ON THE KO-COHOMOLOGY OF THE LENS SPACE Ln(q) FOR q EVEN

“…where k is an integer > 0 and p and q are odd integers > 1, by using Theorem 1-1. ? Z 2 OT Z + Z 2 according as n is even or odd ( [5], theorem (0-1) (ii)) and KO(L n (2k)) is finite. Then we ha,veKO(L n (2k))/rR(L n (2k)) ^ Z 2 ,&ndso#rR(L n (2k)) = #RO{L n (2k))/2 = 2"/fc [n ' 2] or 2»-i^[»/2] according as n ^ 3 mod 4 or = 3 mod 4 ( [5], theorem (<M) (i)).…”

Note on almost complex structures on products of lens spaces

“…where k is an integer > 0 and p and q are odd integers > 1, by using Theorem 1-1. ? Z 2 OT Z + Z 2 according as n is even or odd ( [5], theorem (0-1) (ii)) and KO(L n (2k)) is finite. Then we ha,veKO(L n (2k))/rR(L n (2k)) ^ Z 2 ,&ndso#rR(L n (2k)) = #RO{L n (2k))/2 = 2"/fc [n ' 2] or 2»-i^[»/2] according as n ^ 3 mod 4 or = 3 mod 4 ( [5], theorem (<M) (i)).…”

Note on almost complex structures on products of lens spaces

Surgery and Homotopy Theory in Study of the Transformation Groups

$K{\rm O}$-groups of lens spaces modulo powers of two