- On the realisation of maximal simple types and epsilon factors of pairs
- SMOOTH REPRESENTATIONS OF GLm(D) VI : SEMISIMPLE TYPES
- MTH-1C17/2008 MTH-1C17 : Pure Mathematics
- TYPES AND REPRESENTATIONS OF p -ADIC SYMPLECTIC GROUPS
- Buildings of classical groups and centralizers of Lie algebra elements
- Covers for self-dual supercuspidal representations of the Siegel Levi subgroup of classical p-adic groups
- The supercuspidal representations of p-adic classical groups
- MTH-ME21/2008 MTH-ME21: Galois Theory with Advanced Topics
- The supercuspidal representations of p-adic classical groups
- MTH-1C17/2007 MTH-1C17 : Pure Mathematics
- MTH-ME28: Galois Theory with Advanced Topics 1. Introduction: This course is an introduction to Galois Theory, which beautifully brings together
- An Introduction to Galois Theory Andrew Baker
- Representations of Finite Groups Andrew Baker
- Supercuspidal representations of p-adic classical groups
- RATIONAL POINTS ON ELLIPTIC CURVES GRAHAM EVEREST, JONATHAN REYNOLDS AND SHAUN STEVENS
- MTH-3E28: Galois Theory 1. Introduction: This course is an introduction to Galois Theory, which beautifully brings together
- REPRESENTATIONS LISSES DE GLm(D) IV : REPRESENTATIONS SUPERCUSPIDALES
- An Introduction to p-adic Numbers and p-adic Andrew Baker
- Primes Generated by Recurrence Sequences G. Everest, S. Stevens, D. Tamsett and T. Ward
- MTH-3E21/2008 MTH-3E21: Galois Theory
- ORBIT-COUNTING IN NON-HYPERBOLIC DYNAMICAL SYSTEMS
- THE UNIFORM PRIMALITY CONJECTURE FOR THE TWISTED FERMAT CUBIC
- arXiv:math.NT/0703553v119Mar2007 PRIMITIVE DIVISORS ON TWISTS OF THE FERMAT
- arXiv:0705.1067v2[math.DS]24May2007 DIRICHLET SERIES FOR FINITE COMBINATORIAL
- MERTENS' THEOREM FOR TORAL AUTOMORPHISMS SAWIAN JAIDEE, SHAUN STEVENS, AND THOMAS WARD
- THE UNIFORM PRIMALITY CONJECTURE FOR ELLIPTIC CURVES
- Genericity of supercuspidal representations of p-adic Sp4 Corinne Blondel and Shaun Stevens
- MTH-2C1Y: Analysis 1. Introduction: This unit continues the study of analysis of functions started in the first year. The
- SMOOTH REPRESENTATIONS OF GLm(D) V: ENDO-CLASSES
- Supercuspidal representations of p-adic classical groups
- INTERTWINING AND SUPERCUSPIDAL TYPES FOR P-ADIC CLASSICAL GROUPSy
- THE UNIFORM PRIMALITY CONJECTURE FOR ELLIPTIC CURVES
- THE UNIFORM PRIMALITY CONJECTURE FOR THE TWISTED FERMAT CUBIC
- PRIMITIVE DIVISORS ON TWISTS OF THE FERMAT CUBIC
- Primes Generated by Recurrence Sequences Graham Everest, Shaun Stevens, Duncan Tamsett, and Tom Ward
- Semisimple characters for p-adic classical groups Shaun Stevens
- Smooth representations of p-adic classical Shaun Stevens
- Semisimple strata for p-adic classical groups Shaun Stevens*
- Genericity of supercuspidal representations of p-adic Sp 4 Corinne Blondel and Shaun Stevens*
- | manuscripta mathematica manuscript No. * | (will be inserted by the editor) *
- Buildings of classical groups and centralizers of Lie algebra elements
- On the realisation of maximal simple types and epsilon factors of pairs
- RATIONAL POINTS ON ELLIPTIC CURVES GRAHAM EVEREST, JONATHAN REYNOLDS AND SHAUN STEVENS
- SMOOTH REPRESENTATIONS OF GL m (D) V: ENDO-CLASSES
- Covers for self-dual supercuspidal representations of the Siegel Levi subgroup of classical p-adic groups
- MERTENS' THEOREM FOR TORAL AUTOMORPHISMS SAWIAN JAIDEE, SHAUN STEVENS, AND THOMAS WARD
- TYPES AND REPRESENTATIONS OF p -ADIC SYMPLECTIC GROUPS
- REPR'ESENTATIONS LISSES DE GL m (D) IV : REPR'ESENTATIONS SUPERCUSPIDALES
- DIRICHLET SERIES FOR FINITE COMBINATORIAL RANK DYNAMICS
- ORBIT-COUNTING IN NON-HYPERBOLIC DYNAMICAL SYSTEMS
- SMOOTH REPRESENTATIONS OF GL m (D) VI : SEMISIMPLE TYPES
- Semisimple characters for p-adic classical groups Shaun Stevens*
- AUTOMORPHISMS WITH EXOTIC ORBIT GROWTH STEPHAN BAIER, SAWIAN JAIDEE, SHAUN STEVENS, AND THOMAS WARD
