Annotation of OpenXM_contrib/PHC/Ada/Root_Counts/Implift/durand_kerner.ads, Revision 1.1
1.1 ! maekawa 1: with Standard_Floating_Numbers; use Standard_Floating_Numbers;
! 2: with Standard_Complex_Vectors; use Standard_Complex_Vectors;
! 3:
! 4: generic
! 5:
! 6: with procedure Write ( step : in natural; z,res : in Vector );
! 7:
! 8: -- DESCRIPTION :
! 9: -- This routine allows to write intermediate results after each iteration,
! 10: -- such as the step number, the approximations z and the residuals res.
! 11: -- If no output is wanted, supply an empty body for Write.
! 12:
! 13: procedure Durand_Kerner ( p : in Vector; z,res : in out Vector;
! 14: maxsteps : in natural; eps : in double_float;
! 15: nb : out natural );
! 16:
! 17: -- DESCRIPTION :
! 18: -- This routine computes all roots of a given polynomial
! 19: -- in one unknown, applying the method of Durand Kerner.
! 20: -- This method is also known as the method of Weierstrass.
! 21:
! 22: -- ON ENTRY :
! 23: -- p the polynomial defined by
! 24: -- p[k] + p[k+1]*x + p[k+2]*x^2 + .. + p[k+n]*x^n,
! 25: -- with k = p'first;
! 26: -- z initial approximations for the roots;
! 27: -- res the residuals of the roots;
! 28: -- maxsteps is the maximum number of steps that are allowed;
! 29: -- eps the required accuracy.
! 30:
! 31: -- ON RETURN :
! 32: -- z the computed roots;
! 33: -- res the residuals of the roots;
! 34: -- nb the number of steps.
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