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/**
 * # Block Proof
 * A proof for the block streamed from a consensus node.
 *
 * ### Keywords
 * The key words "MUST", "MUST NOT", "REQUIRED", "SHALL", "SHALL NOT",
 * "SHOULD", "SHOULD NOT", "RECOMMENDED", "MAY", and "OPTIONAL" in this
 * document are to be interpreted as described in
 * [RFC2119](https://www.ietf.org/rfc/rfc2119) and clarified in
 * [RFC8174](https://www.ietf.org/rfc/rfc8174).
 */
syntax = "proto3";

package com.hedera.hapi.block.stream;

/*
 * Copyright (C) 2024 Hedera Hashgraph, LLC
 *
 * Licensed under the Apache License, Version 2.0 (the "License");
 * you may not use this file except in compliance with the License.
 * You may obtain a copy of the License at
 *
 *      http://www.apache.org/licenses/LICENSE-2.0
 *
 * Unless required by applicable law or agreed to in writing, software
 * distributed under the License is distributed on an "AS IS" BASIS,
 * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 * See the License for the specific language governing permissions and
 * limitations under the License.
 */

option java_package = "com.hedera.hapi.block.stream.protoc";
// <<>> This comment is special code for setting PBJ Compiler java package
option java_multiple_files = true;

/**
 * A cryptographic proof for the "Block Merkle Tree".
 *
 * This message SHALL offer a proof for the "Block Merkle Tree".
 * The information in the "Block Merkle Tree" SHALL be used to validate the
 * full content of the most recent block, and, with chained validation,
 * all prior blocks.
 *
 * ### Block Merkle Tree
 * The Block Hash of any block is a merkle root hash comprised of a 4 leaf
 * binary merkle tree. The 4 leaves represent
 * 1. Previous block proof hash
 * 1. Merkle root of transaction inputs tree
 * 1. Merkle root of transaction outputs tree
 * 1. Merkle rook of state tree
 *
 * #### Computing the hash
 * The process for computing a block hash is somewhat complex, and involves
 * creating a "virtual" merkle tree to obtain the root merkle hash of
 * that virtual tree.
* The merkle tree SHALL have a 4 part structure with 2 internal nodes, * structured in a strictly binary tree. * - The merkle tree root SHALL be the parent of both * internal nodes. * 1. The first "internal" node SHALL be the parent of the * two "left-most" nodes. * 1. The first leaf MUST be the previous block hash, and is a * single 48-byte value. * 1. The second leaf MUST be the root of a, strictly binary, merkle tree * composed of all "input" block items in the block.
* Input items SHALL be transactions, system transactions, * and events.
* Leaf nodes in this subtree SHALL be ordered in the same order * that the block items are encountered in the stream. * 1. The second "internal" node SHALL be the parent of the two * "right-most" nodes. * 1. The third leaf MUST be the root of a, strictly binary, merkle tree * composed of all "output" block items in the block.
* Output items SHALL be transaction result, transaction * output, and state changes.
* Leaf nodes in this subtree SHALL be ordered in the same order that * the block items are encountered in the stream. * 1. The fourth leaf MUST be the merkle tree root hash for network state * at the start of the block, and is a single 48-byte value. * - The block hash SHALL be the hash calculated for the root of this merkle * tree. * - The hash algorithm used SHALL be the algorithm specified in the * corresponding block header. * * The "inputs" and "outputs" subtrees SHALL be "complete" binary merkle trees, * with nodes that would otherwise be missing replaced by a "null" hash * leaf. */ message BlockProof { /** * The block this proof secures.
* We provide this because a proof for a future block can be used to prove * the state of the ledger at that block and the blocks before it.
*

* This value SHOULD match the block number of the current block, * under normal operation. */ uint64 block = 1; /** * A merkle root hash of the previous block. *

* This MUST contain a hash of the "block" merkle tree root for the * previous block.
* The hash algorithm used MUST match the algorithm declared in the * block header _for that block_. */ bytes previous_block_root_hash = 2; /** * A merkle root hash of the network state.
* This is present to support validation of this block proof by clients * that do not maintain a full copy of the network state. *

* This MUST contain a hash of the "state" merkle tree root at the start * of the current block (which this block proof verifies).
* State processing clients SHOULD calculate the state root hash * independently and SHOULD NOT rely on this value.
* State processing clients MUST validate the application of state changes * for a block using the value present in the Block Proof of the * _following_ block. * Compliant consensus nodes MUST produce an "empty" block (containing * only `BlockHeader` and `BlockProof` as the last block prior to a * network "freeze" to ensure the final state hash is incorporated into * the Block Stream correctly. * Stateless (non-state-processing) clients MUST use this value to * construct the block merkle tree. */ bytes start_of_block_state_root_hash = 3; /** * A TSS signature for one block.
* This is a single signature representing the collection of partial * signatures from nodes holding strictly greater than 2/3 of the * current network "weight" in aggregate. The signature is produced by * cryptographic "aggregation" of the partial signatures to produce a * single signature that can be verified with the network public key, * but could not be produced by fewer nodes than required to meet the * threshold for network stake "weight". *

* This message MUST make use of a threshold signature scheme like `BLS` * which provides the necessary cryptographic guarantees.
* This signature SHALL use a TSS signature to provide a single signature * that represents the consensus signature of consensus nodes.
* The exact subset of nodes that signed SHALL neither be known nor * tracked, but it SHALL be cryptographically verifiable that the * threshold was met if the signature itself can be validated with * the network public key (a.k.a `LedgerID`). */ bytes block_signature = 4; /** * A set of hash values along with ordering information.
* This list of hash values form the set of sibling hash values needed to * correctly reconstruct the parent hash, and all hash values "above" that * hash in the merkle tree. *

* A Block proof can be constructed by combining the sibling hashes for * a previous block hash and sibling hashes for each entry "above" that * node in the merkle tree of a block proof that incorporates that previous * block hash. This form of block proof may be used to prove a chain of * blocks when one or more older blocks is missing the original block * proof that signed the block's merkle root directly. *

* This list MUST be ordered from the sibling of the node that contains * this block's root node hash, and continues up the merkle tree to the * root hash of the signed block proof. *

* If this block proof has a "direct" signature, then this list MUST be * empty.
* If this list is not empty, then this block proof MUST be verified by * first constructing the "block" merkle tree and computing the root hash * of that tree, then combining that hash with the values in this list, * paying attention to the first/second sibling ordering, until the root * merkle hash is produced from the last pair of sibling hashes. That * "secondary" root hash MUST then be verified using * the value of `block_signature`. */ repeated MerkleSiblingHash sibling_hashes = 5; } /** * A hash of a "sibling" to an entry in a Merkle tree. * * When constructing a binary merkle tree, each internal node is a hash * constructed from the hash of two "descendant" nodes. Those two nodes * are "siblings" and the order (first, second) in which the two hash values * are combined affects the parent hash.
* This may be used to reconstruct a portion of a merkle tree starting from * a node of interest up to the root of the tree. */ message MerkleSiblingHash { /** * A flag for the position of this sibling. *

* If this is set then this sibling MUST be the first hash in the pair of * sibling hashes of a binary merkle tree.
* If this is unset, then this sibling MUST be the second hash in the pair * of sibling hashes of a binary merkle tree. */ bool is_first = 1; /** * A byte array of a sibling hash.
* This is the hash for the sibling at this point in the merkle tree. *

* The algorithm for this hash SHALL match the algorithm for the block that * contains this sibling.
* This SHALL contain the raw (e.g.) 384 bits (48 bytes) of the hash value. */ bytes sibling_hash = 2; }





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