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https://github.com/bitcoinbook/bitcoinbook
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579 lines
24 KiB
Plaintext
RECENT CHANGES:
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* (16 Apr 2013) Added private derivation for i ≥ 0x80000000 (less risk
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of parent private key leakage)
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* (30 Apr 2013) Switched from multiplication by I~L~ to addition of I~L~
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(faster, easier implementation)
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* (25 May 2013) Added test vectors
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* (15 Jan 2014) Rename keys with index ≥ 0x8000000 to hardened keys, and
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add explicit conversion functions.
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-------------------------------------------
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BIP: 32
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Title: Hierarchical Deterministic Wallets
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Author: Pieter Wuille
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Status: Accepted
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Type: Informational
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Created: 2012-02-11
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-------------------------------------------
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[[abstract]]
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Abstract
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~~~~~~~~
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This document describes hierarchical determinstic wallets (or "HD
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Wallets"): wallets which can be shared partially or entirely with
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different systems, each with or without the ability to spend coins.
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The specification is intended to set a standard for deterministic
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wallets that can be interchanged between different clients. Although the
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wallets described here have many features, not all are required by
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supporting clients.
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The specification consists of two parts. In a first part, a system for
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deriving a tree of keypairs from a single seed is presented. The second
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part demonstrates how to build a wallet structure on top of such a tree.
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[[motivation]]
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Motivation
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~~~~~~~~~~
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The Bitcoin reference client uses randomly generated keys. In order to
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avoid the necessity for a backup after every transaction, (by default)
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100 keys are cached in a pool of reserve keys. Still, these wallets are
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not intended to be shared and used on several systems simultaneously.
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They support hiding their private keys by using the wallet encrypt
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feature and not sharing the password, but such "neutered" wallets lose
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the power to generate public keys as well.
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Deterministic wallets do not require such frequent backups, and elliptic
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curve mathematics permit schemes where one can calculate the public keys
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without revealing the private keys. This permits for example a webshop
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business to let its webserver generate fresh addresses (public key
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hashes) for each order or for each customer, without giving the
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webserver access to the corresponding private keys (which are required
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for spending the received funds).
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However, deterministic wallets typically consist of a single "chain" of
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keypairs. The fact that there is only one chain means that sharing a
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wallet happens on an all-or-nothing basis. However, in some cases one
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only wants some (public) keys to be shared and recoverable. In the
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example of a webshop, the webserver does not need access to all public
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keys of the merchant's wallet; only to those addresses which are used to
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receive customer's payments, and not for example the change addresses
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that are generated when the merchant spends money. Hierarchical
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deterministic wallets allow such selective sharing by supporting
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multiple keypair chains, derived from a single root.
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[[specification-key-derivation]]
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Specification: Key derivation
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~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
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[[conventions]]
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Conventions
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^^^^^^^^^^^
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In the rest of this text we will assume the public key cryptography used
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in Bitcoin, namely elliptic curve cryptography using the field and curve
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parameters defined by secp256k1
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(http://www.secg.org/index.php?action=secg,docs_secg). Variables below
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are either:
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* Integers modulo the order of the curve (referred to as n).
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* Coordinates of points on the curve.
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* Byte sequences.
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Addition (+) of two coordinate pair is defined as application of the EC
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group operation. Concatenation (||) is the operation of appending one
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byte sequence onto another.
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As standard conversion functions, we assume:
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* point(p): returns the coordinate pair resulting from EC point
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multiplication (repeated application of the EC group operation) of the
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secp256k1 base point with the integer p.
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* ser~32~(i): serialize a 32-bit unsigned integer i as a 4-byte
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sequence, most significant byte first.
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* ser~256~(p): serializes the integer p as a 32-byte sequence, most
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significant byte first.
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* ser~P~(P): serializes the coordinate pair P = (x,y) as a byte sequence
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using SEC1's compressed form: (0x02 or 0x03) || ser~256~(x), where the
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header byte depends on the parity of the omitted y coordinate.
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* parse~256~(p): interprets a 32-byte sequence as a 256-bit number, most
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significant byte first.
