Algebraic K-theory and descent for blow-ups

Overview of attention for article published in Inventiones mathematicae, August 2017

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@TimHenke9 Oops the first link is wrong, I meant https://t.co/YOPiT8c7Qz (but https://t.co/KELhur6l76 is also an interesting, very different application of DAG)

@TimHenke9 Here are papers which use LX to give alternative approaches to Grothendieck-Riemann-Roch which hold in great generality: https://t.co/KELhur6l76 https://t.co/HsekRqUfc8

RT @rXiv_math_KT: https://t.co/0JbKvIad4g M Kerz et. al. Algebraic K-theory and descent for blow-ups https://t.co/ZH4iqGrD6q

RT @mathKTb: Moritz Kerz, Florian Strunk, Georg Tamme : Algebraic K-theory and descent for blow-ups https://t.co/HIzIcVKFXK

RT @rXiv_math_KT: https://t.co/0JbKvIad4g M Kerz et. al. Algebraic K-theory and descent for blow-ups https://t.co/ZH4iqGrD6q

RT @rXiv_math_KT: https://t.co/0JbKvIad4g M Kerz et. al. Algebraic K-theory and descent for blow-ups https://t.co/ZH4iqGrD6q

RT @rXiv_math_KT: https://t.co/0JbKvIad4g M Kerz et. al. Algebraic K-theory and descent for blow-ups https://t.co/ZH4iqGrD6q

https://t.co/0JbKvIad4g M Kerz et. al. Algebraic K-theory and descent for blow-ups https://t.co/ZH4iqGrD6q

Moritz Kerz, Florian Strunk, Georg Tamme : Algebraic K-theory and descent for blow-ups https://t.co/HIzIcVKFXK