Book Title: On Contribution Of Jainology To Indian Karm Structures
Author(s): L C Jain, C K Jain
Publisher: Z_Jain_Vidya_evam_Prakrit_014026_HR.pdf

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Page 4
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On Contribution of Jainology to Indian Karma Structures
२०९
The bond fluent of third super-vector-vector group of the first geometric regression of first configuration is:
B31
v-2sd
·(2s+1)d++w4s - 1
etc., till v/2 1 number of particles are not obtained.
-
B1,
1
nl
W3S
Thus the bond fluent of the nth super-vector-group of first geometric regression of the first configuration is
+wns +1
Wns
v (n - 1)sd
BI
B12=w(n+1)s+w(n+1)s +1
V d
2 2
Similarly
n2
2
+w3s+!
V
B22-d
V
...(2.5)
The bond fluent of first super-vector group of second geometric regression of first configuration is
2
+
v-((n-1)s+1} di
15
d
2(n-1) s. 2
+w(n+2)s+1
V
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W2ns + s - 1
V
2- (ns-1)
(+1)
V- (3s-1)d
+...+w(n+1)s+s−1
V
d
+w2ns+1
V
2
...
2
And the bond fluent of nth super-vector group of the second geometic regression of first configuration is =W2ns
— (s − 1)
+...+w(n+2)s+s−1
V
d
27-1 27-1
+w(n+1)s - 1 v (ns-1)}d
B}11 =W { (? - 1)n+1} s s+w{(7-1)n+1} s+1
+W
V
V
27-1
2
(s−1)
27-1-(3-1)
d
2
d
[(n - 1) (s+1)] — +...+
+...+W{-1)n+1} s+s−1
V
d
27-I
...(2.4)
Similarly the bond fluent of first, second etc. super-vector groups of rth geometric regression of first configuration are given as follows:
2s(28-1)-2
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d .... (2.7)
...(2.6)
....(2.8)
...(2.9)
परिसंवाद -४
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