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[[extended-keys]]
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Extended keys
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^^^^^^^^^^^^^
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In what follows, we will define a function that derives a number of
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child keys from a parent key. In order to prevent these from depending
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solely on the key itself, we extend both private and public keys first
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with an extra 256 bits of entropy. This extension, called the chain
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code, is identical for corresponding private and public keys, and
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consists of 32 bytes.
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We represent an extended private key as (k, c), with k the normal
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private key, and c the chain code. An extended public key is represented
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as (K, c), with K = point(k) and c the chain code.
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Each extended key has 2^31^ normal child keys, and 2^31^ hardened child
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keys. Each of these child keys has an index. The normal child keys use
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indices 0 through 2^31^-1. The hardened child keys use indices 2^31^
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through 2^32^-1. To ease notation for hardened key indices, a number
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i~H~ represents i+2^31^.
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[[child-key-derivation-ckd-functions]]
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Child key derivation (CKD) functions
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^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^
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Given a parent extended key and an index i, it is possible to compute
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the corresponding child extended key. The algorithm to do so depends on
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whether the child is a hardened key or not (or, equivalently, whether i
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≥ 2^31^), and whether we're talking about private or public keys.
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[[private-parent-key-private-child-key]]
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Private parent key → private child key
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++++++++++++++++++++++++++++++++++++++
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The function CKDpriv((k~par~, c~par~), i) → (k~i~, c~i~) computes a
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child extended private key from the parent extended private key:
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* Check whether i ≥ 2^31^ (whether the child is a hardened key).
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** If so (hardened child): let I = HMAC-SHA512(Key = c~par~, Data = 0x00
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|| ser~256~(k~par~) || ser~32~(i)). (Note: The 0x00 pads the private key
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to make it 33 bytes long.)
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** If not (normal child): let I = HMAC-SHA512(Key = c~par~, Data =
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ser~P~(point(k~par~)) || ser~32~(i)).
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* Split I into two 32-byte sequences, I~L~ and I~R~.
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* The returned child key k~i~ is parse~256~(I~L~) + k~par~ (mod n).
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* The returned chain code c~i~ is I~R~.
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* In case parse~256~(I~L~) ≥ n or k~i~ = 0, the resulting key is
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invalid, and one should proceed with the next value for i. (Note: this
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has probability lower than 1 in 2^127^.)
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The HMAC-SHA512 function is specified in
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http://tools.ietf.org/html/rfc4231[RFC 4231].
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[[public-parent-key-public-child-key]]
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Public parent key → public child key
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++++++++++++++++++++++++++++++++++++
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The function CKDpub((K~par~, c~par~), i) → (K~i~, c~i~) computes a child
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extended public key from the parent extended public key. It is only
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defined for non-hardened child keys.
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* Check whether i ≥ 2^31^ (whether the child is a hardened key).
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** If so (hardened child): return failure
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** If not (normal child): let I = HMAC-SHA512(Key = c~par~, Data =
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ser~P~(K~par~) || ser~32~(i)).
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* Split I into two 32-byte sequences, I~L~ and I~R~.
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* The returned child key K~i~ is point(parse~256~(I~L~)) + K~par~.
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* The returned chain code c~i~ is I~R~.
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* In case parse~256~(I~L~) ≥ n or K~i~ is the point at infinity, the
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resulting key is invalid, and one should proceed with the next value for
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i.
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[[private-parent-key-public-child-key]]
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Private parent key → public child key
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+++++++++++++++++++++++++++++++++++++
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The function N((k, c)) → (K, c) computes the extended public key
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corresponding to an extended private key (the "neutered" version, as it
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removes the ability to sign transactions).
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* The returned key K is point(k).
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* The returned chain code c is just the passed chain code.
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To compute the public child key of a parent private key:
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* N(CKDpriv((k~par~, c~par~), i)) (works always).
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* CKDpub(N(k~par~, c~par~), i) (works only for non-hardened child keys).
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The fact that they are equivalent is what makes non-hardened keys useful
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(one can derive child public keys of a given parent key without knowing
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any private key), and also what distinguishes them from hardened keys.
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The reason for not always using non-hardened keys (which are more
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useful) is security; see further for more information.
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[[public-parent-key-private-child-key]]
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Public parent key → private child key
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+++++++++++++++++++++++++++++++++++++
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This is not possible.
