International Association
for Cryptologic Research

This paper presents a comprehensive security analysis of the Adh zero-knowledge proof system, a novel lattice-based, quantum-resistant proof of possession system. The Adh system offers compact key and proof sizes, making it suitable for real-world digital signature and public key agreement protocols. We explore its security by reducing it to the hardness of the Module-ISIS problem and introduce three new variants: Module-ISIS+, Module-ISIS*, and Module-ISIS**. These constructions enhance security through variations on chaining mechanisms. We also provide a reduction to the module modulus subset sum problem under conservative assumptions.

Empirical evidence and statistical testing support the zero-knowledge, completeness, and soundness properties of the Adh proof system. Comparative analysis demonstrates the Adh system's advantages in terms of key and proof sizes over existing post-quantum schemes like Kyber and Dilithium.

This paper represents an early preprint and is a work in progress. The core security arguments and experimental results are present, and formal proofs and additional analysis are provided. We invite feedback and collaboration from the research community to further strengthen the security foundations of the Adh system and explore its potential applications in quantum-resistant cryptography.

The elliptic curve-based Enhanced Privacy ID (EPID) signature scheme is broadly used for hardware enclave attestation by many platforms that implement Intel Software Guard Extensions (SGX) and other devices. This scheme has also been included in the Trusted Platform Module (TPM) specifications and ISO/IEC standards. However, it is insecure against quantum attackers. While research into quantum-resistant EPID has resulted in several lattice-based schemes, Boneh et al. have initiated the study of EPID signature schemes built only from symmetric primitives. We observe that for this line of research, there is still room for improvement. In this paper, we propose a new hash-based EPID scheme, which includes a novel and efficient signature revocation scheme. In addition, our scheme can handle a large group size (up to $2^{60}$ group members), which meets the requirements of rapidly developing hardware enclave attestation applications. The security of our scheme is proved under the Universal Composability (UC) model. Finally, we have implemented our EPID scheme, which, to our best knowledge, is the first implementation of EPID from symmetric primitives.

Direct Anonymous Attestation (DAA) was designed for the Trusted Platform Module (TPM) and versions using RSA and elliptic curve cryptography have been included in the TPM specifications and in ISO/IEC standards. These standardised DAA schemes have their security based on the factoring or discrete logarithm problems and are therefore insecure against quantum attackers. Research into quantum-resistant DAA has resulted in several lattice-based schemes. Now in this paper, we propose the first post-quantum DAA scheme from symmetric primitives. We make use of a hash-based signature scheme, which is a slight modification of SPHINCS+, as a DAA credential. A DAA signature, proving the possession of such a credential, is a multiparty computation-based non-interactive zero-knowledge proof. The security of our scheme is proved under the Universal Composability (UC) model. While maintaining all the security properties required for a DAA scheme, we try to make the TPM's workload as low as possible. Our DAA scheme can handle a large group size (up to $2^{60}$ group members), which meets the requirements of rapidly developing TPM applications.

Group signatures and their variants have been widely used in privacy-sensitive scenarios such as anonymous authentication and attestation. In this paper, we present a new post-quantum group signature scheme from symmetric primitives. Using only symmetric primitives makes the scheme less prone to unknown attacks than basing the design on newly proposed hard problems whose security is less well-understood. However, symmetric primitives do not have rich algebraic properties, and this makes it extremely challenging to design a group signature scheme on top of them. It is even more challenging if we want a group signature scheme suitable for real-world applications, one that can support large groups and require few trust assumptions. Our scheme is based on MPC-in-the-head non-interactive zero-knowledge proofs, and we specifically design a novel hash-based group credential scheme, which is rooted in the SPHINCS+ signature scheme but with various modifications to make it MPC (multi-party computation) friendly. The security of the scheme has been proved under the fully dynamic group signature model. We provide an implementation of the scheme and demonstrate the feasibility of handling a group size as large as $2^{60}$. This is the first group signature scheme from symmetric primitives that supports such a large group size and meets all the security requirements.

