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GRADED LOCALLY FINITE AND GRADED JUST INFINITE STEINBERG ALGEBRAS
- Prelegent(ci)
- DANIEL VAN WYK
- Afiliacja
- Fairfield University, Connecticut, USA
- Język referatu
- angielski
- Termin
- 13 maja 2026 17:15
- Informacje na temat wydarzenia
- IMPAN - Room 405 & zoom
- Tytuł w języku polskim
- GRADED LOCALLY FINITE AND GRADED JUST INFINITE STEINBERG ALGEBRAS
- Seminarium
- North Atlantic Noncommutative Geometry Seminar
We will begin the talk by briefly reviewing the characterizations of locally finite and just infinite Leavitt path algebras, found by Abrams, Pino, and Molina. They consider Leavitt path algebras with the canonical Z-grading. After the brief review, I will discuss recent efforts to extend their results to ample groupoid algebras, also known as Steinberg algebras, with an arbitrary grading induced by a continuous cocycle into a discrete group. We will present a full characterization of graded locally finite Steinberg algebras, and a partial characterization of just infinite Steinberg algebras. If we specialize to the case where the unit fibre is strongly effective, we obtain a full characterization of graded just infinite Steinberg algebras. We will present various results, including that, for locally finite Steinberg algebras, being graded just infinite is equivalent to being graded simple. Finally, we will discuss Deaconu-Renault groupoids and groupoids associated with subshifts as applications.