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[[the-key-tree]]
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The key tree
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^^^^^^^^^^^^
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The next step is cascading several CKD constructions to build a tree. We
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start with one root, the master extended key m. By evaluating
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CKDpriv(m,i) for several values of i, we get a number of level-1 derived
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nodes. As each of these is again an extended key, CKDpriv can be applied
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to those as well.
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To shorten notation, we will write CKDpriv(CKDpriv(CKDpriv(m,3~H~),2),5)
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as m/3~H~/2/5. Equivalently for public keys, we write
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CKDpub(CKDpub(CKDpub(M,3),2,5) as M/3/2/5. This results in the following
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identities:
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* N(m/a/b/c) = N(m/a/b)/c = N(m/a)/b/c = N(m)/a/b/c = M/a/b/c.
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* N(m/a~H~/b/c) = N(m/a~H~/b)/c = N(m/a~H~)/b/c.
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However, N(m/a~H~) cannot be rewritten as N(m)/a~H~, as the latter is
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not possible.
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Each leaf node in the tree corresponds to an actual key, while the
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internal nodes correspond to the collections of keys that descend from
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them. The chain codes of the leaf nodes are ignored, and only their
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embedded private or public key is relevant. Because of this
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construction, knowing an extended private key allows reconstruction of
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all descendant private keys and public keys, and knowing an extended
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public keys allows reconstruction of all descendant non-hardened public
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keys.
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[[key-identifiers]]
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Key identifiers
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^^^^^^^^^^^^^^^
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Extended keys can be identified by the Hash160 (RIPEMD160 after SHA256)
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of the serialized public key, ignoring the chain code. This corresponds
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exactly to the data used in traditional Bitcoin addresses. It is not
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advised to represent this data in base58 format though, as it may be
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interpreted as an address that way (and wallet software is not required
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to accept payment to the chain key itself).
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The first 32 bits of the identifier are called the key fingerprint.
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[[serialization-format]]
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Serialization format
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^^^^^^^^^^^^^^^^^^^^
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Extended public and private keys are serialized as follows:
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* 4 byte: version bytes (mainnet: 0x0488B21E public, 0x0488ADE4 private;
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testnet: 0x043587CF public, 0x04358394 private)
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* 1 byte: depth: 0x00 for master nodes, 0x01 for level-1 derived keys,
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....
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* 4 bytes: the fingerprint of the parent's key (0x00000000 if master
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key)
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* 4 bytes: child number. This is ser~32~(i) for i in x~i~ = x~par~/i,
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with x~i~ the key being serialized. (0x00000000 if master key)
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* 32 bytes: the chain code
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* 33 bytes: the public key or private key data (ser~P~(K) for public
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keys, 0x00 || ser~256~(k) for private keys)
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This 78 byte structure can be encoded like other Bitcoin data in Base58,
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by first adding 32 checksum bits (derived from the double SHA-256
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checksum), and then converting to the Base58 representation. This
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results in a Base58-encoded string of up to 112 characters. Because of
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the choice of the version bytes, the Base58 representation will start
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with "xprv" or "xpub" on mainnet, "tprv" or "tpub" on testnet.
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Note that the fingerprint of the parent only serves as a fast way to
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detect parent and child nodes in software, and software must be willing
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to deal with collisions. Internally, the full 160-bit identifier could
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be used.
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When importing a serialized extended public key, implementations must
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verify whether the X coordinate in the public key data corresponds to a
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point on the curve. If not, the extended public key is invalid.
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[[master-key-generation]]
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Master key generation
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^^^^^^^^^^^^^^^^^^^^^
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The total number of possible extended keypairs is almost 2^512^, but the
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produced keys are only 256 bits long, and offer about half of that in
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terms of security. Therefore, master keys are not generated directly,
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but instead from a potentially short seed value.
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* Generate a seed byte sequence S of a chosen length (between 128 and
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512 bits; 256 bits is advised) from a (P)RNG.
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* Calculate I = HMAC-SHA512(Key = "Bitcoin seed", Data = S)
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* Split I into two 32-byte sequences, I~L~ and I~R~.
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* Use parse~256~(I~L~) as master secret key, and I~R~ as master chain
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code.
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In case I~L~ is 0 or ≥n, the master key is invalid.
