LINEAR MAPPINGS PRESEVING ORTHOGONALITY ON BILINEAR SPACES
This dissertation discusses the development of linear mappings that preserve orthogonality in indefinite inner product spaces and bilinear spaces. A linear mapping is said orthogonality preserving if two elements that are orthogonal in the domain result in elements that are orthogonal to each oth...
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| Format: | Dissertations |
| Language: | Indonesia |
| Online Access: | https://digilib.itb.ac.id/gdl/view/64872 |
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| Institution: | Institut Teknologi Bandung |
| Language: | Indonesia |
| Summary: | This dissertation discusses the development of linear mappings that preserve
orthogonality in indefinite inner product spaces and bilinear spaces. A linear
mapping is said orthogonality preserving if two elements that are orthogonal in the
domain result in elements that are orthogonal to each other in the codomain. Many
studies have been carried out related to orthogonality preservation properties. One
of the most popular studies developed by researchers is the research conducted by
Chmieli´nski in 2005. In this research, Chmieli´nski characterizes linear mappings
that preserve orthogonality in inner product spaces, which is continuously studied
and developed by other researchers. One of them is what W´ojcik did in 2015.
This dissertation has succeeded in generalizing those characterizations to indefinite
inner product spaces and bilinear spaces. In particular, it has been obtained characterizations
of linear mappings that preserve orthogonality in indefinite inner product
spaces and bilinear spaces, not only over the real or complex field but also any field
including a finite field. The method used to obtain the results in this dissertation is
by analyzing the characterization theorem of linear mappings that preserve orthogonality
in inner product spaces, then analyze, arrange, and prove equivalent theorem
of these facts in the context of indefinite inner product spaces and bilinear spaces. |
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