I work for Security Innovation, which owns NTRU, so I'm glad to see this interest.

The IEEE standard 1363.1-2008 specifies how to implement NTRUEncrypt with the most current parameter sets. It gives the following specifications to invert polynomials:

Division:

Inputs are a and b, two polynomials, where b is of degree N-1 and b_N is the leading coefficient of b. Outputs are q and r such that a = q*b + r and deg(r) < deg(b). r_d denotes the coefficient of r of degree d, i.e. the leading coefficient of r.

```
a) Set r := a and q := 0
b) Set u := (b_N)^–1 mod p
c) While deg r >= N do
1) Set d := deg r(X)
2) Set v := u × r_d × X^(d–N)
3) Set r := r – v × b
4) Set q := q + v
d) Return q, r
```

Here, r_d is the coefficient of r of degree d.

Extended Euclidean Algorithm:

```
a) If b = 0 then return (1, 0, a)
b) Set u := 1
c) Set d := a
d) Set v1 := 0
e) Set v3 := b
f) While v3 ≠ 0 do
1) Use the division algorithm (6.3.3.1) to write d = v3 × q + t3 with deg t3 < deg v3
2) Set t1 := u – q × v1
3) Set u := v1
4) Set d := v3
5) Set v1 := t1
6) Set v3 := t3
g) Set v := (d – a × u)/b [This division is exact, i.e., the remainder is 0]
h) Return (u, v, d)
```

Inverse in Z_p, p a prime:

```
a) Run the Extended Euclidean Algorithm with input a and (X^N – 1). Let (u, v, d) be the output, such that a × u + (X^N – 1) × v = d = GCD(a, (X^N – 1)).
b) If deg d = 0, return b = d^–1 (mod p) × u
c) Else return FALSE
```

Inverse in Z_p^e / (M(X), p a prime, M(X) a suitable polynomial such as X^N-1

```
a) Use the Inversion Algorithmto compute a polynomial b(X) ε R[X] that gives an inverse of a(X) in (R/pR)[X]/(M(X)). Return FALSE if the inverse does not exist. [The Inversion Algorithm may be applied here because R/pR is a field, and so (R/pR)[X] is a Euclidean ring.]
b) Set n = p
c) While n <= e do
1) b(X) = p × b(X) – a(X) × b(X)^2 (mod M(X)), with coefficients computed modulo p^n
2) Set n = p × n
d) Return b(X) mod M(X) with coefficients computed modulo p^e.
```

If you're doing a full implementation of NTRU you should see if you can get your institution to buy 1363.1, as raw NTRU encryption isn't secure against an active attacker and 1363.1 describes message processing techniques to fix that.

(Update 2013-04-18: Thanks to Sonel Sharam for spotting some errors in the previous version)

`f(X):=a(X)`

, they mean that f is a variable in your routine, a is an input to the function, and the type of both those things is "polynomial".`f(X)/X`

means for instance`x^2 + x + 0`

->`x + 1`

. The other tricky part is when you finally get your answer, you have to reduce it mod`X^N-1`

.`1`

) in step 5, the stuff you've "built up" in b and k gives you the inverse, you just have to put that information together. As an implementation detail, if you're storing a polynomial as an array of coefficients, then multiplying or dividing by x just means shift everything along one place.7more comments