Asymptotic Hecke algebras and involutions

We report on a proof-checked version of Stone’s result on the representability of Boolean algebras via the clopen sets of a totally disconnected compact Hausdor↵ space.. Our

– We prove a conjecture of Kottwitz and Rapoport which implies a converse to Mazur’s Inequality for all connected split and quasi-split unramified reductive groups.. Our results

Note that we do not give the proof of Theorem 2 since it follows from the proof of Theorem 1 exactly as in the case of the semilinear heat equation 6 treated in [9].. We give

The common point to Kostant’s and Steinberg’s formulae is the function count- ing the number of decompositions of a root lattice element as a linear combination with

The proof of the Milin conjecture here given differs from the argument verified by the Leningrad Seminar in Geometric Function Theory [6] in that it avoids approxima- tion

Seeking to contribute to these applications, this research project proves the Yau Geometric Con- jecture in six dimensions, a sharp upper bound for the number of positive lattice

In the remainder of this paper, we will implicitly assume that all link diagrams are connected, and that a diagram is alternating within each twist region... Thurston [29,

We derive an asymptotic formula which counts the number of abelian ex- tensions of prime degrees over rational function