Machine learning (ML) as a service has emerged as a rapidly expanding field across various industries like healthcare, finance, marketing, retail and e-commerce, Industry 4.0, etc where a huge amount of data is gen- erated. To handle this amount of data, huge computational power is required for which cloud computing used to be the first choice. However, there are several challenges in cloud computing like limitations of bandwidth, network connectivity, higher latency, etc. To address these issues, edge computing is prominent nowadays, where the data from sensor nodes is collected and processed on low-cost edge devices. As simple sensor nodes are not capable of handling complex computations of ML models, data from sensor nodes need to be transferred to some nearest edge devices for further processing. If this sensor data is related to some security- critical application, the privacy of such sensitive data needs to be preserved both during communication from sensor node to edge device and computation in edge nodes. This increased need to perform edge-based ML on privacy-preserved data has led to a surge in interest in homomorphic encryption (HE) due to its ability to perform computations on encrypted form of data. The highest form of HE, Fully Homomorphic Encryption (FHE), is capable of theoretically handling arbitrary encrypted algorithms but comes with huge computational overhead. Hence, the implementation of such a complex encrypted ML model on a single edge node is not very practical in terms of latency requirements. Our paper introduces a low-cost encrypted ML framework on a distributed edge cluster, where multiple low-cost edge devices (Raspberry Pi boards) are clustered to perform encrypted distributed K-Nearest Neighbours (KNN) algorithm computations. Our experimental result shows, KNN prediction on standard Wisconsin breast cancer dataset takes approximately 1.2 hours, implemented on a cluster of six pi boards, maintaining end-to-end data confidentiality of critical medical data without any re- quirement of costly cloud-based computation resource support

he unique design of the FLIP cipher necessitated a generalization of standard cryptographic criteria for Boolean functions used in stream ciphers, prompting a focus on properties specific to subsets of $\mathbb{F}_2^n$ rather than the entire set. This led to heightened interest in properties related to fixed Hamming weight sets and the corresponding partition of $\mathbb{F}_2^n$ into n+1 such sets. Consequently, the concept of Weightwise Almost Perfectly Balanced (WAPB) functions emerged, which are balanced on each of these sets.Various studies have since proposed WAPB constructions and examined their cryptographic parameters for use in stream cipher filters.

In this article, we introduce a general approach to constructing WAPB functions using the concept of order, which simplifies implementation and enhances cryptographic strength. We present two new constructions: a recursive method employing multiple orders on binary strings, and another utilizing just two orders. We establish lower bounds for nonlinearity and weightwise nonlinearities within these classes. By instantiating specific orders, we demonstrate that some achieve minimal algebraic immunity, while others provide functions with guaranteed optimal algebraic immunity. Experimental results in 8 and 16 variables indicate that using orders based on field representation significantly outperforms other methods in terms of both global and weightwise algebraic immunity and nonlinearity. Additionally, we extend the recursive construction to create WAPB functions for any value of n, with experiments in 10, 12, and 14 variables confirming that these order-based functions exhibit robust cryptographic parameters. In particular, those based on field orders display optimal degrees and algebraic immunity, and strong weightwise nonlinearities and algebraic immunities.

Problems in the complexity class $NP$ are not all known to be solvable, but are verifiable given the solution, in polynomial time by a classical computer. The complexity class $BQP$ includes all problems solvable in polynomial time by a quantum computer. Prime factorization is in $NP$ class, and is also in $BQP$ class, owing to Shor's algorithm. The hardest of all problems within the $NP$ class are called $NP$-complete. If a quantum algorithm can solve an $NP$-complete problem in polynomial time, it would imply that a quantum computer can solve all problems in $NP$ in polynomial time. Here, we present a polynomial-time quantum algorithm to solve an $NP$-complete variant of the $SUBSET-SUM$ problem, thereby, rendering $NP\subseteq BQP$. We illustrate that given a set of integers, which may be positive or negative, a quantum computer can decide in polynomial time whether there exists any subset that sums to zero. There are many real-world applications of our result, such as finding patterns efficiently in stock-market data, or in recordings of the weather or brain activity. As an example, the decision problem of matching two images in image processing is $NP$-complete, and can be solved in polynomial time, when amplitude amplification is not required.

This paper defines a post-quantum encryption scheme based on discussion cryptography by introducing a new post-quantum hard problem called Q-Problem. The idea behind this scheme is to hide the keys of each entity, and the encryption process is based on secret message holders using only random private keys.

