Audit report
Smart Contract audit reports
Rollup and Chain Security
Polynomial Chain utilizes a managed version of the OP Stack, implemented by Conduit. This implementation has undergone rigorous auditing, enhancing its security profile. For detailed audit information, please refer to the Conduit documentation As a member of the Superchain ecosystem, Polynomial Chain benefits from Ethereum’s data availability (DA) layer. This integration provides a robust foundation for data integrity and accessibility. Furthermore, the critical operational keys are under the stewardship of the Optimism Security Council, adding an extra layer of governance and protection.
Liquidity Layer
The Liquidity Layer of Polynomial Chain is built upon the Synthetix v3 codebase, which has undergone thorough auditing. The audit report for Synthetix v3 can be accessed through a provided link. Unlike some systems, the Liquidity Layer does not issue its own stablecoin. Instead, it maintains risk parameters closely aligned with those of the base deployment that powered Polynomial Trade. This approach is deliberately chosen to ensure that both markets share a similar attack surface, minimizing potential vulnerabilities, Audit Reports for Polynomial Liquidity Layer can be found here
Abstraction Layer
Account Abstraction
Account abstraction capabilities are provided through ZeroDev, a solution that has undergone extensive security audits. This ensures a high level of safety for user interactions. Audit reports for ZeroDev can be found in their Github repository
Chain Abstraction
Socket provides the chain abstraction functionality for Polynomial Chain. This technology facilitates seamless interoperability between different blockchain networks. Socket has been widely adopted by various other rollups, demonstrating its reliability and effectiveness. Comprehensive audit information for Socket is available in their Github repository The extensive use of Socket by other rollups in the ecosystem serves as a testament to its security and dependability, Audit Report for abstraction layer of polynomial can be found here.
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