438 DOC.
14
EINSTEIN
AND
BESSO MANUSCRIPT
[p.
39]
Gew.
Relativitätstheorie
mit Vierervektor.
[eq.
240]
KM
x
,2
r
dt
V
KM
x
dx
r2
r
dt
d
(
d
1
dx
Je2
-
q
5dp
3x
[177]
dx
=
Jc2dt2
-
ds
404
[176]
[eq. 242]
KM
x
.2
r
J(c2-q2)
[eq. 241]
KM
-5
=
£
r2^?
=
CW
dt
konst.
[eq. 243]
c
=
E
+
-
w
r
[eq.
244]
CW
=
r
2d(p
dr
[eq.
245] c2C
=
r2(E+-
)
^
r
d/
dr2
+
Wr2dq£/
4
C
(E
di
d(p
2 c2 / ~2
=
1-2,
V
c2y
[eq.
246]
[eq.
251]
[eq. 252]
[eq.
253]
[179]
Grav. Theorie
5 AK2M2
5
16
c2C2
CqC
C
V
dr2
+
r2d(p2
d^
J
d\p
2
_
C2
C2
dr
2
C2
dtp
2
(//J
r*
c2r*
d*
c2r2
dt'
1+
^
V
c2
2
dtp
+
r^l
s~*2
2
C
dr2
=
^rfr24
/
4
er2
r
v
4
2
r
r
c2
+
?, dtp2
+
\dr2
=
dt2
[eq. 247]
c
(VKM2.
2
(E +
) dtp
c4C2
"
[eq.
248]
cW2
=
^(£+™)2_(cV
+
cV)
c
r
[178]
dtp
[eq.
250]
d(p
=
2kME
di
_
_ =
[eq. 249]
__
4
2kME
3
C2dr2
=
[~~2
C
-c2)
r+
2
r
(K2M2c2)2
]°`w 2
C
C
C2
_
2 2+c
C2
-
K2M2
C
2
C2-
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