Linear regression - reduce degrees of freedom

I have a Pandas dataframe with columns like

``````Order     Balance     Profit cum (%)
``````

I'm doing a linear regression

``````model_profit_tr = pd.ols(y=df_closed['Profit cum (%)'], x=df_closed['Order'])
``````

The problem with this is that standard model is like (equation of a line that does not pass through the origin)

``````y = a * x + b
``````

There is 2 degrees of freedom (a and b)

slope (a):

``````a=model_profit_tr.beta['x']
``````

and intercept (b):

``````b=model_profit_tr.beta['intercept']
``````

I'd like to reduce degree of freedom for my model (from 2 to 1) and I 'd like to have a model like

``````y = a * x
``````
-

Use the `intercept` keyword argument:

``````model_profit_tr = pd.ols(y=df_closed['Profit cum (%)'],
x=df_closed['Order'],
intercept=False)
``````

From docs:

``````In [65]: help(pandas.ols)
Help on function ols in module pandas.stats.interface:

ols(**kwargs)

[snip]

Parameters
----------
y: Series or DataFrame
See above for types
x: Series, DataFrame, dict of Series, dict of DataFrame, Panel
weights : Series or ndarray
The weights are presumed to be (proportional to) the inverse of the
variance of the observations.  That is, if the variables are to be
transformed by 1/sqrt(W) you must supply weights = 1/W
intercept: bool
True if you want an intercept.  Defaults to True.
nw_lags: None or int
Number of Newey-West lags.  Defaults to None.

[snip]
``````
-
Thanks a lot (for both the solution, and for help tips)! –  Femto Trader Oct 1 '12 at 5:13
I've just an other question but I don't know if I can ask it here... what should I do if I want to set intercept to a given value (other than 0). (I will also reduce the number of degrees of freedom from 2 to 1) –  Femto Trader Oct 1 '12 at 5:19
@FemtoTrader: I don't think `ols` has that functionality. But, considering it does least squares, you can subtract that intercept from `y`, then use `ols` with `intercept=False`. It should be same. –  Avaris Oct 1 '12 at 5:51
No that's not the same ! slope is different if you force the line to pass through a given point –  Femto Trader Oct 1 '12 at 6:54
@FemtoTrader: No, in least squares, fitting `a*x + B` to `y` with fixed `B` is same as fitting `a*x` to `y-B`. –  Avaris Oct 1 '12 at 9:16
show 3 more comments

Here is a sample showing solution:

``````#!/usr/bin/env python

import pandas as pd
import matplotlib.pylab as plt
import numpy as np

data = [
(0.2, 1.3),
(1.3, 3.9),
(2.1, 4.8),
(2.9,5.5),
(3.3,6.9)
]

df = pd.DataFrame(data, columns=['X', 'Y'])

print(df)

# 2 degrees of freedom : slope / intercept
model_with_intercept = pd.ols(y=df['Y'], x=df['X'], intercept=True)
df['Y_fit_with_intercept'] = model_with_intercept.y_fitted

# 1 degree of freedom : slope ; intersept=0
model_no_intercept = pd.ols(y=df['Y'], x=df['X'], intercept=False)
df['Y_fit_no_intercept'] = model_no_intercept.y_fitted

# 1 degree of freedom : slope ; intersept=offset
offset = -1
df['Yoffset'] = df['Y'] - offset
model_with_offset = pd.ols(y=df['Yoffset'], x=df['X'], intercept=False)
df['Y_fit_offset'] = model_with_offset.y_fitted + offset

print(model_with_intercept)
print(model_no_intercept)
print(model_with_offset)

df.plot(x='X', y=['Y', 'Y_fit_with_intercept', 'Y_fit_no_intercept', 'Y_fit_offset'])
plt.show()
``````
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