Annotation of OpenXM_contrib/PHC/Ada/Homotopy/reduction_of_nonsquare_systems.ads, Revision 1.1.1.1
1.1 maekawa 1: with Standard_Complex_Poly_Systems; use Standard_Complex_Poly_Systems;
2:
3: package Reduction_of_Nonsquare_Systems is
4:
5: -- DESCRIPTION :
6: -- This package provides two different approaches for reducing
7: -- a overconstrained system to a square system.
8:
9: function Random_Square ( p : in Poly_Sys ) return Poly_Sys;
10:
11: -- DESCRIPTION :
12: -- The system q (q'range = 1..N) on return will be square, like
13: -- q(i) = p(i) + l(i,N+1)*p(N+1) + .. + l(i,n)*p(n), for i=1,2,..,N.
14: -- This type of reduction is recommended when the solution of any
15: -- subsystem of p (p'range = 1,..,n) has a connected solution component.
16:
17: function Reduced_Square ( p : in Poly_Sys ) return Poly_Sys;
18:
19: -- DESCRIPTION :
20: -- The system q (q'range = 1,..,N) on return will be square, like
21: -- q(i) = Rpoly(..(Rpoly(p(i),p(N+1)), p(n)), for i=1,2,..,N,
22: -- i.e.: the additional polynomial will be used for reducing the system.
23: -- This type of reduction is recommended when the solution set of the
24: -- first N equation of p consists of isolated points that do not all
25: -- satisfy the remaining equations.
26:
27: end Reduction_of_Nonsquare_Systems;
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