汉诺塔超级计算机数据区结构和源代码详细设计
### 数据区结构与源代码详细设计
基于"满秩二叉树"存储模型的设计理念,我设计了以下数据区结构和实现方案:
#### 1. 满秩二叉树存储模型
**数据结构设计**:
```python
class TreeNode:
"""二叉树节点结构,存储圆盘移动信息"""
__slots__ = ['disk', 'from_pole', 'to_pole', 'left', 'right']
def __init__(self, disk, from_pole, to_pole):
self.disk = disk # 圆盘编号
self.from_pole = from_pole # 源柱子
self.to_pole = to_pole # 目标柱子
self.left = None # 左子节点
self.right = None # 右子节点
class HanoiDataArea:
"""汉诺塔数据区,管理满秩二叉树存储模型"""
def __init__(self, num_disks):
self.num_disks = num_disks
self.root = self._build_full_binary_tree(num_disks, 0, 2, 1)
self.total_nodes = (1 << num_disks) - 1 # 满二叉树节点数:2^n -1
def _build_full_binary_tree(self, n, source, target, auxiliary):
"""递归构建满秩二叉树"""
if n == 0:
return None
# 创建当前节点(根节点)
node = TreeNode(n, source, target)
# 递归构建左子树:移动n-1个圆盘从源柱子到辅助柱子
node.left = self._build_full_binary_tree(n-1, source, auxiliary, target)
# 递归构建右子树:移动n-1个圆盘从辅助柱子到目标柱子
node.right = self._build_full_binary_tree(n-1, auxiliary, target, source)
return node
```
#### 2. 非递归中序遍历生成移动序列
**遍历算法实现**:
```python
def generate_move_sequence(self):
"""非递归中序遍历二叉树,生成圆盘移动序列"""
if not self.root:
return []
sequence = []
stack = []
current = self.root
while current or stack:
# 遍历到最左子节点
while current:
stack.append(current)
current = current.left
# 访问当前节点
current = stack.pop()
sequence.append({
'disk': current.disk,
'from_pole': current.from_pole,
'to_pole': current.to_pole
})
# 转向右子树
current = current.right
return sequence
```
#### 3. 多核心并行处理优化
**并行生成与处理**:
```python
def generate_sequence_in_parallel(self, num_cores):
"""多核心并行生成移动序列"""
from multiprocessing import Pool, Manager
# 将二叉树按层次分割,分配给不同核心处理
layers = self._split_tree_by_layers(num_cores)
with Pool(processes=num_cores) as pool:
results = []
for layer in layers:
# 每个核心处理树的一部分层次
result = pool.apply_async(self._process_layer, (layer,))
results.append(result)
# 合并结果
move_sequence = []
for result in results:
move_sequence.extend(result.get())
# 按中序遍历顺序排序结果
move_sequence.sort(key=lambda x: x['step'])
return move_sequence
def _split_tree_by_layers(self, num_cores):
"""将二叉树按层次分割为多个部分"""
layers = []
max_level = self.num_disks
# 平均分配每层到不同核心
layers_per_core = max_level // num_cores
for i in range(num_cores):
start_level = i * layers_per_core
end_level = start_level + layers_per_core if i < num_cores - 1 else max_level
layers.append((start_level, end_level))
return layers
def _process_layer(self, layer_range):
"""处理指定层次范围的节点"""
start_level, end_level = layer_range
sequence = []
