On mixed projective curves
Abstract
Let f(,) be a mixed polar homogeneous polynomial of n variables =(z1,..., zn). It defines a projective real algebraic variety V:=\[]∈ n-1 | f(,)=0 \ in the projective space n-1. The behavior is different from that of the projective hypersurface. The topology is not uniquely determined by the degree of the variety even if V is non-singular. We study a basic property of such a variety.
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