J-groups of the suspensions of the stunted lens spaces mod p (Q1097541)

Let p be a prime and \(S^{2n+1}\) be the unit sphere in complex \((n+1)\)- space. Let \(L^{2n+1}=L\) \(n(p)=S^{2n+1}/{\mathbb{Z}}_ p\) be the standard lens space mod p and \(L^{2n}=L\) \(0_ n(p)\) be its 2n-skeleton. The purpose of the present paper is to determine the J-groups of the suspensions of stunted lens spaces L m/L n \((n<m)\) in case p is an odd prime. For the proof of the main theorem, the authors uses the results of \textit{J. F. Adams} [Topology 3, 137-171 (1965; Zbl 0137.168), 193-222 (1965; Zbl 0137.169)], \textit{T. Kambe} [J. Math. Soc. Japan 18, 135-146 (1966; Zbl 0151.322)], \textit{T. Kambe, H. Matsunaga} and \textit{H. Toda} [J. Math. Kyoto Univ. 5, 143-149 (1966; Zbl 0146.453)], \textit{D. Quillen} [Topology 10, 67-80 (1971; Zbl 0219.55013)] and so on. The authors have already obtained the corresponding results for the case \(p=2\) in [Math. J. Okayama Univ. 24, 45-51 (1982; Zbl 0487.55006)].