Matches in DBpedia 2016-04 for { ?s ?p "In mathematics, a linear map is a mapping V ↦ W between two modules (including vector spaces) that preserves the operations of addition and scalar multiplication.By studying the linear maps between two modules one can gain insight into their structures. If the modules have additional structure, like topologies or bornologies, then one can study the subspace of linear maps that preserve this structure."@en }
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- Topology_of_uniform_convergence abstract "In mathematics, a linear map is a mapping V ↦ W between two modules (including vector spaces) that preserves the operations of addition and scalar multiplication.By studying the linear maps between two modules one can gain insight into their structures. If the modules have additional structure, like topologies or bornologies, then one can study the subspace of linear maps that preserve this structure.".
- Q17104208 abstract "In mathematics, a linear map is a mapping V ↦ W between two modules (including vector spaces) that preserves the operations of addition and scalar multiplication.By studying the linear maps between two modules one can gain insight into their structures. If the modules have additional structure, like topologies or bornologies, then one can study the subspace of linear maps that preserve this structure.".
- Topology_of_uniform_convergence comment "In mathematics, a linear map is a mapping V ↦ W between two modules (including vector spaces) that preserves the operations of addition and scalar multiplication.By studying the linear maps between two modules one can gain insight into their structures. If the modules have additional structure, like topologies or bornologies, then one can study the subspace of linear maps that preserve this structure.".
- Q17104208 comment "In mathematics, a linear map is a mapping V ↦ W between two modules (including vector spaces) that preserves the operations of addition and scalar multiplication.By studying the linear maps between two modules one can gain insight into their structures. If the modules have additional structure, like topologies or bornologies, then one can study the subspace of linear maps that preserve this structure.".