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[[specification-wallet-structure]]
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Specification: Wallet structure
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~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
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The previous sections specified key trees and their nodes. The next step
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is imposing a wallet structure on this tree. The layout defined in this
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section is a default only, though clients are encouraged to mimick it
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for compatibility, even if not all features are supported.
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[[the-default-wallet-layout]]
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The default wallet layout
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^^^^^^^^^^^^^^^^^^^^^^^^^
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An HDW is organized as several 'accounts'. Accounts are numbered, the
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default account ("") being number 0. Clients are not required to support
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more than one account - if not, they only use the default account.
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Each account is composed of two keypair chains: an internal and an
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external one. The external keychain is used to generate new public
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addresses, while the internal keychain is used for all other operations
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(change addresses, generation addresses, ..., anything that doesn't need
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to be communicated). Clients that do not support separate keychains for
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these should use the external one for everything.
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* m/i~H~/0/k corresponds to the k'th keypair of the external chain of
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account number i of the HDW derived from master m.
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* m/i~H~/1/k corresponds to the k'th keypair of the internal chain of
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account number i of the HDW derived from master m.
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[[use-cases]]
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Use cases
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^^^^^^^^^
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[[full-wallet-sharing-m]]
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Full wallet sharing: m
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++++++++++++++++++++++
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In cases where two systems need to access a single shared wallet, and
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both need to be able to perform spendings, one needs to share the master
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private extended key. Nodes can keep a pool of N look-ahead keys cached
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for external chains, to watch for incoming payments. The look-ahead for
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internal chains can be very small, as no gaps are to be expected here.
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An extra look-ahead could be active for the first unused account's
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chains - triggering the creation of a new account when used. Note that
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the name of the account will still need to be entered manually and
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cannot be synchronized via the block chain.
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[[audits-nm]]
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Audits: N(m/*)
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++++++++++++++
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In case an auditor needs full access to the list of incoming and
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outgoing payments, one can share all account public extended keys. This
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will allow the auditor to see all transactions from and to the wallet,
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in all accounts, but not a single secret key.
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[[per-office-balances-mih]]
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Per-office balances: m/i~H~
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+++++++++++++++++++++++++++
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When a business has several independent offices, they can all use
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wallets derived from a single master. This will allow the headquarters
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to maintain a super-wallet that sees all incoming and outgoing
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transactions of all offices, and even permit moving money between the
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offices.
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[[recurrent-business-to-business-transactions-nmih0]]
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Recurrent business-to-business transactions: N(m/i~H~/0)
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++++++++++++++++++++++++++++++++++++++++++++++++++++++++
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In case two business partners often transfer money, one can use the
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extended public key for the external chain of a specific account (M/i
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h/0) as a sort of "super address", allowing frequent transactions that
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cannot (easily) be associated, but without needing to request a new
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address for each payment. Such a mechanism could also be used by mining
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pool operators as variable payout address.
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[[unsecure-money-receiver-nmih0]]
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Unsecure money receiver: N(m/i~H~/0)
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++++++++++++++++++++++++++++++++++++
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When an unsecure webserver is used to run an e-commerce site, it needs
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to know public addresses that are used to receive payments. The
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webserver only needs to know the public extended key of the external
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chain of a single account. This means someone illegally obtaining access
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to the webserver can at most see all incoming payments, but will not
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(trivially) be able to distinguish outgoing transactions, nor see
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payments received by other webservers if there are several ones.
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[[compatibility]]
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Compatibility
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~~~~~~~~~~~~~
|
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To comply with this standard, a client must at least be able to import
|
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an extended public or private key, to give access to its direct
|
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descendants as wallet keys. The wallet structure
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(master/account/chain/subchain) presented in the second part of the
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specification is advisory only, but is suggested as a minimal structure
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for easy compatibility - even when no separate accounts or distinction
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between internal and external chains is made. However, implementations
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may deviate from it for specific needs; more complex applications may
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call for a more complex tree structure.
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[[security]]
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Security
|
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~~~~~~~~
|
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In addition to the expectations from the EC public-key cryptography
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itself:
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* Given a public key K, an attacker cannot find the corresponding
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private key more efficiently than by solving the EC discrete logarithm
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problem (assumed to require 2^128^ group operations).
