Existence of generalized inverse of linear transformations over finite fields (Q1273208)

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scientific article; zbMATH DE number 1229762
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English
Existence of generalized inverse of linear transformations over finite fields
scientific article; zbMATH DE number 1229762

    Statements

    title
    Existence of generalized inverse of linear transformations over finite fields (English)
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    author
    Chuankun Wu
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    Ed Dawson
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    publication date
    6 December 1998
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    review text
    Let \(A\) be an \(m\times n\) matrix over the finite field \(F_q\). The authors prove that \(A\) has a Moore-Penrose inverse if, and only if, \(\text{Im} A\), and \(\text{Ker} A\) have orthogonal complements in \(F^m_q\) and \(F^n_q\), respectively. (Orthogonality is with respect to the natural scalar product.) Attention is drawn to the possible use of generalized inverses over finite fields in cryptography.
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    zbMATH Keywords
    orthogonal decomposition
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    finite field
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    Moore-Penrose inverse
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    generalized inverses
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    cryptography
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    reviewed by
    G. E. Wall
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    cites work
    Q4061081
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    Identifiers

    Mathematics Subject Classification ID
    15A09
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    15B33
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    94A60
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    zbMATH DE Number
    1229762
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    OpenAlex ID
    W2078425982
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