The differential d4(h63) in the Adams spectral sequence for spheres
Abstract
We show that there is a non-trivial differential d4(h63) =h03g4 in the mod 2 Adams spectral sequence for spheres. This together with the results in barrattdifferentials1970,lindifferential1998,kandifferential2001 completely settle the differentials of hi3 for i4. (The differentials of hi3 for i=0,1,2,3 are well-known.) Our proof uses the Kevaire invariant elements θi ∈π2i+1-2S for i=4,5 with the properties 2θ4 =0, 2θ5 =0.
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