Mathematical Sciences

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Stochastic Dynamical Systems and Ergodicity: School and Workshops

Loughborough University and Shandong University 2016-2018

The Stochastic Dynamical Systems and Ergodicity events will take place on the following dates:

  • School, Loughborough University: 5-9 December 2016 - Registration is now open! 

School, Loughborough University: 5-9 December 2016

The event will be held in room SCH.0.13 in the Schofield Building on campus. A number of talks will be given by a range of speakers (confirmed below).

Invited Lecturers:

Invited Speakers:

There will also be an LMS sponsored East Midlands Stochastic Analysis Seminar organised by Zdzislaw Brzezniak (York), David Elworthy (Warwick), Xue-Mei Li (Warwick), Zhongmin Qian (Oxford) and Huaizhong Zhao (Loughborough).

The Department has some funding from the London Mathematical Society to support UK based PhD students, to cover a limited number of on campus accommodation. Please indicate when registering if you are a UK based PhD student and if you require funding.

 

There will be a mandatory registration fee of £10 per delegate per day. Registration is now open.

Future events

  • Workshop 1, Shandong University (Weihai): 7-11 August 2017
  • Workshop 2, Loughborough University: 23-27 July 2018

These events are supported by the Royal Society, the National Natural Science Foundation of China and the London Mathematical Society.

Event Organisers: Chunrong Feng (Loughborough), Juan Li (Shandong) and Huaizhong Zhao (Loughborough)

Scientific CommitteeDavid Elworthy (Warwick), Martin Hairer (Warwick), Terry Lyons (Oxford), Zhiming Ma (CAS, Beijing), Shige Peng (Shandong) and Michael Rockner (Bielefeld)

About these events

Ergodic theory, stochastic analysis and probability theory are intimately related research areas. In particular, ergodic theory can give information about many aspects of the long term behaviour of random dynamical systems both in the sense of laws and pathwise. The aim of this series of school/workshops is to discuss modern developments concerning the appearance and application of ergodicity in stochastic analysis and in general random dynamical systems, and to analyse the interactions between these topics and with real world applications.

The topics covered may include:- stochastic flows; stationary processes; random periodic processes; invariant measures; periodic measures; spectral analysis and inequalities; law of large numbers and ergodicity; invariant manifolds and MET; stochastic PDEs; infinite dimensional random dynamical systems; infinite dimensional PDEs; non-Markovian random dynamical systems; rough path and signature; analysis under nonlinear expectations; regularity structure; numerical analysis; applications including in environmental sciences, biology, finance, fluids, control systems, data analysis etc.