On induced topologies in quasi-reflexive Banach spaces

Larry C. Hunter
1960 Proceedings of the American Mathematical Society  
i960] TOPOLOGIES of z and each S, is even. Let 5 be the number of points of the orbit and q any index in Q. For r<s, (hz)r(p, q) differs from (p, q) in the first coordinate; but (hz)"(p, q) = (p, q). Thus every element of G has an odd cycle. As we noted above, this implies [l] the existence of a fair game of 2*(2' -1) players. vey, New York, 1957. 3. J. Singer, A theorem in finite projective geometry and some applications to number theory, Trans.
doi:10.1090/s0002-9939-1960-0112020-x fatcat:wqg5ldrirbebnibonq2hvoper4