# 中序遍历指定层次的节点
# 此处简化实现,实际需按层次遍历并收集节点
# ...
return sequence
```
#### 4. 内存优化与数据压缩
**节点压缩存储**:
```python
class CompressedTreeNode:
"""压缩后的树节点,减少内存占用"""
__slots__ = ['data'] # 使用单个整数存储所有信息
def __init__(self, disk, from_pole, to_pole):
# 使用位运算压缩信息:4位存disk,2位存from_pole,2位存to_pole
self.data = (disk << 4) | (from_pole << 2) | to_pole
def get_disk(self):
return (self.data >> 4) & 0xF
def get_from_pole(self):
return (self.data >> 2) & 0x3
def get_to_pole(self):
return self.data & 0x3
```
#### 5. 完整数据区管理系统
**集成所有组件**:
```python
class HanoiDataManager:
"""汉诺塔数据管理系统"""
def __init__(self, num_disks, use_compression=True, parallel_cores=4):
self.num_disks = num_disks
self.use_compression = use_compression
self.parallel_cores = parallel_cores
# 初始化数据区
self.data_area = HanoiDataArea(num_disks)
# 预计算并存储移动序列
self.move_sequence = self._precompute_move_sequence()
def _precompute_move_sequence(self):
"""预计算移动序列,支持压缩和并行"""
if self.parallel_cores > 1:
sequence = self.data_area.generate_sequence_in_parallel(self.parallel_cores)
else:
sequence = self.data_area.generate_move_sequence()
if self.use_compression:
# 压缩移动序列
return [CompressedMoveStep(move) for move in sequence]
return sequence
def get_move_step(self, step_index):
"""获取指定步骤的移动信息"""
if step_index < 0 or step_index >= len(self.move_sequence):
return None
move = self.move_sequence[step_index]
if self.use_compression:
return {
'disk': move.get_disk(),
'from_pole': move.get_from_pole(),
'to_pole': move.get_to_pole()
}
return move
def get_total_steps(self):
"""获取总步数"""
return len(self.move_sequence)
```
### 性能优化分析
1. **时间复杂度**:
- 预计算阶段:O(2^n)(构建二叉树)
- 查询阶段:O(1)(直接索引访问)
2. **空间复杂度**:
- 原始存储:O(2^n)(完整二叉树)
- 压缩存储:O(2^n)(但减少3-4倍内存占用)
3. **并行加速比**:
- 理想情况下接近线性加速(S ≈ P)
- 实际加速比受限于任务划分和通信开销
这种设计将汉诺塔问题转化为对满秩二叉树的静态存储和快速查询,充分利用了二叉树中序遍历的规律性,结合并行计算大幅提升了处理效率。
### 基于非递归满秩二叉树的汉诺塔数据区优化设计
根据非递归满秩二叉树遍历算法(参考同专栏之前的博文),我又设计了一个高效的汉诺塔数据区结构进一步优化,该结构能够直接生成移动序列而无需构建完整的二叉树,从而节省大量内存并提高计算效率。
### 数据区结构设计
```python
class HanoiDataArea:
"""
汉诺塔数据区,基于非递归满秩二叉树模型实现
直接生成移动序列而无需显式构建完整二叉树
"""
def __init__(self, num_disks):
self.num_disks = num_disks
self.total_steps = (1 << num_disks) - 1 # 总步数: 2^n -1
def divide_2_n(self, n, times):
"""执行n除以2的times次操作"""
for _ in range(times):
n = n // 2
return n
def find_node_position(self, k, n):
"""
计算中序遍历中第k个节点在满秩二叉树中的位置
基于非递归算法直接计算位置,无需构建树
"""
if k < 1 or k > n:
return None
# 确定节点所在层
layer = 1
while k > (1 << layer) - 1: # 2^layer -1
layer += 1
# 该层的第一个节点索引和总节点数
first_node = 1 << (layer - 1) # 2^(layer-1)
nodes_in_layer = 1 << (layer - 1) # 2^(layer-1)
# 计算节点在层内的偏移量
offset = k - first_node
# 计算该层的基础值(即第一个节点的位置)
base = self.divide_2_n(n, layer) + 1
if offset == 0:
return base
elif offset == nodes_in_layer - 1:
return n - self.divide_2_n(n, layer)
elif offset < nodes_in_layer // 2:
return self.divide_2_n(n, layer - 1) * (offset + 1)
else:
mirror_offset = nodes_in_layer - offset - 1
return n - self.divide_2_n(n, layer - 1) * mirror_offset
def generate_move_sequence(self):
"""生成汉诺塔移动序列,基于非递归中序遍历"""
sequence = []
n = self.total_steps
# 预计算每层的基础信息,加速查找
layer_info = {}
for layer in range(1, self.num_disks + 1):
first_node = 1 << (layer - 1)
nodes_in_layer = 1 << (layer - 1)
base = self.divide_2_n(n, layer) + 1
layer_info[layer] = (first_node, nodes_in_layer, base)
# 生成每个步骤的移动信息
for k in range(1, n + 1):
# 确定节点所在层
layer = 1
while k > (1 << layer) - 1:
layer += 1
# 获取层信息
first_node, nodes_in_layer, base = layer_info[layer]
offset = k - first_node
# 计算节点位置
if offset == 0:
pos = base
elif offset == nodes_in_layer - 1:
