20].
10, to determine
tent with the structures For this purpose
where
reported
of these force constants
using Equation J_
Vs2U,
fundamental
Equation
S,, S,
First, empirical
for sulfur,
from the observed
magnitudes
%y(R,)
B,Y +
The
and S,,, is carried out in two steps.
vs2U(observed)
in
It is found that the atomic force con-
are essentially
equal
and, therefore,
trans-
ferable between
all three ring systems.
test, a common
value for Vs2U in these compounds
was determined the resulting
by least squares adjustment,
value
shown in Table The
squared
averaged
frequency
with
is given
and is found
(S),
are
average.
using
in Table
to differ
this 1 as
from
the
sums by less than one percent in all cases.
addition
to these
force constants
ring
in hydrogen
systems,
H,S
and
D,S
sums are listed
[23J.
frequencies
The
in Table
tlie
atomic
sulfide were also com-
puted using the fundamental for
and
its dispersion
sums derived
constant
z:y2(calculated), In
along
2 in the row labelled
force
observed
As a further
squared
reported frequency
1 and the atomic
force
constants derived from, using (3) (Mn
= 1.00783 u,
M,
Table
= 2.01410 uzl),
Vs2U(observed) are used to test constants,
are
the analysis
proceeding
implications
considered,
estimated.
expression
densities
the proper-
the relationship
(10).
of the
using the approximate For this purpose,
in sulfur and hydrogen
the
need be
One rough estimate that has been found
to be adequate
in most cases is the approximation
using nodeless Slater orbitals Q(R,)
of any of the
their structures and the magnitudes
theoretical
as
below.
of these results regarding
force constants is examined,
2
These data
of the srrlfur force
to a discussion
ties of the compounds
electron
in
and will be considered
Before
between
listed
and VH2U(observed).
[9, lo],
N (Ne/~)[(268)2”+1/(2n)!](R,g/a,)2(”-” x exp
in which afl = 2,*/n
(--2~~-&la,J
(11)
Atomic force constants and apparent eleatron densities in elemental sulfur
1423
Table 1. The squared frequency sums for elemental sulfur and the hydrogen sulfides in kilo Kayser units (kK)a.
Iv2
cv2a
(ohs)
b S.5 Sa
c
S12
d
Error
(talc)
%
1.517
1.513
-0.3
2.035
2.017
-0.9
3.009
3.026
0.6
H*S e
15.134
c2s e
7.887
.a The calculated values derived from averaged value of V S% b
Ref. (5); =
Ref. (3); d
Ref. (1); e
see text;
Ref. (23).
Table 2. Observed and calculated atomic force constants, in N/M elemental sulfur and hydrogen sulfide.
(calc.1) a
Cobs)
(calc.1) a
(calc.11) b
479
Ss
472
S12 (S)*W
475k2 1184
H2S
b
(ohs)
476
s6
a
(calc.11) b
units, for
574(20.8)'= 1317(11.2)
46S(-1.5) 1186(0.2)
431
472(9.5)
444(3.0)
Slater charges for S and H are 5.45 and l.OO,respectively, ref. (25); Adjusted Slater charges for S and Hare
text; '
5.60 and 1.05, respectively, see
Vercent error shown in parentheses.
where VI is the principle quantum
number of the
Only the valence shell need be considered in (ll),
valence shell of atom /?, e the electronic charge, N
for the inner shell, core electrons make negligible
the number of valence electrons and a, the Bohr radius. The parameter Zs * is a screened nuclear
lengths,
charge.
neighbor atoms need be considered in (10).
This approximation
assumes that the elec-
contributions
to pS(R,)at normal covalent bond Rap. For the same reasons, only nearest
tron density of an atom in a molecule is essentially
Using standard Slater charges, 1.00 for Hydrogen
a spherical one, in which all orbitals in the valence
1s orbitals and 5.45 for sulfur third shell orbitals
shell are described by the same screening constant
[25], the atomic force constants were calculated and
a.nd are equally occupied by the valence electrons.
are shown in the columns
headed Caloulation
1.
W. T. KING
1424 In these calculations an averaged S-S of 0.2060 nm [l], and R,,
bond length
= 0.1328 nm [26] were
heat capacities per degree of freedom, is also equal at high temperatures,
used in ( 11). Considering the rather crude estimates
systems,
of the electron densities in these atoms, the results
molecular geometry [Q].
of this calculation are quite good.
values of the atomic
Consequently,
Finally, it is found that the atomic force constant for sulfur is not transferable between all sulfur com-
for hydrogen,
charges
2, Calculation
to (lo),
was carried out
of 5.60 for sulfur and 1.05
and the resulting
given in Table According
force constants.
a second calculation
using adjusted
force constants
are
2.
the magnitudes
sulfur ring compounds
of Vs2U in the
and VH2U in hydrogen
sul-
pounds.
Unlike
the atomic presumably
good agreement
of the derived
both of these force constants, adjustment validity
of Z,*
obtained
in calculation
by a small
2 supports
the
the constant
depends
Vs2U in hydrogen
upon the magnitude
small adjustment
of Zn*,
in its magnitude
good agreement
analysis
the atomic
is required
a to
with experiment.
indicates
that
force constants
deed consequences
the magnitudes
other
of their similarity
interatomic
sulfur
atoms
distances,
of
in S,, S, and S,, are inin structure.
