An optimized sparse merkle tree.
| size | proof size | update | get | merkle proof | verify proof |
|---|---|---|---|---|---|
| 2n + log(n) | log(n) | log(n) | log(n) | log(n) | log(n) |
Features:
- Multi-leaves existence / non-existence merkle proof
- Customizable hash function
- Storage backend agnostic
- Rust
no_stdsupport
This article describes algorithm of this data structure An optimized compacted sparse merkle tree
A sparse merkle tree is a perfectly balanced tree contains 2 ^ N leaves:
# N = 256 sparse merkle tree
height:
0
/ \
255 0 1
.............................
/ \ / \
1 0 1 0 1
/ \ / \ / \ / \
0 0 1 0 1 ... 0 1 0 1
0x00..00 0x00..01 ... 0x11..11The above graph demonstrates a sparse merkle tree with 2 ^ 256 leaves, which can mapping every possible H256 value into leaves. The height of the tree is 256, from top to bottom, we denote 0 for each left branch and denote 1 for each right branch, so we can get a 256 bits path, which also can represent in H256, we use the path as the key of leaves, the most left leaf's key is 0x00..00, and the next key is 0x00..01, the most right key is 0x11..11.
MIT