This paper achieves fast polynomial inverse operations specifically tailored for the NTRU Prime KEM on ARMv8 NEON instruction set benchmarking on four processor architectures: Cortex-A53, Cortex-A72, Cortex-A76 and Apple M1. We utilize the jumping divison steps of the constant-time GCD algorithm from Bernstein and Yang (TCHES’19) and optimize underlying polynomial multiplication of various lengths to improve the efficiency for computing polynomial inverse operations in NTRU Prime.

A verifiable random function (VRF) allows one to compute a random-looking image, while at the same time providing a unique proof that the function was evaluated correctly. VRFs are a cornerstone of modern cryptography and, among other applications, are at the heart of recently proposed proof-of-stake consensus protocols. In this work we initiate the formal study of aggregate VRFs, i.e., VRFs that allow for the aggregation of proofs/images into a small di- gest, whose size is independent of the number of input proofs/images, yet it still enables sound verification. We formalize this notion along with its security properties and we propose two constructions: The first scheme is conceptually simple, concretely efficient, and uses (asymmetric) bilinear groups of prime order. Pseudorandomness holds in the random oracle model and aggregate pseudorandomness is proven in the algebraic group model. The second scheme is in the standard model and it is proven secure against the learning with errors (LWE) problem.

As a cryptographic building block of independent interest, we introduce the notion of key homomorphic VRFs, where the verification keys and the proofs are endowed with a group structure. We conclude by discussing several applications of key-homomorphic and aggregate VRFs, such as distributed VRFs and aggregate proof-of-stake protocols.

We propose GraphOS, a system that allows a client that owns a graph database to outsource it to an untrusted server for storage and querying. It relies on doubly-oblivious primitives and trusted hardware to achieve a very strong privacy and efficiency notion which we call oblivious graph processing: the server learns nothing besides the number of graph vertexes and edges, and for each query its type and response size. At a technical level, GraphOS stores the graph on a doubly-oblivious data structure, so that all vertex/edge accesses are indistinguishable. For this purpose, we propose Omix++, a novel doubly-oblivious map that outperforms the previous state of the art by up to 34×, and may be of independent interest. Moreover, to avoid any leakage from CPU instruction fetching during query evaluation, we propose algorithms for four fundamental graph queries (BFS/DFS traversal, minimum spanning tree, and single-source shortest paths) that have a fixed execution trace, i.e., the sequence of executed operations is independent of the input. By combining these techniques, we eliminate all information that a hardware adversary observing the memory access pattern within the protected enclave can infer. We benchmarked GraphOS against the best existing solution, based on oblivious relational DBMS(translating graph queries to relational operators). GraphOS is not only significantly more performant (by up to two orders of magnitude for our tested graphs) but it eliminates leakage related to the graph topology that is practically inherent when a relational DBMS is used unless all operations are “padded” to the worst case.

We present Rondo, a scalable and reconfiguration-friendly distributed randomness beacon (DRB) protocol in the partially synchronous model. Rondo is the first DRB protocol that is built from batched asynchronous verifiable secret sharing (bAVSS) and meanwhile avoids the high $O(n^3)$ message cost, where $n$ is the number of nodes. Our key contribution lies in the introduction of a new variant of bAVSS called batched asynchronous verifiable secret sharing with partial output (bAVSS-PO). bAVSS-PO is a weaker primitive than bAVSS but allows us to build a secure and more efficient DRB protocol. We propose a bAVSS-PO protocol Breeze. Breeze achieves the optimal $O(n)$ messages for the sharing stage and allows Rondo to offer better scalability than prior DRB protocols. Additionally, to support the reconfiguration, we introduce Rondo-BFT, a dynamic and partially synchronous Byzantine fault-tolerant protocol inspired by Dyno (S&P 2022). Unlike Dyno, Rondo-BFT provides a communication pattern that generates randomness beacon output periodically, making it well-suited for DRB applications.

We implement our protocols and evaluate the performance on Amazon EC2 using up to 91 instances. Our evaluation results show that Rondo achieves higher throughput than existing works and meanwhile offers better scalability, where the performance does not degrade as significantly as $n$ grows.

