3.3 KiB
Compiling and Executing a Numpy Function
Importing necessary components
Everything you need to compile and execute homomorphic functions is included in a single module. You can import it like so:
import concrete.numpy as hnp
Defining a function to compile
You need to have a python function that follows the limits of the Concrete Framework. Here is a simple example:
def f(x, y):
return x + y
Compiling the function
To compile the function, you need to identify the inputs that it is expecting. In the example function above, x and y could be scalars or tensors (though, for now, only dot between tensors are supported), they can be encrypted or clear, they can be signed or unsigned, they can have different bit-widths. So, we need to know what they are beforehand. We can do that like so:
x = "encrypted"
y = "encrypted"
In this configuration, both x and y will be encrypted values.
We also need an inputset. It is to determine the bit-widths of the intermediate results. It should be an iterable yielding tuples in the same order as the inputs of the function to compile. There should be at least 10 inputs in the input set to avoid warnings (except for functions with less than 10 possible inputs). The warning is there because the bigger the input set, the better the bounds will be.
inputset = [(2, 3), (0, 0), (1, 6), (7, 7), (7, 1), (3, 2), (6, 1), (1, 7), (4, 5), (5, 4)]
Finally, we can compile our function to its homomorphic equivalent.
compiler = hnp.NPFHECompiler(
f, {"x": x, "y": y},
)
circuit = compiler.compile_on_inputset(inputset)
# If you want, you can separate tracing and compilation steps like so:
# You can either evaluate in one go:
compiler.eval_on_inputset(inputset)
# Or progressively:
for input_values in inputset:
compiler(*input_values)
# You can print the traced graph:
print(str(compiler))
# Outputs
# %0 = x # EncryptedScalar<uint3>
# %1 = y # EncryptedScalar<uint3>
# %2 = add(%0, %1) # EncryptedScalar<uint4>
# return %2
# Or draw it
compiler.draw_graph(show=True)
circuit = compiler.get_compiled_fhe_circuit()
Here is the graph from the previous code block drawn with draw_graph:
Performing homomorphic evaluation
You can use .run(...) method of FHECircuit returned by hnp.compile_numpy_function(...) to perform fully homomorphic evaluation. Here are some examples:
circuit.run(3, 4)
# 7
circuit.run(1, 2)
# 3
circuit.run(7, 7)
# 14
circuit.run(0, 0)
# 0
Be careful about the inputs, though.
If you were to run with values outside the range of the inputset, the result might not be correct.
FIXME(benoit): explain the API to encrypt, run_inference, decrypt, keygen etc when they are available