# Seamlessly solve square linear system that could be 1-dimensional in numpy

I am solving a linear system of equations `Ax=b`. It is known that `A` is square and of full rank, but it is the result of a few matrix multiplications, say `A = numpy.dot(C,numpy.dot(D,E))` in which the result can be `1x1` depending on the inputs `C,D,E`. In that case `A` is a `float`.

`b` is ensured to be a vector, even when it is a `1x1` one.

I am currently doing

``````A = numpy.dot(C,numpy.dot(D,E))
try:
x = numpy.linalg.solve(A,b)
except:
x = b[0] / A
``````

I searched numpy's documentation and didn't find other alternatives for `solve` and `dot` that would accept scalars for the first or output arrays for the second. Actually `numpy.linalg.solve` requires dimension at least 2. If we were going to produce an `A = numpy.array([5])` it would complain too.

Is there some alternative that I missed?

• Why is `A` a float in the 1x1 case? It sounds like that's the underlying problem that needs to be corrected. Aug 14, 2017 at 20:57

in which the result can be 1x1 depending on the inputs C,D,E. In that case A is a float.

This is not true, it is a 1x1 matrix, as expected

``````x=np.array([[1,2]])
z=x.dot(x.T)  # 1x2 matrix times 2x1
print(z.shape) # (1, 1)
``````

which works just fine with linalg.solve

``````linalg.solve(z, z) # returns [[1]], as expected
``````
• You are right about your example. I probably don't know something about how `array` and `dot` work. Why is it that you initialize `x=np.array([[1,2]])` instead of `x=np.array([1,2])` ? Aug 14, 2017 at 21:03
• I think I understood now combining your idea with user2357112's answer. If I do `numpy.atleast_2d(numpy.array([1,2]))` it produces `[[1,2]]`. An initialization like `numpy.array([1,2])` actually produces a `(2,)` array. Aug 14, 2017 at 21:13
• I initialize x in such a way because this is the only proper way to initialize the matrix. If you initialize it with [1,2] then it is a vector, not a matrix. Aug 14, 2017 at 22:28

While you could expand the dimensions of `A`:

``````A = numpy.atleast_2d(A)
``````

it sounds like `A` never should have been a float in the first place, and you should instead fix whatever is causing it to be one.