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the intended security properties of this standard are:
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* Given a child extended private key (k~i~,c~i~) and the integer i, an
|
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attacker cannot find the parent private key k~par~ more efficiently than
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a 2^256^ brute force of HMAC-SHA512.
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* Given any number (2 ≤ N ≤ 2^32^-1) of (index, extended private key)
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tuples (i~j~,(k~i~j~~,c~i~j~~)), with distinct i~j~'s, determining
|
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whether they are derived from a common parent extended private key
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(i.e., whether there exists a (k~par~,c~par~) such that for each j in
|
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(0..N-1) CKDpriv((k~par~,c~par~),i~j~)=(k~i~j~~,c~i~j~~)), cannot be
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done more efficiently than a 2^256^ brute force of HMAC-SHA512.
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Note however that the following properties does not exist:
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* Given a parent extended public key (K~par~,c~par~) and a child public
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key (K~i~), it is hard to find i.
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* Given a parent extended public key (K~par~,c~par~) and a non-hardened
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child private key (k~i~), it is hard to find k~par~.
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[[implications]]
|
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Implications
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|
^^^^^^^^^^^^
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Private and public keys must be kept safe as usual. Leaking a private
|
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key means access to coins - leaking a public key can mean loss of
|
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privacy.
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Somewhat more care must be taken regarding extended keys, as these
|
|
correspond to an entire (sub)tree of keys.
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|
|
One weakness that may not be immediately obvious, is that knowledge of
|
|
the extended public key + any non-hardened private key descending from
|
|
it is equivalent to knowing the extended private key (and thus every
|
|
private and public key descending from it). This means that extended
|
|
public keys must be treated more carefully than regular public keys. It
|
|
is also the reason for the existence of hardened keys, and why they are
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|
