Happy to suggest a (possibly obvious) implementation of this, which could be made in pure Python or C/Cython if you've got time and space for new dependencies, and need it to be faster.

A sparse matrix in N dimensions can assume most elements are empty, so we use a dictionary keyed on tuples:

```
class NDSparseMatrix:
def __init__(self):
self.elements = {}
def addValue(self, tuple, value):
self.elements[tuple] = value
def readValue(self, tuple):
try:
value = self.elements[tuple]
except KeyError:
# could also be 0.0 if using floats...
value = 0
return value
```

and you would use it like so:

```
sparse = NDSparseMatrix()
sparse.addValue((1,2,3), 15.7)
should_be_zero = sparse.readValue((1,5,13))
```

You could make this implementation more robust by verifying that the input is in fact a tuple, and that it contains only integers, but that will just slow things down so I wouldn't worry unless you're releasing your code to the world later.

**EDIT** - a Cython implementation of the matrix multiplication problem, assuming other tensor is an N Dimensional NumPy array (`numpy.ndarray`

) might look like this:

```
#cython: boundscheck=False
#cython: wraparound=False
cimport numpy as np
def sparse_mult(object sparse, np.ndarray[double, ndim=3] u):
cdef unsigned int i, j, k
out = np.ndarray(shape=(u.shape[0],u.shape[1],u.shape[2]), dtype=double)
for i in xrange(1,u.shape[0]-1):
for j in xrange(1, u.shape[1]-1):
for k in xrange(1, u.shape[2]-1):
# note, here you must define your own rank-3 multiplication rule, which
# is, in general, nontrivial, especially if LxMxN tensor...
# loop over a dummy variable (or two) and perform some summation:
out[i,j,k] = u[i,j,k] * sparse((i,j,k))
return out
```

Although you will always need to hand roll this for the problem at hand, because (as mentioned in code comment) you'll need to define which indices you're summing over, and be careful about the array lengths or things won't work!

**EDIT 2** - if the other matrix is also sparse, then you don't need to do the three way looping:

```
def sparse_mult(sparse, other_sparse):
out = NDSparseMatrix()
for key, value in sparse.elements.items():
i, j, k = key
# note, here you must define your own rank-3 multiplication rule, which
# is, in general, nontrivial, especially if LxMxN tensor...
# loop over a dummy variable (or two) and perform some summation
# (example indices shown):
out.addValue(key) = out.readValue(key) +
other_sparse.readValue((i,j,k+1)) * sparse((i-3,j,k))
return out
```

My suggestion for a C implementation would be to use a simple struct to hold the indices and the values:

```
typedef struct {
int index[3];
float value;
} entry_t;
```

you'll then need some functions to allocate and maintain a dynamic array of such structs, and search them as fast as you need; but you should test the Python implementation in place for performance before worrying about that stuff.