In this paper we explore efficient ways to prove correctness of elliptic curve pairing relations. Pairing-based cryptographic protocols such as the Groth16 and Plonk SNARKs and the BLS signature scheme are used extensively in public blockchains such as Ethereum due in large part to their small size. However the relatively high cost of pairing computation remains a practical problem for many use cases such as verification ``in circuit" inside a SNARK. This naturally arises in recursive SNARK composition and SNARKs of BLS based consensus protocols.

To improve pairing verification, we first show that the final exponentiation step of pairing verification can be replaced with a more efficient ``residue check," which can be incorporated into the Miller loop. Then, we show how to reduce the cost of the Miller loop by pre-computing all the necessary lines, and how this is especially efficient when the second pairing argument is fixed in advance. This is the case for BLS signatures with a fixed public key, as well as for KZG based SNARKs like Plonk and two of the three Groth16 pairings. Finally, we show how to improve of the protocol of [gar] by combining quotients, which allows us to more efficiently prove higher degree relations. These techniques also carry over naturally to pairing verification, for example on-chain verification or as part of the BitVM(2) protocol for Bitcoin smart contracts. We instantiate algorithms and show results for the BN254 curve.

Machine-learning systems continue to advance at a rapid pace, demonstrating remarkable utility in various fields and disciplines. As these systems continue to grow in size and complexity, a nascent industry is emerging which aims to bring machine-learning-as-a-service (MLaaS) to market. Outsourcing the operation and training of these systems to powerful hardware carries numerous advantages, but challenges arise when needing to ensure privacy and the correctness of work carried out by a potentially untrusted party. Recent advancements in the discipline of applied zero-knowledge cryptography, and probabilistic proof systems in general, have led to a means of generating proofs of integrity for any computation, which in turn can be efficiently verified by any party, in any place, at any time.

In this work we present the application of a non-interactive, plausibly-post-quantum-secure, probabilistically-checkable argument system utilized as an efficiently verifiable guarantee that a privacy mechanism was irrefutably applied to a machine-learning model during the training process. That is, we prove the correct training of a differentially-private (DP) linear regression over a dataset of 60,000 samples on a single machine in 55 minutes, verifying the entire computation in 47 seconds. To our knowledge, this result represents the fastest known instance in the literature of provable-DP over a dataset of this size. Finally, we show how this task can be run in parallel, leading to further dramatic reductions in prover and verifier runtime complexity. We believe this result constitutes a key stepping-stone towards end-to-end private MLaaS.

We show the authentication mechanism [Ad Hoc Networks, 2023, 103003] fails to keep user anonymity, not as claimed.

We investigate the feasibility of permissionless consensus (aka Byzantine agreement) under standard assumptions. A number of protocols have been proposed to achieve permissionless consensus, most notably based on the Bitcoin protocol; however, to date no protocol is known that can be provably instantiated outside of the random oracle model.

In this work, we take the first steps towards achieving permissionless consensus in the standard model. In particular, we demonstrate that worst-case conjectures in fine-grained complexity, in particular the orthogonal vectors conjecture (implied by the Strong Exponential Time Hypothesis), imply permissionless consensus in the random beacon model—a setting where a fresh random value is delivered to all parties at regular intervals. This gives a remarkable win-win result: either permissionless consensus exists relative to a random beacon, or there are non-trivial worst-case algorithmic speed-ups for a host of natural algorithmic problems (including SAT).

Our protocol achieves resilience against adversaries that control an inverse-polynomial fraction of the honest computational power, i.e., adversarial power $A = T^{1−ε} $ for some constant $ε > 0$, where $T$ denotes the honest computational power. This relatively low threshold is a byproduct of the slack in the fine-grained complexity conjectures.

One technical highlight is the construction of a Seeded Proof of Work: a Proof of Work where many (correlated) challenges can be derived from a single short public seed, and yet still no non-trivial amortization is possible.

