Presentation and uniqueness of Kac-Moody groups over local rings
Abstract
To any generalised Cartan matrix (GCM) A and any ring R, Tits associated a Kac-Moody group GA(R) defined by a presentation \`a la Steinberg. For a domain R with field of fractions K, we explore the question of whether the canonical map R GA(R) GA(K) is injective. This question for Cartan matrices has a long history, and for GCMs was already present in Tits' foundational papers on Kac-Moody groups. We prove that for any 2-spherical GCM A, the map R is injective for all valuation rings R (under an additional minor condition (co)). To the best of our knowledge, this is the first such injectivity result beyond the classical setting.
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