libhal ====== ## Overview ## This library combines a set of low-level API functions which talk to the Cryptech FPGA cores with a set of higher-level functions providing various cryptographic services. There's some overlap between the low-level code here and the low-level code in core/platform/novena, which will need sorting out some day, but at the time this library forked that code, the core/platform/novena code was all written to support a test harness rather than a higher-level API. Current contents of the library: * Low-level I/O code (FMC, EIM, and I2C). * An implementation of AES Key Wrap using the Cryptech AES core. * An interface to the Cryptech CSPRNG. * An interface to the Cryptech hash cores, including HMAC. * An implementation of PBKDF2. * An implementation of RSA, optionally using the Cryptech ModExp core. * An implementation of ECDSA, optionally using the Cryptech ECDSA base point multiplier cores. * An interface to the Master Key Memory interface core on the Cryptech Alpha platform. * A simple keystore implementation with drivers for RAM and flash storage on the Cryptech Alpha platform. * A remote procedure call (RPC) interface. * (Just enough) ASN.1 code to support a uniform interface to public (SubjectPublicKeyInformation (SPKI)) and private (PKCS #8) keys. * A simple key backup mechanism, including a Python script to drive it from the client side. * An RPC multiplexer to allow multiple clients (indepedent processes) to talk to the Cryptech Alpha at once. * Client implenetations of the RPC mechanism in both C and Python. * Test code for all of the above. Most of these are fairly well self-contained, although the PBKDF2 implementation uses the hash-core-based HMAC implementation with fallback to a software implementation if the cores aren't available. The major exceptions are the RSA and ECDSA implementations, which uses an external bignum implementation (libtfm) to handle a lot of the arithmetic. In the long run, much or all of this may end up being implemented in Verilog, but for the moment all of the RSA math except for modular exponentiation is happening in software, as is all of the math for ECDSA verification; ECDSA math for key generation and signing on the P-256 and P-384 curves is done in the ECDSA base point multiplier cores when those are available. ## RSA ## The RSA implementation includes a compile-time option to bypass the ModExp core and do everything in software, because the ModExp core is a tad slow at the moment (others are hard at work fixing this). The RSA implementation includes optional blinding (enabled by default). ## ECDSA ## The ECDSA implementation is specific to the NIST prime curves P-256, P-384, and P-521. The ECDSA implementation includes a compile-time option to allow test code to bypass the CSPRNG in order to test against known test vectors. Do **NOT** enable this in production builds, as ECDSA depends on good random numbers not just for private keys but for individual signatures, and an attacker who knows the random number used for a particular signature can use this to recover the private key. Arguably, this option should be removed from the code entirely. The ECDSA software implementation attempts to be constant-time, to reduce the risk of timing channel attacks. The algorithms chosen for the point arithmetic are a tradeoff between speed and code complexity, and can probably be improved upon even in software; reimplementing at least the field arithmetic in hardware would probably also help. Signing and key generation performance is significantly better when the ECDSA base point multiplier cores are available. The point addition and point doubling algorithms in the current ECDSA software implementation come from the [EFD][]. At least at the moment, we're only interested in ECDSA with the NIST prime curves, so we use algorithms optimized for a=-3. The point multiplication algorithm is a straightforward double-and-add loop, which is not the fastest possible algorithm, but is relatively easy to confirm by inspection as being constant-time within the limits imposed by the NIST curves. Point multiplication could probably be made faster by using a non-adjacent form (NAF) representation for the scalar, but the author doesn't understand that well enough to implement it as a constant-time algorithm. In theory, changing to a NAF representation could be done without any change to the public API. Points stored in keys and curve parameters are in affine format, but point arithmetic is performed in Jacobian projective coordinates, with the coordinates themselves in Montgomery form; final mapping back to affine coordinates also handles the final Montgomery reduction. ## Keystore ## The keystore is basically a light-weight database intended to be run directly over some kind of block-access device, with an internal low-level driver interface so that we can use the same API for multiple keystore devices (eg, flash for "token objects" and RAM for "session objects", in the PKCS #11 senses of those terms). The available storage is divided up into "blocks" of a fixed size; for simplicity, the block size is a multiple of the subsector size of the flash chip on the Alpha platform, since that's the minimum erasable unit. All state stored in the keystore itself follows the conventions needed for flash devices, whether the device in question is flash or not. The basic rule here is that one can only clear bits, never set them: the only way to set a bit is to erase the whole block and start over. So blocks progress from an initial state ("erased") where all bits are set to one, through several states where the block contains useful data, and ending in a state where all bits are set to zero ("zeroed"), because that's the way that flash hardware works. The keystore implementation also applies a light-weight form of wear leveling to all keystore devices, whether they're flash devices or not. The wear-leveling mechanism is not particularly sophisticated, but should suffice. The wear-leveling code treats the entirety of a particular keystore device as a ring buffer of blocks, and keeps track of which blocks have been used recently by zeroing blocks upon freeing them rather than erasing them immediately, while also always keeping the block at the current head of the free list in the erased state. Taken together, this is enough to recover location of the block at the head of the free list after a reboot, which is sufficient for a round-robin wear leveling strategy. The block format includes a field for a CRC-32 checksum, which covers the entire block except for a few specific fields which need to be left out. On reboot, blocks with bad CRC-32 values are considered candidates for reuse, but are placed at the end of the free list, preserve their contents for as long as possible in case the real problem is a buggy firmware update. At the moment, the decision about whether to use the CRC-32 mechanism is up to the individual driver: the flash driver uses it, the RAM driver (which never stores anything across reboots anyway) does not. Since the flash-like semantics do not allow setting bits, updates to a block always consist of allocating a new block and copying the modified data. The keystore code uses a trivial lock-step protocol for this: first: 1. The old block is marked as a "tombstone"; 2. The new block (with modified data) is written; 3. The old block is erased. This protocol is deliberately as simple as possible, so that there is always a simple recovery path on reboot. Active blocks within a keystore are named by UUIDs. With one exception, these are always type-4 (random) UUIDs, generated directly from output of the TRNG. The one exception is the current PIN block, which always uses the reserved all-zeros UUID, which cannot possibly conflict with a type-4 UUID (by definition). The core of the keystore mechanism is the `ks->index[]` array, which contains nothing but a list of block numbers. This array is divided into two parts: the first part is the index of active blocks, which is kept sorted (by UUID); the second part is the round-robin free list. Everything else in the keystore is indexed by these block numbers, which means that the index array is the only data structure which the keystore code needs to sort or rotate when adding, removing, or updating a block. Because the block numbers themselves are small integers, the index array itself is small enough that shuffling data within it using `memmove()` is a relatively cheap operation, which in turn avoids a lot of complexity that would be involved in managing more sophisticated data structures. The keystore code includes both caching of recently used keystore blocks (to avoid unnecessary flash reads) and caching of the location of the block corresponding to a particular UUID (to avoid unnecessary index searches). Aside from whatever direct performance benefits this might bring, this also frees the pkey layer that sits directly on top of the keystore code from needing to keep a lot of active state on particular keystore objects, which is important given that this whole thing sits under an RPC protocol driven by a client program which can impose arbitrary delays between any two operations at the pkey layer. ## Key backup ## The key backup mechanism is a straightforward three-step process, mediated by a Python script which uses the Python client implementation of the RPC mechanism. Steps: 1. Destination HSM (target of key transfer) generates an RSA keypair, exports the public key (the "key encryption key encryption key" or "KEKEK"). 2. Source HSM (origin of the key transfer) wraps keys to be backed up using AES keywrap with key encryption keys (KEKs) generated by the TRNG; these key encryption keys are in turn encrypted with RSA public key (KEKEK) generated by the receipient HSM. 3. Destination HSM receives wrapped keys, unwraps the KEKs using the KEKEK then unwraps the wrapped private keys. Transfer of the wrapped keys between the two HSMs can be by any convenient mechanism; for simplicity, `cryptech_backup` script bundles everything up in a text file using JSON and Base64 encoding. ## Multiplexer daemon ## While the C client library can be built to talk directly to the Cryptech Alpha board, in most cases it is more convenient to use the `cryptech_muxd` multiplexer daemon, which is now the default. Client code talks to `cryptech_muxd` via a `PF_UNIX` socket; `cryptech_muxd` handles interleaving of messages between multiple clients, and also manages access to the Alpha's console port. The multiplexer requires two external Python libraries, Tornado (version 4.0 or later) and PySerial (version 3.0 or later). In the long run, the RPC mechanism will need to be wrapped in some kind of secure channel protocol, but we're not there yet. ## API ## Yeah, we ought to document the API, Real Soon Now, perhaps using [Doxygen][]. For the moment, see the function prototypes in hal.h, the Python definitions in cryptech.libhal, and and comments in the code. [EFD]: http://www.hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-3.html [Doxygen]: http://www.doxygen.org/