used for the account level in the tree. This way, a leak of
|
|
account-specific (or below) private key never risks compromising the
|
|
master or other accounts.
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[[test-vectors]]
|
|
Test Vectors
|
|
~~~~~~~~~~~~
|
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[[test-vector-1]]
|
|
Test vector 1
|
|
^^^^^^^^^^^^^
|
|
|
|
Master (hex): 000102030405060708090a0b0c0d0e0f
|
|
|
|
* Chain m
|
|
** ext pub:
|
|
xpub661MyMwAqRbcFtXgS5sYJABqqG9YLmC4Q1Rdap9gSE8NqtwybGhePY2gZ29ESFjqJoCu1Rupje8YtGqsefD265TMg7usUDFdp6W1EGMcet8
|
|
** ext prv:
|
|
xprv9s21ZrQH143K3QTDL4LXw2F7HEK3wJUD2nW2nRk4stbPy6cq3jPPqjiChkVvvNKmPGJxWUtg6LnF5kejMRNNU3TGtRBeJgk33yuGBxrMPHi
|
|
* Chain m/0~H~
|
|
** ext pub:
|
|
xpub68Gmy5EdvgibQVfPdqkBBCHxA5htiqg55crXYuXoQRKfDBFA1WEjWgP6LHhwBZeNK1VTsfTFUHCdrfp1bgwQ9xv5ski8PX9rL2dZXvgGDnw
|
|
** ext prv:
|
|
xprv9uHRZZhk6KAJC1avXpDAp4MDc3sQKNxDiPvvkX8Br5ngLNv1TxvUxt4cV1rGL5hj6KCesnDYUhd7oWgT11eZG7XnxHrnYeSvkzY7d2bhkJ7
|
|
* Chain m/0~H~/1
|
|
** ext pub:
|
|
xpub6ASuArnXKPbfEwhqN6e3mwBcDTgzisQN1wXN9BJcM47sSikHjJf3UFHKkNAWbWMiGj7Wf5uMash7SyYq527Hqck2AxYysAA7xmALppuCkwQ
|
|
** ext prv:
|
|
xprv9wTYmMFdV23N2TdNG573QoEsfRrWKQgWeibmLntzniatZvR9BmLnvSxqu53Kw1UmYPxLgboyZQaXwTCg8MSY3H2EU4pWcQDnRnrVA1xe8fs
|
|
* Chain m/0~H~/1/2~H~
|
|
** ext pub:
|
|
xpub6D4BDPcP2GT577Vvch3R8wDkScZWzQzMMUm3PWbmWvVJrZwQY4VUNgqFJPMM3No2dFDFGTsxxpG5uJh7n7epu4trkrX7x7DogT5Uv6fcLW5
|
|
** ext prv:
|
|
xprv9z4pot5VBttmtdRTWfWQmoH1taj2axGVzFqSb8C9xaxKymcFzXBDptWmT7FwuEzG3ryjH4ktypQSAewRiNMjANTtpgP4mLTj34bhnZX7UiM
|
|
* Chain m/0~H~/1/2~H~/2
|
|
** ext pub:
|
|
xpub6FHa3pjLCk84BayeJxFW2SP4XRrFd1JYnxeLeU8EqN3vDfZmbqBqaGJAyiLjTAwm6ZLRQUMv1ZACTj37sR62cfN7fe5JnJ7dh8zL4fiyLHV
|
|
** ext prv:
|
|
xprvA2JDeKCSNNZky6uBCviVfJSKyQ1mDYahRjijr5idH2WwLsEd4Hsb2Tyh8RfQMuPh7f7RtyzTtdrbdqqsunu5Mm3wDvUAKRHSC34sJ7in334
|
|
* Chain m/0~H~/1/2~H~/2/1000000000
|
|
** ext pub:
|
|
xpub6H1LXWLaKsWFhvm6RVpEL9P4KfRZSW7abD2ttkWP3SSQvnyA8FSVqNTEcYFgJS2UaFcxupHiYkro49S8yGasTvXEYBVPamhGW6cFJodrTHy
|
|
** ext prv:
|
|
xprvA41z7zogVVwxVSgdKUHDy1SKmdb533PjDz7J6N6mV6uS3ze1ai8FHa8kmHScGpWmj4WggLyQjgPie1rFSruoUihUZREPSL39UNdE3BBDu76
|
|
|
|
[[test-vector-2]]
|
|
Test vector 2
|
|
^^^^^^^^^^^^^
|
|
|
|
Master (hex):
|
|
fffcf9f6f3f0edeae7e4e1dedbd8d5d2cfccc9c6c3c0bdbab7b4b1aeaba8a5a29f9c999693908d8a8784817e7b7875726f6c696663605d5a5754514e4b484542
|
|
|
|
* Chain m
|
|
** ext pub:
|
|
xpub661MyMwAqRbcFW31YEwpkMuc5THy2PSt5bDMsktWQcFF8syAmRUapSCGu8ED9W6oDMSgv6Zz8idoc4a6mr8BDzTJY47LJhkJ8UB7WEGuduB
|
|
** ext prv:
|
|
xprv9s21ZrQH143K31xYSDQpPDxsXRTUcvj2iNHm5NUtrGiGG5e2DtALGdso3pGz6ssrdK4PFmM8NSpSBHNqPqm55Qn3LqFtT2emdEXVYsCzC2U
|
|
* Chain m/0
|
|
** ext pub:
|
|
xpub69H7F5d8KSRgmmdJg2KhpAK8SR3DjMwAdkxj3ZuxV27CprR9LgpeyGmXUbC6wb7ERfvrnKZjXoUmmDznezpbZb7ap6r1D3tgFxHmwMkQTPH
|
|
** ext prv:
|
|
xprv9vHkqa6EV4sPZHYqZznhT2NPtPCjKuDKGY38FBWLvgaDx45zo9WQRUT3dKYnjwih2yJD9mkrocEZXo1ex8G81dwSM1fwqWpWkeS3v86pgKt
