hypersurface theory
超曲面理論
hypersurface embedding
超曲面嵌入
hypersurface geometry
超曲面幾何
hypersurface analysis
超曲面分析
hypersurface equation
超曲面方程
hypersurface singularity
超曲面奇點
hypersurface intersection
超曲面交叉
hypersurface representation
超曲面表示
hypersurface mapping
超曲面映射
hypersurface topology
超曲面拓撲
the hypersurface in this study represents a complex geometric structure.
本研究中的超曲面代表了一個複雜的幾何結構。
mathematicians often analyze the properties of a hypersurface.
數學家們經常分析超曲面的性質。
in physics, a hypersurface can define the boundary of a region in space.
在物理學中,超曲面可以定義空間區域的邊界。
the concept of hypersurface is crucial in differential geometry.
超曲面的概念在微分幾何中至關重要。
researchers are exploring the applications of hypersurfaces in data analysis.
研究人員正在探索超曲面在數據分析中的應用。
understanding the curvature of a hypersurface is essential for advanced studies.
理解超曲面的曲率對高級研究至關重要。
hypersurfaces can be classified based on their topological properties.
超曲面可以根據其拓撲性質進行分類。
in algebraic geometry, a hypersurface is defined by a single polynomial equation.
在代數幾何中,超曲面由一個單一的多項式方程定義。
the intersection of two hypersurfaces can yield interesting geometric results.
兩個超曲面的交集可以產生有趣的幾何結果。
hypersurfaces play a significant role in the theory of relativity.
超曲面在相對論理論中發揮着重要作用。
hypersurface theory
超曲面理論
hypersurface embedding
超曲面嵌入
hypersurface geometry
超曲面幾何
hypersurface analysis
超曲面分析
hypersurface equation
超曲面方程
hypersurface singularity
超曲面奇點
hypersurface intersection
超曲面交叉
hypersurface representation
超曲面表示
hypersurface mapping
超曲面映射
hypersurface topology
超曲面拓撲
the hypersurface in this study represents a complex geometric structure.
本研究中的超曲面代表了一個複雜的幾何結構。
mathematicians often analyze the properties of a hypersurface.
數學家們經常分析超曲面的性質。
in physics, a hypersurface can define the boundary of a region in space.
在物理學中,超曲面可以定義空間區域的邊界。
the concept of hypersurface is crucial in differential geometry.
超曲面的概念在微分幾何中至關重要。
researchers are exploring the applications of hypersurfaces in data analysis.
研究人員正在探索超曲面在數據分析中的應用。
understanding the curvature of a hypersurface is essential for advanced studies.
理解超曲面的曲率對高級研究至關重要。
hypersurfaces can be classified based on their topological properties.
超曲面可以根據其拓撲性質進行分類。
in algebraic geometry, a hypersurface is defined by a single polynomial equation.
在代數幾何中,超曲面由一個單一的多項式方程定義。
the intersection of two hypersurfaces can yield interesting geometric results.
兩個超曲面的交集可以產生有趣的幾何結果。
hypersurfaces play a significant role in the theory of relativity.
超曲面在相對論理論中發揮着重要作用。
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