On Lusternik-Schnirelmann category of SO(10)

Abstract

Let G be a compact connected Lie group and p : E A be a principal G-bundle with a characteristic map α : A G, where A= A0 for some A0. Let \Ki Fi-1 Fi \,|\, 1 i n,\, F0= \\ \; F1= K1 \; and\; Fn G \ be a cone-decomposition of G of length m and F'1=K'1 ⊂ F1 with K'1 ⊂ K1 which satisfy FiF'1 ⊂ Fi+1 up to homotopy for any i. Our main result is as follows: we have cat(X) m+1, if firstly the characteristic map α is compressible into F'1, secondly the Berstein-Hilton Hopf invariant H1(α) vanishes in [A, F'1 F'1] and thirdly Km is a sphere. We apply this to the principal bundle SO(9)(10) S9 to determine L-S category of SO(10).