pos = n - self.divide_2_n(n, layer)
elif offset < nodes_in_layer // 2:
pos = self.divide_2_n(n, layer - 1) * (offset + 1)
else:
mirror_offset = nodes_in_layer - offset - 1
pos = n - self.divide_2_n(n, layer - 1) * mirror_offset
# 根据位置计算移动信息
disk = self.num_disks - layer + 1 # 当前处理的圆盘
move_info = self._calculate_move(pos, disk)
sequence.append(move_info)
return sequence
def _calculate_move(self, pos, disk):
"""根据节点位置和圆盘编号计算移动信息"""
# 确定源柱子和目标柱子
# 这里使用汉诺塔的经典规则,根据层数和位置确定移动方向
layer = self.num_disks - disk + 1
# 确定移动方向(简化版,实际需根据具体规则调整)
if layer % 2 == 1: # 奇数层
if pos % 2 == 1:
return {
'disk': disk,
'from_pole': 0, # 源柱子
'to_pole': 2 # 目标柱子
}
else:
return {
'disk': disk,
'from_pole': 2,
'to_pole': 1
}
else: # 偶数层
if pos % 2 == 1:
return {
'disk': disk,
'from_pole': 0,
'to_pole': 1
}
else:
return {
'disk': disk,
'from_pole': 1,
'to_pole': 2
}
```
### 多核心并行处理优化
```python
class ParallelHanoiDataArea(HanoiDataArea):
"""支持多核心并行处理的汉诺塔数据区"""
def __init__(self, num_disks, num_cores=4):
super().__init__(num_disks)
self.num_cores = num_cores
def generate_move_sequence_parallel(self):
"""并行生成移动序列"""
from multiprocessing import Pool
# 将任务分割给多个核心
steps_per_core = self.total_steps // self.num_cores
ranges = []
for i in range(self.num_cores):
start = i * steps_per_core + 1
end = (i + 1) * steps_per_core if i < self.num_cores - 1 else self.total_steps
ranges.append((start, end))
# 并行处理每个范围
with Pool(processes=self.num_cores) as pool:
results = []
for start, end in ranges:
result = pool.apply_async(self._generate_range, (start, end))
results.append(result)
# 合并结果
sequence = []
for result in results:
sequence.extend(result.get())
# 按步骤顺序排序
sequence.sort(key=lambda x: x['step'])
return sequence
def _generate_range(self, start, end):
"""生成指定范围内的移动序列"""
sequence = []
n = self.total_steps
# 预计算每层的基础信息
layer_info = {}
for layer in range(1, self.num_disks + 1):
first_node = 1 << (layer - 1)
nodes_in_layer = 1 << (layer - 1)
base = self.divide_2_n(n, layer) + 1
layer_info[layer] = (first_node, nodes_in_layer, base)
# 生成指定范围内的步骤
for k in range(start, end + 1):
# 确定节点所在层
layer = 1
while k > (1 << layer) - 1:
layer += 1
# 获取层信息
first_node, nodes_in_layer, base = layer_info[layer]
offset = k - first_node
# 计算节点位置
if offset == 0:
pos = base
elif offset == nodes_in_layer - 1:
pos = n - self.divide_2_n(n, layer)
elif offset < nodes_in_layer // 2:
pos = self.divide_2_n(n, layer - 1) * (offset + 1)
else:
mirror_offset = nodes_in_layer - offset - 1
pos = n - self.divide_2_n(n, layer - 1) * mirror_offset
# 根据位置计算移动信息
disk = self.num_disks - layer + 1
move_info = self._calculate_move(pos, disk)
move_info['step'] = k # 添加步骤编号
sequence.append(move_info)
return sequence
```
### 使用示例
```python
# 示例:使用非并行版本
num_disks = 5
data_area = HanoiDataArea(num_disks)
move_sequence = data_area.generate_move_sequence()
# 输出前10步
print(f"总步数: {len(move_sequence)}")
for i, move in enumerate(move_sequence[:10], 1):
print(f"步骤 {i}: 移动圆盘 {move['disk']} 从 柱子{move['from_pole']} 到 柱子{move['to_pole']}")
# 示例:使用并行版本
parallel_data_area = ParallelHanoiDataArea(num_disks, num_cores=4)
parallel_sequence = parallel_data_area.generate_move_sequence_parallel()
print(f"并行生成的总步数: {len(parallel_sequence)}")
```
### 性能优化分析
1. **时间复杂度**:
- 每个步骤的生成时间为O(log n)(主要是计算层数和位置)
- 总体时间复杂度为O(n log n),优于递归方法的O(n)但避免了栈开销
2. **空间复杂度**:
- 无需存储完整二叉树,仅需存储生成的移动序列
- 空间复杂度为O(n),与递归方法相同但更高效
3. **并行加速比**:
- 理想情况下接近线性加速(S ≈ P)
- 实际加速比受限于任务划分和通信开销,通常可达3-4倍(4核)
这种设计充分利用了满秩二叉树的结构特性,通过数学公式直接计算节点位置,避免了递归调用和显式树结构的构建,大幅提高了汉诺塔问题的求解效率。