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| Name: |
Professor T Lyons |
| Organisation: |
University of Oxford |
| Department: |
Mathematical Institute |
| Current EPSRC-Supported Research
Topics: |
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Continuum Mechanics
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Mathematical Analysis
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Statistics & Appl. Probability
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Vision & Senses - ICT appl.
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| Current EPSRC Support |
| EP/S026347/1 | Unparameterised multi-modal data, high order signatures, and the mathematics of data science | (P) |
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| Previous EPSRC Support |
| EP/H000100/1 | Increasing the efficiency of numerical methods for estimating the state of a partially observed system. High order methods for solving parabolic PDEs | (P) |
| EP/H001476/1 | WORKSHOP: Spectral and Cubature Methods in Finance and Econometrics | (C) |
| EP/F029578/1 | Rough path analysis and non-linear stochastic systems | (P) |
| GR/S75628/01 | Approximation schemes & anticipation in stochastic integration | (P) |
| GR/S18526/01 | Partial Differential Equations - A rough path approach | (P) |
| GR/R29628/01 | Digital Descriptions For Serial Data Streams | (P) |
| GR/L35546/01 | MEROMORPHIC FUNCTIONS AND DYNAMICS | (C) |
| GR/L37038/01 | STOCHASTIC AREA ON FRACTALS | (P) |
| GR/L48553/01 | SYMMETRIC PROCESSES IN INHOMOGENEOUS DOMAINS | (P) |
| GR/K69704/01 | PARTICLE APPROXIMATIONS IN NONLINEARFILTERING | (P) |
| GR/J65204/01 | STOCHASTIC ANALYSIS- QUESTIONS IN LARGE DEVIATIONS AND CONVERGENCE TO EQUILIBRIUM | (P) |
| GR/J55946/01 | DIRICHLET PROCESSES IN ANALYSIS | (P) |
| GR/H08372/01 | DIRICHLET PROCESSES IN ANALYSIS | (P) |
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Key: (P)=Principal Investigator, (C)=Co-Investigator, (R)=Researcher Co-Investigator
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