Rough path

In stochastic analysis, a rough path is an analytical and algebraic object associated to an irregular path allowing one to define and study solutions to differential equations controlled by such irregular paths, for example a Wiener process. The theory was developed in the 1990s by Terry Lyons.[1][2][3] Several accounts of the theory are available.[4][5][6][7] Martin Hairer used rough paths to solve the KPZ equation.[8] He then proposed a significant generalization known as the theory of regularity structures.[9] For this work he was awarded a Fields medal in 2014 .

References

  1. Lyons, T. (1998). "Differential equations driven by rough signals". Revista Matemática Iberoamericana: 215–310. doi:10.4171/RMI/240.
  2. Lyons, Terry; Qian, Zhongmin (2002). "System Control and Rough Paths". Oxford Mathematical Monographs. Oxford: Clarendon Press. doi:10.1093/acprof:oso/9780198506485.001.0001. ISBN 9780198506485. Zbl 1029.93001.
  3. Lyons, Terry; Caruana, Michael; Levy, Thierry (2007). Differential equations driven by rough paths, vol. 1908 of Lecture Notes in Mathematics. Springer.
  4. Lejay, A. (2003). "An Introduction to Rough Paths". Séminaire de Probabilités XXXVII. Lecture Notes in Mathematics 1832. pp. 1–1. doi:10.1007/978-3-540-40004-2_1. ISBN 978-3-540-20520-3.
  5. Gubinelli, Massimiliano (2004). "Controlling rough paths". Journal of Functional Analysis 216 (1): 86–140. doi:10.1016/j.jfa.2004.01.002.
  6. Friz, Peter K.; Victoir, Nicolas (2010). Multidimensional Stochastic Processes as Rough Paths: Theory and Applications (Cambridge Studies in Advanced Mathematics ed.). Cambridge University Press.
  7. Friz, Peter K.; Hairer, Martin (2014). A Course on Rough Paths, with an introduction to regularity structures. Springer.
  8. Hairer, Martin (2013). "Solving the KPZ equation". Annals of Mathematics 178 (2): 559–664. doi:10.4007/annals.2013.178.2.4.
  9. Hairer, Martin (2014). "A theory of regularity structures". Inventiones Mathematicae 198: 269–504. doi:10.1007/s00222-014-0505-4.


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