Paper 2023/1093

Properties of Lattice Isomorphism as a Cryptographic Group Action

Abstract

In recent years, the Lattice Isomorphism Problem (LIP) has served as an underlying assumption to construct quantum-resistant cryptographic primitives, e.g. the zero-knowledge proof and digital signature scheme by Ducas and van Woerden (Eurocrypt 2022), and the HAWK digital signature scheme (Asiacrypt 2022). While prior lines of work in group action cryptography, e.g. the works of Brassard and Yung (Crypto 1990), and more recently Alamati, De Feo, Montgomery and Patranabis (Asiacrypt 2020), focused on studying the discrete logarithm problem and isogeny-based problems in the group action framework, in recent years this framing has been used for studying the cryptographic properties of computational problems based on the difficulty of determining equivalence between algebraic objects. Examples include Permutation and Linear Code Equivalence Problems used in LESS (Africacrypt 2020), and the Tensor Isomorphism Problem (TCC 2019). This study delves into the quadratic form version of LIP, examining it through the lens of group actions. In this work we (1) give formal definitions and study the cryptographic properties of this group action (LIGA), (2) demonstrate that LIGA lacks both weak unpredictability and weak pseudorandomness, and (3) under certain assumptions, establish a theoretical trade-off between time complexity and the required number of samples for breaking weak unpredictability, for large dimensions. We also conduct experiments supporting our analysis. Additionally, we employ our findings to formulate new hard problems on quadratic forms.