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 View full book textPage 3
________________ Roc जैन विद्या एवं प्राकृत : अन्तरशास्त्रीय अध्ययन contained in Gyth geometric regression (r=1,2,....) of the instant-effective bond (Samaya prabaddha) which varies in its contents of karma particles according to variations in Yoga or volution and kaşaya or affection. Thus not only B varies, but its subparts in Ca Sg and Gy also have varied values, every instant. Let the vector groups contained in (var ganā) be denoted by w where I denotes indivisible-corresponding-sections (avibhāgi praticchedas) of affine or antiaffine energy-levels (anubhäga añía) of impartation controls in each of subscupt V of vectors (var gas) contained in a particular vector group. Here I will represent the least value of I, *Sa will denote the total number of super-vector-groups (spard hakas) ained in a geometric regression (gunahāni) corresponding to Cash configuration of karma, and d will denote the common difference through which the vectors go on decreasing at every next step, in the next nisus having an instant less of life time for a particular configuration.14 Thus, Ca B = WPISZ (B - 1)i s'-'+ wßi*s* - 2+1 *S$ 6, 1- 7-19 OY-1 V (B-1)i*s -1 - hr w2ßi*s* +...+ V - Bi*sy.1 a 2-1 2001 - 27-1 -1). ....(2.1) This gives a general expression which may be further detailed as follows : Thus the bond fluent of first super vector group of the first geometric regression of first configuration (so labelled) is BE +ws+1 V-dtws+2 V-20 + Ws+3 V-3d+...+ W28-1 .(2.2) V-(S-11 The bond fluent of second super-vector-group of the first geometric of first configuration is : RIW2 w2s+ 1 w2s + 2 w3s-1 'v-(s +1 v-(s+2) 14. Cf. 9 (a). - (2s - id...(1.3) परिसंवाद-४ Jain Education International For Private & Personal Use Only www.jainelibrary.orgPage Navigation
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