Matches in DBpedia 2016-04 for { ?s ?p "In topology, a mathematical discipline, combining dimensions into a manifold consists of taking n dimensions and visualizing them in a smaller m dimension. Similar concepts apply when studying spacetime and Calabi–Yau manifolds. For example, in string theory, six dimensions are combined into a two dimensional manifold for simple visualization."@en }
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- Combining_dimensions abstract "In topology, a mathematical discipline, combining dimensions into a manifold consists of taking n dimensions and visualizing them in a smaller m dimension. Similar concepts apply when studying spacetime and Calabi–Yau manifolds. For example, in string theory, six dimensions are combined into a two dimensional manifold for simple visualization.".
- Q5150921 abstract "In topology, a mathematical discipline, combining dimensions into a manifold consists of taking n dimensions and visualizing them in a smaller m dimension. Similar concepts apply when studying spacetime and Calabi–Yau manifolds. For example, in string theory, six dimensions are combined into a two dimensional manifold for simple visualization.".
- Combining_dimensions comment "In topology, a mathematical discipline, combining dimensions into a manifold consists of taking n dimensions and visualizing them in a smaller m dimension. Similar concepts apply when studying spacetime and Calabi–Yau manifolds. For example, in string theory, six dimensions are combined into a two dimensional manifold for simple visualization.".
- Q5150921 comment "In topology, a mathematical discipline, combining dimensions into a manifold consists of taking n dimensions and visualizing them in a smaller m dimension. Similar concepts apply when studying spacetime and Calabi–Yau manifolds. For example, in string theory, six dimensions are combined into a two dimensional manifold for simple visualization.".