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        <dc:title>Buildings, valuated matroids, and tropical linear spaces</dc:title>
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        <bibo:abstract>&lt;jats:title&gt;Abstract&lt;/jats:title&gt;&lt;jats:p&gt;Affine Bruhat–Tits buildings are geometric spaces extracting the combinatorics of algebraic groups. The building of  parameterizes flags of subspaces/lattices in or, equivalently, norms on a fixed finite‐dimensional vector space, up to homothety. It has first been studied by Goldman and Iwahori as a piecewise‐linear analogue of symmetric spaces. The space of seminorms compactifies the space of norms and admits a natural surjective restriction map from the Berkovich analytification of projective space that factors the natural tropicalization map. Inspired by Payne&apos;s result that the analytification is the limit of all tropicalizations, we show that the space of seminorms is the limit of all tropicalized &lt;jats:italic&gt;linear&lt;/jats:italic&gt; embeddings  and prove a faithful tropicalization result for compactified linear spaces. The space of seminorms is in fact the tropical linear space associated to the universal realizable valuated matroid.&lt;/jats:p&gt;</bibo:abstract>
        <bibo:volume>109</bibo:volume>
        <bibo:issue>1</bibo:issue>
        <dc:publisher>Wiley</dc:publisher>
        <bibo:doi rdf:resource="10.1112/jlms.12850" />
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