One simple and straightforward way is to utilize constrained least squares where constraints are weighted with a largish number M, like:

```
from numpy import dot
from numpy.linalg import solve
from numpy.polynomial.polynomial import Polynomial as P, polyvander as V
def clsq(A, b, C, d, M= 1e5):
"""A simple constrained least squared solution of Ax= b, s.t. Cx= d,
based on the idea of weighting constraints with a largish number M."""
return solve(dot(A.T, A)+ M* dot(C.T, C), dot(A.T, b)+ M* dot(C.T, d))
def cpf(x, y, x_c, y_c, n, M= 1e5):
"""Constrained polynomial fit based on clsq solution."""
return P(clsq(V(x, n), y, V(x_c, n), y_c, M))
```

Obviously this is not really a *all inclusive silver bullet* solution, but apparently it seems to work reasonable well with an simple example (`for M in [0, 4, 24, 124, 624, 3124]`

):

```
In []: x= linspace(-6, 6, 23)
In []: y= sin(x)+ 4e-1* rand(len(x))- 2e-1
In []: x_f, y_f= linspace(-(3./ 2)* pi, (3./ 2)* pi, 4), array([1, -1, 1, -1])
In []: n, x_s= 5, linspace(-6, 6, 123)
In []: plot(x, y, 'bo', x_f, y_f, 'bs', x_s, sin(x_s), 'b--')
Out[]: <snip>
In []: for M in 5** (arange(6))- 1:
....: plot(x_s, cpf(x, y, x_f, y_f, n, M)(x_s))
....:
Out[]: <snip>
In []: ylim([-1.5, 1.5])
Out[]: <snip>
In []: show()
```

and producing output like:

**Edit:** Added 'exact' solution:

```
from numpy import dot
from numpy.linalg import solve
from numpy.polynomial.polynomial import Polynomial as P, polyvander as V
from scipy.linalg import qr
def solve_ns(A, b): return solve(dot(A.T, A), dot(A.T, b))
def clsq(A, b, C, d):
"""An 'exact' constrained least squared solution of Ax= b, s.t. Cx= d"""
p= C.shape[0]
Q, R= qr(C.T)
xr, AQ= solve(R[:p].T, d), dot(A, Q)
xaq= solve_ns(AQ[:, p:], b- dot(AQ[:, :p], xr))
return dot(Q[:, :p], xr)+ dot(Q[:, p:], xaq)
def cpf(x, y, x_c, y_c, n):
"""Constrained polynomial fit based on clsq solution."""
return P(clsq(V(x, n), y, V(x_c, n), y_c))
```

and testing the fit:

```
In []: x= linspace(-6, 6, 23)
In []: y= sin(x)+ 4e-1* rand(len(x))- 2e-1
In []: x_f, y_f= linspace(-(3./ 2)* pi, (3./ 2)* pi, 4), array([1, -1, 1, -1])
In []: n, x_s= 5, linspace(-6, 6, 123)
In []: p= cpf(x, y, x_f, y_f, n)
In []: p(x_f)
Out[]: array([ 1., -1., 1., -1.])
```

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