|
|
* Chain m/0/2147483647~H~
|
|
** ext pub:
|
|
xpub6ASAVgeehLbnwdqV6UKMHVzgqAG8Gr6riv3Fxxpj8ksbH9ebxaEyBLZ85ySDhKiLDBrQSARLq1uNRts8RuJiHjaDMBU4Zn9h8LZNnBC5y4a
|
|
** ext prv:
|
|
xprv9wSp6B7kry3Vj9m1zSnLvN3xH8RdsPP1Mh7fAaR7aRLcQMKTR2vidYEeEg2mUCTAwCd6vnxVrcjfy2kRgVsFawNzmjuHc2YmYRmagcEPdU9
|
|
* Chain m/0/2147483647~H~/1
|
|
** ext pub:
|
|
xpub6DF8uhdarytz3FWdA8TvFSvvAh8dP3283MY7p2V4SeE2wyWmG5mg5EwVvmdMVCQcoNJxGoWaU9DCWh89LojfZ537wTfunKau47EL2dhHKon
|
|
** ext prv:
|
|
xprv9zFnWC6h2cLgpmSA46vutJzBcfJ8yaJGg8cX1e5StJh45BBciYTRXSd25UEPVuesF9yog62tGAQtHjXajPPdbRCHuWS6T8XA2ECKADdw4Ef
|
|
* Chain m/0/2147483647~H~/1/2147483646~H~
|
|
** ext pub:
|
|
xpub6ERApfZwUNrhLCkDtcHTcxd75RbzS1ed54G1LkBUHQVHQKqhMkhgbmJbZRkrgZw4koxb5JaHWkY4ALHY2grBGRjaDMzQLcgJvLJuZZvRcEL
|
|
** ext prv:
|
|
xprvA1RpRA33e1JQ7ifknakTFpgNXPmW2YvmhqLQYMmrj4xJXXWYpDPS3xz7iAxn8L39njGVyuoseXzU6rcxFLJ8HFsTjSyQbLYnMpCqE2VbFWc
|
|
* Chain m/0/2147483647~H~/1/2147483646~H~/2
|
|
** ext pub:
|
|
xpub6FnCn6nSzZAw5Tw7cgR9bi15UV96gLZhjDstkXXxvCLsUXBGXPdSnLFbdpq8p9HmGsApME5hQTZ3emM2rnY5agb9rXpVGyy3bdW6EEgAtqt
|
|
** ext prv:
|
|
xprvA2nrNbFZABcdryreWet9Ea4LvTJcGsqrMzxHx98MMrotbir7yrKCEXw7nadnHM8Dq38EGfSh6dqA9QWTyefMLEcBYJUuekgW4BYPJcr9E7j
|
|
|
|
[[implementations]]
|
|
Implementations
|
|
~~~~~~~~~~~~~~~
|
|
|
|
Two Python implementations exist:
|
|
|
|
PyCoin (https://github.com/richardkiss/pycoin) is a suite of utilities
|
|
for dealing with Bitcoin that includes BIP0032 wallet features.
|
|
BIP32Utils (https://github.com/jmcorgan/bip32utils) is a library and
|
|
command line interface specifically focused on BIP0032 wallets and
|
|
scripting.
|
|
|
|
A Java implementation is available at
|
|
https://github.com/bitsofproof/supernode/blob/1.1/api/src/main/java/com/bitsofproof/supernode/api/ExtendedKey.java
|
|
|
|
A C++ implementation is available at
|
|
https://github.com/CodeShark/CoinClasses/tree/master/tests/hdwallets
|
|
|
|
An Objective-C implementation is available at
|
|
https://github.com/oleganza/CoreBitcoin/blob/master/CoreBitcoin/BTCKeychain.h
|
|
|
|
A Ruby implementation is available at https://github.com/wink/money-tree
|
|
|
|
A Go implementation is available at
|
|
https://github.com/WeMeetAgain/go-hdwallet
|
|
|
|
A JavaScript implementation is available at
|
|
https://github.com/sarchar/brainwallet.github.com/tree/bip32
|
|
|
|
A PHP implemetation is available at
|
|
https://github.com/Bit-Wasp/bitcoin-lib-php
|
|
|
|
A C# implementation is available at
|
|
https://github.com/NicolasDorier/NBitcoin (ExtKey, ExtPubKey)
|
|
|
|
[[acknowledgements]]
|
|
Acknowledgements
|
|
~~~~~~~~~~~~~~~~
|
|
|
|
* Gregory Maxwell for the original idea of type-2 deterministic wallets,
|
|
and many discussions about it.
|
|
* Alan Reiner for the implementation of this scheme in Armory, and the
|
|
suggestions that followed from that.
|
|
* Mike Caldwell for the version bytes to obtain human-recognizable
|
|
Base58 strings.
|
|
|