94 



Art. 4. — M. Kuniveda : 



and, without difficulty, we obtain the following results, 

 (i) //■ (7 = 1, a = TT, p < 2, then 



1 (-^<p<:^); 



(ii) ;/■ < g <; ], « = (1 +(z)^, p < 1 + g, M 



vr// 



'^W '-' { mlq):: }^'^'^^^'''^''' '^'' exp [(Ä- n^+^-^i^r + ;-)/], 



l2(l + g)7 

 (iii) //■0<(2<1, (/ = (8-(/)^, p<l + q, f/i 



( — hq<p<\+q); 



en 



J(n) = 0(1 /;0; 

 (iv) //■0<r7<l, (l+r/)~ <;«<:(3-g)-^, j; <; 1 +7, Mr// 



J{n) = 0(1/?/) . 

 55- Hence, 1»\' (04) and Lemma 10, we obtain : 

 If q = \, o. = -, and —\<:p<1, tJicn 



(79) a,, -^ :z-^a-^v^\e-^"n-y + ^ sin ['là n^ - ^p - 'i)-} : 

 If < // < 1 , a = [A+q) ^^ ,,n(] ^y^^p < ] +,^^ //^^,^^ 



(80) 



"""(2.(1+7/:^}*^^^^^' 



Is ;/ i + s 



exp[[Z-//^^'-(h^-i);:]/], 



;/• < (7 < 1, « = (3 — (y) -[^^ , ^/y/(/ _^^^ <;^j < 1 +f^^ then 



(81) 



«""(2.i!,).F^^^^^" 



It? y;~lT<? 



,xp[_[A-//i'^-(^^-Vr]/] 



/.• :^ ^1+,^),^-!^ *«!-«; 