In this note, we improve the space-efficient variant of Regev's quantum factoring algorithm [Reg23] proposed by Ragavan and Vaikuntanathan [RV24] by constant factors in space and/or size. This allows us to bridge the significant gaps in concrete efficiency between the circuits by [Reg23] and [RV24]; [Reg23] uses far fewer gates, while [RV24] uses far fewer qubits. The main observation is that the space-efficient quantum modular exponentiation technique by [RV24] can be modified to work with more general sequences of integers than the Fibonacci numbers. We parametrize this in terms of a linear recurrence relation, and through this formulation construct three different circuits for quantum factoring: - A circuit that uses $\approx 12.4n$ qubits and $\approx 54.9n^{1/2}$ multiplications of $n$-bit integers. - A circuit that uses $(9+\epsilon)n$ qubits and $O_\epsilon(n^{1/2})$ multiplications of $n$-bit integers, for any $\epsilon > 0$. - A circuit that uses $(24+\epsilon)n^{1/2}$ multiplications of $n$-bit integers, and $O_\epsilon(n)$ qubits, for any $\epsilon > 0$.

In comparison, the original circuit by [Reg23] uses at least $\approx 3n^{3/2}$ qubits and $\approx 6n^{1/2}$ multiplications of $n$-bit integers, while the space-efficient variant by [RV24] uses $\approx 10.32n$ qubits and $\approx 138.3n^{1/2}$ multiplications of $n$-bit integers (although a very simple modification of their Fibonacci-based circuit uses $\approx 11.32n$ qubits and only $\approx 103.7n^{1/2}$ multiplications of $n$-bit integers). The improvements proposed in this note take effect for sufficiently large values of $n$; it remains to be seen whether they can also provide benefits for practical problem sizes.

Storage of sensitive multi-dimensional arrays must be secure and efficient in storage and processing time. Searchable encryption allows one to trade between security and efficiency. Searchable encryption design focuses on building indexes, overlooking the crucial aspect of record retrieval. Gui et al. (PoPETS 2023) showed that understanding the security and efficiency of record retrieval is critical to understand the overall system. A common technique for improving security is partitioning data tuples into parts. When a tuple is requested, the entire relevant part is retrieved, hiding the tuple of interest. This work assesses tuple partitioning strategies in the dense data setting, considering parts that are random, $1$-dimensional, and multi-dimensional. We consider synthetic datasets of $2$, $3$ and $4$ dimensions, with sizes extending up to $2$M tuples. We compare security and efficiency across a variety of record retrieval methods. Our findings are: 1. For most configurations, multi-dimensional partitioning yields better efficiency and less leakage. 2. 1-dimensional partitioning outperforms multi-dimensional partitioning when the first (indexed) dimension is any size as long as the query is large in all other dimensions except the (the first dimension can be any size). 3. The leakage of 1-dimensional partitioning is reduced the most when using a bucketed ORAM (Demertiz et al., USENIX Security 2020).

The NTRU problem has proven a useful building block for efficient bootstrapping in Fully Homomorphic Encryption (FHE) schemes, and different such schemes have been proposed. FINAL (ASIACRYPT 2022) first constructed FHE using homomorphic multiplexer (CMux) gates for the blind rotation operation. Later, XZD+23 (CRYPTO 2023) gave an asymptotic optimization by changing the ciphertext format to enable ring automorphism evaluations. In this work, we examine an adaptation to FINAL to evaluate CMux gates of higher arity and the resulting tradeoff to running times and bootstrapping key sizes. In this setting, we can compare the time and space efficiency of both bootstrapping protocols with larger key space against each other and the state of the art.

Zero-knowledge proof systems are widely used in different applications on the Internet. Among zero-knowledge proof systems, SNARKs are a popular choice because of their fast verification time and small proof size. The efficiency of zero-knowledge systems is crucial for usability, resulting in the development of so-called arithmetization-oriented ciphers. In this work, we introduce Vision Mark-32, a modified instance of Vision defined over binary tower fields, with an optimized number of rounds and an efficient MDS matrix. We implement a fully-pipelined Vision Mark-32 permutation on Alveo U55C FPGA accelerator card and argue an order of magnitude better hardware efficiency compared to the popular Poseidon hash. Our fully-pipelined Vision Mark-32 implementation runs at 250 MHz and uses 398 kLUT and 104 kFF. Lastly, we delineate how to implement each step efficiently in hardware.