Optimized C library for cryptographic operations on curve secp256k1.
This library is used for consensus critical cryptographic operations on the eCash network. It is maintained within the Bitcoin ABC repository, and is mirrored as a separate repository for ease of reuse in other eCash projects. Developers who want to contribute may do so at reviews.bitcoinabc.org. Use at your own risk.
This library is intended to be the highest quality publicly available library for cryptography on the secp256k1 curve. However, the primary focus of its development has been for usage in the eCash system and usage unlike Bitcoin's may be less well tested, verified, or suffer from a less well thought out interface. Correct usage requires some care and consideration that the library is fit for your application's purpose.
Features:
- secp256k1 ECDSA signing/verification and key generation.
- secp256k1 Schnorr signing/verification (Bitcoin Cash Schnorr variant).
- Additive and multiplicative tweaking of secret/public keys.
- Serialization/parsing of secret keys, public keys, signatures.
- Constant time, constant memory access signing and pubkey generation.
- Derandomized ECDSA (via RFC6979 or with a caller provided function.)
- Very efficient implementation.
- Suitable for embedded systems.
- Optional module for public key recovery.
- Optional module for ECDH key exchange.
- Optional module for multiset hash (experimental).
Experimental features have not received enough scrutiny to satisfy the standard of quality of this library but are made available for testing and review by the community. The APIs of these features should not be considered stable.
- General
- No runtime heap allocation.
- Extensive testing infrastructure.
- Structured to facilitate review and analysis.
- Intended to be portable to any system with a C89 compiler and uint64_t support.
- No use of floating types.
- Expose only higher level interfaces to minimize the API surface and improve application security. ("Be difficult to use insecurely.")
- Field operations
- Optimized implementation of arithmetic modulo the curve's field size (2^256 - 0x1000003D1).
- Using 5 52-bit limbs (including hand-optimized assembly for x86_64, by Diederik Huys).
- Using 10 26-bit limbs (including hand-optimized assembly for 32-bit ARM, by Wladimir J. van der Laan).
- Optimized implementation of arithmetic modulo the curve's field size (2^256 - 0x1000003D1).
- Scalar operations
- Optimized implementation without data-dependent branches of arithmetic modulo the curve's order.
- Using 4 64-bit limbs (relying on __int128 support in the compiler).
- Using 8 32-bit limbs.
- Optimized implementation without data-dependent branches of arithmetic modulo the curve's order.
- Modular inverses (both field elements and scalars) based on safegcd with some modifications, and a variable-time variant (by Peter Dettman).
- Group operations
- Point addition formula specifically simplified for the curve equation (y^2 = x^3 + 7).
- Use addition between points in Jacobian and affine coordinates where possible.
- Use a unified addition/doubling formula where necessary to avoid data-dependent branches.
- Point/x comparison without a field inversion by comparison in the Jacobian coordinate space.
- Point multiplication for verification (aP + bG).
- Use wNAF notation for point multiplicands.
- Use a much larger window for multiples of G, using precomputed multiples.
- Use Shamir's trick to do the multiplication with the public key and the generator simultaneously.
- Use secp256k1's efficiently-computable endomorphism to split the P multiplicand into 2 half-sized ones.
- Point multiplication for signing
- Use a precomputed table of multiples of powers of 16 multiplied with the generator, so general multiplication becomes a series of additions.
- Intended to be completely free of timing sidechannels for secret-key operations (on reasonable hardware/toolchains)
- Access the table with branch-free conditional moves so memory access is uniform.
- No data-dependent branches
- Optional runtime blinding which attempts to frustrate differential power analysis.
- The precomputed tables add and eventually subtract points for which no known scalar (secret key) is known, preventing even an attacker with control over the secret key used to control the data internally.
libsecp256k1 can be built using autotools:
./autogen.sh
mkdir build
cd build
../configure
make
make check
sudo make install # optionalOr using CMake:
mkdir build
cd build
cmake -GNinja ..
ninja
ninja check-secp256k1
sudo ninja install # optional$ ./exhaustive_tests
With valgrind, you might need to increase the max stack size:
$ valgrind --max-stackframe=2500000 ./exhaustive_tests
This library aims to have full coverage of the reachable lines and branches.
To create a test coverage report with autotools:
Configure with --enable-coverage (use of GCC is necessary):
$ ./configure --enable-coverage
Run the tests:
$ make check
To create a report, gcovr is recommended, as it includes branch coverage reporting:
$ gcovr --exclude 'src/bench*' --print-summary
To create a HTML report with coloured and annotated source code:
$ gcovr --exclude 'src/bench*' --html --html-details -o coverage.html
To create a test coverage report with CMake:
Make sure you installed the dependencies first, and they are in your PATH:
c++filt, gcov, genhtml, lcov and python3.
Then run the build, tests and generate the coverage report with:
mkdir coverage
cd coverage
cmake -GNinja .. \
-DCMAKE_C_COMPILER=gcc \
-DSECP256K1_ENABLE_COVERAGE=ON \
-DSECP256K1_ENABLE_BRANCH_COVERAGE=ON # optional
ninja coverage-check-secp256k1The coverage report will be available by opening the file
check-secp256k1.coverage/index.html with a web browser.
See SECURITY.md