On the number of components of a complete intersection of real quadrics

Abstract

Our main results concern complete intersections of three real quadrics. We prove that the maximal number B02(N) of connected components that a regular complete intersection of three real quadrics in PN can have differs at most by one from the maximal number of ovals of the submaximal depth [(N-1)/2] of a real plane projective curve of degree d=N+1. As a consequence, we obtain a lower bound 14 N2+O(N) and an upper bound 38 N2+O(N) for B02(N).