A cohomological study of local rings of embedding codepth 3

Abstract

The generating series of the Bass numbers μiR=rankk ExtiR(k,R) of local rings R with residue field k are computed in closed rational form, in case the embedding dimension e of R and its depth d satisfy e-d 3. For each such R it is proved that there is a real number γ>1, such that μd+iRγμd+i-1R holds for all i 0, except for i=2 in two explicitly described cases, where μd+2R=μd+1R=2. New restrictions are obtained on the multiplicative structures of minimal free resolutions of length 3 over regular local rings.