Derived control theorems for reductive groups
Number Theory
2021-06-07 v2
Authors:
Rob Rockwood
Abstract
We prove Hida-style control theorems in the derived setting for a large class of reductive groups tailored for applications to Euler systems.
Cite
@article{arxiv.2105.13735,
title = {Derived control theorems for reductive groups},
author = {Rob Rockwood},
journal= {arXiv preprint arXiv:2105.13735},
year = {2021}
}
Comments
20 pages
Related papers
View all related →
Number Theory · Mathematics
Control Theorems for Hilbert Modular Varieties
Arshay Sheth
2025-04-30
Number Theory · Mathematics
Hida theory for special orders
Luca Dall'Ava
2022-06-22
Optimization and Control · Mathematics
Solution Curve for Linear Control Systems on Lie Groups
João Paulo Lima de Oliveira, Alexandre J. Santana, Simão N. Stelmastchuk
2019-12-02
Optimization and Control · Mathematics
Controllability of reduced systems
Petre Birtea, Mircea Puta, Tudor S. Ratiu
2007-05-23
Optimization and Control · Mathematics
Controllability of discrete-time linear systems on solvable Lie groups
Thiago Cavalheiro, Alexandre Santana, João Cossich, Victor Ayala
2024-06-11
Systems and Control · Electrical Eng. & Systems
Amidst data-driven model reduction and control
Nima Monshizadeh
2021-12-14
Functional Analysis · Mathematics
A Restriction Theorem for M\'etivier Groups
Valentina Casarino, Paolo Ciatti
2023-02-14
Dynamical Systems · Mathematics
Approximate controllability of second-order evolution differential inclusions in Hilbert spaces
N. I. Mahmudov, V. Vijayakumar, R. Murugesu
2015-02-03
Mathematical Physics · Physics
Applications of Lie systems in Quantum Mechanics and Control Theory
José F. Cariñena, Arturo Ramos
2007-05-23
Optimization and Control · Mathematics
Noether's Theorem for Control Problems on Time Scales
Agnieszka B. Malinowska, Moulay Rchid Sidi Ammi
2014-06-04
Optimization and Control · Mathematics
Differential Dynamic Programming on Lie Groups: Derivation, Convergence Analysis and Numerical Results
George I. Boutselis, Evangelos Theodorou
2018-09-24
Geometric Topology · Mathematics
Stability in controlled L-theory
Erik K. Pedersen, Masayuki Yamasaki
2009-03-18
Dynamical Systems · Mathematics
Control sets of linear systems on Lie groups
Adriano Da Silva, Victor Ayala, Guilherme Zsigmond
2016-02-18
Mathematical Physics · Physics
Motion on Lie groups and its applications in Control Theory
José F. Cariñena, Jesús Clemente-Gallardo, Arturo Ramos
2009-11-10
Optimization and Control · Mathematics
Approximate Controllability of Fractional Nonlocal Delay Semilinear Systems in Hilbert Spaces
Amar Debbouche, Delfim F. M. Torres
2013-11-26
Representation Theory · Mathematics
Hodge theory and unitary representations of reductive Lie groups
Wilfried Schmid, Kari Vilonen
2012-06-26
Optimization and Control · Mathematics
On Classical Control and Smart Cities
Andre R. Fioravanti, Jakub Marecek, Robert N. Shorten, Matheus Souza +1
2018-02-27
Mathematical Physics · Physics
Discrete second-order Euler-Poincar\'e equations. Applications to optimal control
Leonardo Colombo, Fernando Jimenez, David Martin de Diego
2011-09-23
Optimization and Control · Mathematics
Controllability of cascade coupled systems of multi-dimensional evolution PDE's by a reduced number of controls
Fatiha Alabau-Boussouira
2011-11-08
Robotics · Computer Science
Lie-algebra Adaptive Tracking Control for Rigid Body Dynamics
Jiawei Tang, Shilei Li, Ling Shi
2025-02-11
Representation Theory · Mathematics
A Noether-Deuring theorem for derived categories
Alexander Zimmermann
2012-01-16
Classical Analysis and ODEs · Mathematics
Euler Estimates of Rough Differential Equations
Peter Friz, Nicolas Victoir
2007-05-23
Representation Theory · Mathematics
The graded centers of derived discrete algebras
Grzegorz Bobinski
2009-06-09
Optimization and Control · Mathematics
Control sets of one-input linear control systems on solvable, nonnilpotent 3D Lie groups
Adriano Da Silva, Lino Grama, Alejandro Otero Robles
2023-10-04
Probability · Mathematics
The inverse problem for rough controlled differential equations
I. Bailleul, J. Diehl
2014-11-17