66
个编辑
更改
跳到导航
跳到搜索
小第418行:
第418行: − 偏微分方程组的分类可以推广到一阶方程组,其中未知量 {{mvar|u}} 是有 {{mvar|m}} 个分量的向量。对于 {{math|''ν'' {{=}} 1, 2,… ''n''}},系数矩阵 {{mvar|A<sub>ν</sub>}} 是 {{mvar|m}} × {{mvar|m}} 的矩阵。偏微分方程形式如下:+ 第433行:
第433行: − 其中系数矩阵 {{mvar|A<sub>ν</sub>}} 和向量 {{mvar|B}} 可能依赖于 {{mvar|x}} 和 {{mvar|u}}。如果超曲面是以隐式形式给出的+ 第448行:
第448行: − 其中存在一个非零的梯度,那么如果特征形式消失,则在给定点上算子的特征曲面形式如下:+
无编辑摘要
The classification of partial differential equations can be extended to systems of first-order equations, where the unknown is now a vector with components, and the coefficient matrices are by matrices for 1, 2,… n}}. The partial differential equation takes the form
The classification of partial differential equations can be extended to systems of first-order equations, where the unknown is now a vector with components, and the coefficient matrices are by matrices for 1, 2,… n}}. The partial differential equation takes the form
偏微分方程的分类可以推广到一阶方程组,其中未知量 {{mvar|u}} 是有 {{mvar|m}} 个分量的向量。对于 {{math|''ν'' {{=}} 1, 2,… ''n''}},系数矩阵 {{mvar|A<sub>ν</sub>}} 是 {{mvar|m}} × {{mvar|m}} 的矩阵。偏微分方程形式如下:
where the coefficient matrices and the vector may depend upon and . If a hypersurface is given in the implicit form
where the coefficient matrices and the vector may depend upon and . If a hypersurface is given in the implicit form
其中,系数矩阵 {{mvar|A<sub>ν</sub>}} 和向量 {{mvar|B}} 可能依赖于 {{mvar|x}} 和 {{mvar|u}}。如果超曲面是以以下隐式形式给出的,
where has a non-zero gradient, then is a characteristic surface for the operator at a given point if the characteristic form vanishes:
where has a non-zero gradient, then is a characteristic surface for the operator at a given point if the characteristic form vanishes:
其中,存在一个非零的梯度 {{mvar|φ}},对于在给定点上特征形式消失的算子,特征曲面 {{mvar|S}} 形式如下: