Heng Cao, Haifeng Xi, et al.
WSC 2003
We investigate the complexity of algebraic decision trees deciding membership in a hypersurface X ⊂ Cm. We prove an optimal lower bound on the number of additions, subtractions, and comparisons and an asymptotically optimal lower bound on the number of multiplications, divisions, and comparisons that are needed to decide membership in a generic hypersurface X ⊂ Cm. Over the reals, where in addition to equality branching also ≤-branching is allowed, we prove an analogous statement for irreducible "generic" hypersurfaces X ⊂ Rm. In the case m = 1 we give also a lower bound for finite subsets X ⊂ R. © 1992.
Heng Cao, Haifeng Xi, et al.
WSC 2003
Imran Nasim, Melanie Weber
SCML 2024
Corneliu Constantinescu
SPIE Optical Engineering + Applications 2009
Elizabeth A. Sholler, Frederick M. Meyer, et al.
SPIE AeroSense 1997