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on gdw-randers metrics on tangent lie groups
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نویسنده
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atashafrouz mona ,najafi behzad ,tayebi akbar
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منبع
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aut journal of mathematics and computing - 2021 - دوره : 2 - شماره : 1 - صفحه:27 -36
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چکیده
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Let g be a lie group equipped with a left-invariant randers metric f. suppose that f^v and f^c denote the vertical and complete lift of f on t g, respectively. we give the necessary and sufficient conditions under which f^v and f^ c are generalized douglas-weyl metrics. then, we characterize all 2-step nilpotent lie groups g such that their tangent lie groups (t g, f^c ) are generalized douglas-weyl randers metrics.
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کلیدواژه
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left-invariant metric ,douglas metric ,generalized douglas-weyl ,metric ,randers metric
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آدرس
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amirkabir university of technology (tehran polytechnic), department of mathematics and computer science, iran, amirkabir university of technology (tehran polytechnic), department of mathematics and computer science, iran, university of qom, faculty of science, department of mathematics, iran
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پست الکترونیکی
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akbar.tayebi@gmail.com
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Authors
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