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dft_tools/pytriqs/utility/dichotomy.py
Olivier Parcollet f2c7d449cc First commit : triqs libs version 1.0 alpha1
for earlier commits, see TRIQS0.x repository.
2013-07-17 19:24:07 +02:00

100 lines
3.7 KiB
Python

################################################################################
#
# TRIQS: a Toolbox for Research in Interacting Quantum Systems
#
# Copyright (C) 2011 by M. Ferrero, O. Parcollet
#
# TRIQS is free software: you can redistribute it and/or modify it under the
# terms of the GNU General Public License as published by the Free Software
# Foundation, either version 3 of the License, or (at your option) any later
# version.
#
# TRIQS is distributed in the hope that it will be useful, but WITHOUT ANY
# WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
# FOR A PARTICULAR PURPOSE. See the GNU General Public License for more
# details.
#
# You should have received a copy of the GNU General Public License along with
# TRIQS. If not, see <http://www.gnu.org/licenses/>.
#
################################################################################
import pytriqs.utility.mpi as mpi
def dichotomy(function, x_init, y_value, precision_on_y, delta_x, max_loops = 1000, x_name="", y_name="", verbosity=1):
"""
Solver function(x) = y_value.
Arguments :
- function : function (real valued) to be solved by dichotomy
- x_init : Init value for x. On success, returns the new value of x
- y_value :
- precision_on_y : calculation stops for abs(f(x) - y_value)<precision
- max_loops : maximum number of loops before failure. Default is 1000
- x_name, y_name : name of the variable x, y for the report
- verbosity : verbosity level.
Returns :
- A tuple (x,y). x is the value found, y is f(x).
- (None,None) if the calculation failed.
"""
def sign(x):
if x>0.0 : return 1
if x<0.0 : return -1
return 0
mpi.report("Dichotomy adjustment of %(x_name)s to obtain %(y_name)s = %(y_value)f +/- %(precision_on_y)f"%locals() )
PR = " "
if x_name=="" or y_name=="" : verbosity = max(verbosity,1)
x=x_init;delta_x= abs(delta_x)
# First find the bounds
y1 = function(x)
eps = sign(y1-y_value)
x1=x;y2=y1;x2=x1
nbre_loop=0
while (nbre_loop<= max_loops) and (y2-y_value)*eps>0 and abs(y2-y_value)>precision_on_y :
nbre_loop +=1
x2 -= eps*delta_x
y2 = function(x2)
if x_name!="" and verbosity>2:
mpi.report("%(PR)s%(x_name)s = %(x2)f \n%(PR)s%(y_name)s = %(y2)f"%locals())
mpi.report("%(PR)s%(x1)f < %(x_name)s < %(x2)f"%locals())
mpi.report("%(PR)s%(y1)f < %(y_name)s < %(y2)f"%locals())
# Now mu is between mu1 and mu2
yfound = y2
# We found bounds. What if the next loop is never run ?
# i.e. x1 or x2 are close to the solution
# we have to know which one is the best ....
if abs(y1-y_value)< abs(y2-y_value) :
x=x1
else:
x=x2
#Now let's refine our mu....
while (nbre_loop<= max_loops) and (abs(yfound-y_value)>precision_on_y) :
nbre_loop +=1
x = x1 + (x2 - x1) * (y_value - y1)/(y2-y1)
yfound = function(x)
if (y1-y_value)*(yfound - y_value)>0 :
x1 = x; y1=yfound
else :
x2= x;y2=yfound;
if verbosity>2 :
mpi.report("%(PR)s%(x1)f < %(x_name)s < %(x2)f"%locals())
mpi.report("%(PR)s%(y1)f < %(y_name)s < %(y2)f"%locals())
if abs(yfound - y_value) < precision_on_y :
if verbosity>0:
mpi.report("%(PR)s%(x_name)s found in %(nbre_loop)d iterations : "%locals())
mpi.report("%(PR)s%(y_name)s = %(yfound)f;%(x_name)s = %(x)f"%locals())
return (x,yfound)
else :
if verbosity>0:
mpi.report("%(PR)sFAILURE to adjust %(x_name)s to the value %(y_value)f after %(nbre_loop)d iterations."%locals())
return (None,None)