Can $y^2=x^3-x+1$ elliptic curve with $GF(3^m)$ where $m=97$ be used for Diffie Hellman key exchange?

Question

I am new to ECC. I have just read about the elliptic curve $y^2=x^3-x+1$. I am copying the exact line

The elliptic curve is super-singular $E:y^2=x^3-x+1$ in affine coordinates defined over a Galois field $GF(3^m)$, $m=97$, whose irreducible polynomial is $x^{97}+x^{12}+2$.

Now I have three questions.

1. How is this curve different from than ordinary elliptic curve $(GF (2^m))$?
2. Can this graph be used to implement ECDH?
3. How secure is this curve compared to NIST's recommended curve parameters?

Thank you in advance for your help.

Answer 1

Let see the details of the curve; Let $K = \operatorname{GF}(3^m)$ and the curve be defined by the equation $$E(K):y^2 = x^3 + 2x + 1 \quad\quad ;-1 \equiv 2 \bmod 3$$

1. Yes, it is supersingular

2. The group of rational points has order $$n = 19088056323407827075424725586944833310200239047$$ The order has two factors; $7 \cdot 2726865189058261010774960798134976187171462721$.

   The second factor ( large one) is $\approx$ 150-bit number.

3. The generic DLog attack requires $\sqrt{n}$-time, so the security of the curve cannot be larger than $2^{75}$. Therefore cannot be used securely for ECDH.

   In today's standards, we at least require 128-bit security. That is why the Curve25519 is preferable, with some other properties like twist security

4. It has no twist security at all. The twist has an order $19088056323407827075424246988286372075141058881$ and it has two large factors $(9594160501626613625431,1989549405617260510054951)$, (approx each is a 73-bit number) therefore no twist security.

5. Curve that uses binary extension field $\operatorname{GF}(2^m)$ are effective in the calculation, however, some binary extension has no longer secure effective sizes. Using 3 as a base field is harder to use a large field like Curve25519.

6. According to the current NIST curves, it has lower security, though some of them don't twist security.

7. Super Singular curves have been avoided for a long time. None of the standard curves are supersingular curve.

---

SageMath code

K = GF(3^97)
print(K)
E = EllipticCurve(K,[0,0,0,-1,1])
print(E)
print("Supersingular? : ", E.is_supersingular())
print("Order of E : ",E.order())
print("Factors of ord(E) : ", factor(E.order()))
E2 = E.quadratic_twist()
print("Quadratic Twist of E :",E2)
print("Order of Quadratic Twist :", E2.order() )
print("Factors of the order of Quadratic Twist :", factor(E2.order()) )

Answer 2

This curve is thoroughly insecure. These researchers performed a computation to break discrete log on this exact curve.

All small characteristic pairing-friendly curves are insecure under modern knowledge. Here is another paper breaking discrete log on a curve over $\operatorname{GF}(3^{6\cdot 509})$ -- note that this field size is much bigger than your curve.