Paper 2026/695
2G2T: Constant-Size, Statistically Sound MSM Outsourcing
Abstract
Multi-scalar multiplication (MSM), $MSM(\vec{P},\vec{x})=\sum_{i=1}^n x_i P_i$, is a dominant computational kernel in discrete-logarithm–based cryptography and often becomes a bottleneck for verifiers and other resource-constrained clients. We present 2G2T, a simple protocol for verifiably outsourcing MSM to an untrusted server. 2G2T is efficient for both parties: the server performs only two MSM computations and returns only two group elements to the client, namely the claimed result $A=MSM(\vec{P},\vec{x})$ and an auxiliary group element $B$. Client-side verification consists of a single length-$n$ field inner product and only three group operations (two scalar multiplications and one group addition). In our Ristretto255 implementation, verification is up to $\sim 300\times$ faster than computing the MSM locally using a highly optimized MSM routine (for $n$ up to $2^{18}$). Moreover, 2G2T enables latency-hiding verification: nearly all verifier work can be performed while waiting for the server's response, so once $(A,B)$ arrives the verifier completes the check with only one scalar multiplication and one group addition (both independent of $n$). Finally, despite its simplicity and efficiency, we prove that 2G2T achieves statistical soundness: for any (even unbounded) adversarial server, the probability of accepting an incorrect result is at most $1/q$ per query, and at most $e/q$ over $e$ adaptive executions, in a prime-order group of size $q$.
Metadata
- Available format(s)
-
PDF
- Category
- Cryptographic protocols
- Publication info
- Preprint.
- Keywords
- multi-scalar multiplicationMSM outsourcingverifiable outsourcingstatistical soundness
- Contact author(s)
- mkhabbazian @ ualberta ca
- History
- 2026-04-11: approved
- 2026-04-08: received
- See all versions
- Short URL
- https://ia.cr/2026/695
- License
-
CC BY
BibTeX
@misc{cryptoeprint:2026/695,
author = {Majid Khabbazian},
title = {{2G2T}: Constant-Size, Statistically Sound {MSM} Outsourcing},
howpublished = {Cryptology {ePrint} Archive, Paper 2026/695},
year = {2026},
url = {https://eprint.iacr.org/2026/695}
}