Motivic Verona by Peter Arndt 3/6: (∞,1)-categories and stabilization

Motivic Verona by Peter Arndt 3/6: (∞,1)-categories and stabilization

Motivic Verona by Peter Arndt 1/6: A picture of homotopy theory and localization of categoriesSee more

Motivic Verona by Peter Arndt 1/6: A picture of homotopy theory and localization of categories

Motivic Verona by Peter Arndt 5/6: Working with motivic spectra and a unifying abstract approachSee more

Motivic Verona by Peter Arndt 5/6: Working with motivic spectra and a unifying abstract approach

Peter Arndt - Abstract motivic homotopy theorySee more

Peter Arndt - Abstract motivic homotopy theory

Motivic Verona by Peter Arndt 6/6: Stable computationsSee more

Motivic Verona by Peter Arndt 6/6: Stable computations

Motivic Verona by Peter Arndt 2/6: Simplicial sets, derived functors and homotopy (co-)limitsSee more

Motivic Verona by Peter Arndt 2/6: Simplicial sets, derived functors and homotopy (co-)limits

Motivic Verona by Peter Arndt 4/6: The functorial approach to schemes and motivic spectraSee more

Motivic Verona by Peter Arndt 4/6: The functorial approach to schemes and motivic spectra

New 3D printer offers stability, accuracy, and a range of materialsSee more

New 3D printer offers stability, accuracy, and a range of materials

Variations in B-Flat Minor, Op. 3: Var. VII. Allegro agitato ed energicoSee more

Variations in B-Flat Minor, Op. 3: Var. VII. Allegro agitato ed energico

Factor X Duke – Part 01See more

Factor X Duke – Part 01

Peter Arndt - Abstract motivic homotopy theory IISee more

Peter Arndt - Abstract motivic homotopy theory II

Aravind Asok, On P^1-stabilization in unstable motivic homotopy theorySee more

Aravind Asok, On P^1-stabilization in unstable motivic homotopy theory

Peter Arndt (Univ. Düsseldorf): Ranges of functors and elementary classes via topos theorySee more

Peter Arndt (Univ. Düsseldorf): Ranges of functors and elementary classes via topos theory

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