In these systems each sulfur atom is coordinated two
for sulfur in (S),
different
in other sulfur compounds
in these compounds,
and analogous
compounds
second
by Equation
row
Be-
of Vs2U
differences
in
elements
[Q], is
in molecules”
model
10, it is suggested
is a useful, though
of molecular
as well.
the values
for by the “atoms
this model analysis
of other
com-
from that in H,S and
potential
limited
that
one for the
functions
of com-
pounds of first and second row elements.
sulfide,
and only
DIsCUSSION This
in com-
of (10) applied to these two force constants.
Similarly,
obtain
values of
constant
between
accounted
The very
observed
cause the differences
summarized
bond distances.
force
pounds is distinctly
at the appropriate
or H-S
the behavior
pounds of first-row elements [7], the magnitude of
fide both depend upon the electron density in sulfur S-S
of their
the screening
Zg* in (11) to better reproduce the ex-
perimental
independent
The errors can
be reduced, of course, by adjusting constants
and is, therefore,
C,/(3%6),
for all three
at very
nearly
0.2060 nm [l].
to
the same
According
to
(lo), then, the atomic force constants, even for S,,, in which the atoms are not all equivalent,
should
all be equal, as observed. There
is, apparently,
bond length
tions for thermal
motion
diffraction
data.
a corrected
S-S
ment
the bond
with
a question
in S, arising from
about the S-S
the proper
in the analysis
correc-
of X-ray
CARON and DONOHUE [27] report bond length of 0.2060 nm in agreelengths
reported
for S, and
S i2. ABRAEAMS [ZS] on the other hand, states that 0.2045 nm is the correct value for this bond length. Using this shorter bond length in (11) yields a value of 507NJm
for Vs2U,
than that computed
a value
about
at 0.2060 nm.
differences
in the observed
are found,
it is suggested
bond length reported
atomic
6% greater
Because no such force constants
that the corrected
by Caron and Donohue
S-S is the
more accurate. Another
similarity
fur compounds cause the atomic three systems,
in the properties
is implied force
by these
constants
the vibrational
of these sulresults.
Be-
are equal in all
contribution
to the
REFERENCES [I] R. STEUDEL and D. F. BQaERS, JR., Spectrochim. Acta 31A, No. 7 (1976). [Z] R. STEUDEL and M. REBSCH, J. Mol. Spectry. 51, 189 (1974). [3] D. W. SCOTT, J. P. McCaLoUaH and F. H. K&USE, J. Mol. &m&y. 13, 313 (1964). [4] D. W. SCOTT and J. P. MCCULLOULXX,J. Mol. &e&y. 6, 372 (1961). [a L. A. NIMON and V. D. NEFF, J. Mol. Spectry. 26, 175 (1968). [61 L. A. NIMON, V. D. NEFF, R. E. CANTLEY and R. 0. BUTTLAR, J. Mol. Spectry. 22, 105 (1967). 171 R. R. GAUQHAN and W. T. KINQ, J. Chem. Phys. 57,463O (1972). PI W. T. KINQ aud A. J. ZELANO, J. Chem. Phys. 47, 3197 (1967). [91 W. T. KINQ, J. Chem. Phys. J. Chem. Phys. 61, 4026 (1974). [lOI W. T. KING, J. Chem. Phys. 57, 4636 (1972). PII A. B. ANDERSON and R. G. PARR, Theor& China. Acta (Bed.) 25, 1 (1972). WI A. B.‘ AN&R&IN, j. C&n. Phys. 58, 381 (1973). u31 E. B. WILSON, JR.. J. C. DECIUS and P. C. CROSS, Molecular V&at&, McGraw-Hill, New York, (1965). P41 J. BIEQLEISEN, J. Chem. Phys. 28, 694 (1958). WI See, for instance, K. RUDENBERQ, Rev. Mod. Phyu. 34, 326 (1962). [I61 See, in particular, T. ARAI, Rev. Mod. PhyS. 32, 370 (1960). P71 W. T. KINQ, J. Phya. Ohem. 77,277O (1973). WI J. BIEQELEISEN and M. WOLFSBERQ,Advarb. Chem. Phya. 1, 15 (1958). [I91 J. BIEQELEISEN, J. Chem. Phys. 23, 2264 (1955). WI Calculated values for the unobserved A,, and A,, modes for S,, in Ref. [I] were used to compute the sum in the Equation 3. WI A. H. WAPSTRA and N. B. GOVE, Nuclear Data Tables, AQ, 265 (1971).
Atomic force constants and apparent electron densities in elemental sulfur [22] The International System of Units is used throughout this paper. Force constants are expressed in Newtons per meter (N/m), for this unit conveniently places the decimal point just to the left of insignificant figures in most cases. Force oonstants in millidyne/angstrom units are obtained by dividing these results by 100. [23] T. S~XQ?OUCHI, editor, N&l. St. Ref. Data Ser. N&Z. Bur. of Std. (U.S.) 39 (1972). There seems to be an error in the value reported for vQin D,S here. Using the produot rule and the other fundamentals listed, the value of vs is 1887 K instead of 1999 K as reported. The value consistent with the produot rule is used here.
21
1425
[24] J. A. POPLE end G. A. SEQAL,J. Chem. Phys. 43, 5136 (1962). [25] J. A. POPLE and D. L. BEVEBID~E, Approsimate Molecular Orb&al Theory, McGraw-Hill, N.Y., (1970) [26] L. E. Srrrroa, editor, lnlerotomti Distances Spec. Publ. No. 11 andNo. 18. The Chem. Sot. (London), (1968). [27] A. CAROWand J. DONOEUE, Aok Cryst. 18, 662 (1965). [28] S. C. ABRAHAMS,Aota. @pt. 18, 566 (1966).