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Stochastic Analysis and Applications Volume 37, 2019 - Issue 3
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Articles

Path dependent equations driven by Hölder processes

Rafael Andretto CastrequiniENSTA ParisTech, Université Paris-Saclay, Unité de Mathématiques appliquées, Palaiseau, France
&
Francesco RussoENSTA ParisTech, Université Paris-Saclay, Unité de Mathématiques appliquées, Palaiseau, FranceCorrespondence[email protected]
Pages 480-498 | Received 14 Sep 2017, Accepted 12 Feb 2019, Published online: 19 Mar 2019

References

  • Chojnowska-Michalik, A. (1978). Representation theorem for general stochastic delay equations. Bull. Acad. Polon. Sci. Sér. Sci. Math. Astronom. Phys. 26(7):635–642.
  • Delfour, M. C., Mitter, S. K. (1972). Controllability, observability and optimal feedback control of affine hereditary differential systems. SIAM J. Control 10(2):298–328.
  • Mohammed, S. E. A. (1984). Stochastic Functional Differential Equations, Research Notes in Mathematics, vol. 99. Boston, MA: Pitman (Advanced Publishing Program).
  • Rogers, L. C. G., Williams, D. (2000). Diffusions, Markov processes, and martingales, Vol. 2, Itô Calculus. Cambridge: Cambridge Mathematical Library, Cambridge University Press. Reprint of the second (1994) edition.
  • Cosso, A., Russo, F. (2016). Functional itô versus banach space stochastic calculus and strict solutions of semilinear path-dependent equations. Infin. Dimens. Anal. Quantum Probab. Relat. Top. 19(04):1650024–1650044.
  • Di Girolami, C., Russo, F. (2010). Infinite dimensional stochastic calculus via regularization and applications. Preprint HAL-INRIA, inria-00473947 version 1 no. Unpublished.
  • Di Girolami, C., Russo, F. (2011). Clark-Ocone type formula for non-semimartingales with finite quadratic variation. C. R. Math. Acad. Sci. Paris 349(3-4):209–214.
  • Di Girolami, C., Russo, F. (2014). Generalized covariation for Banach space valued processes, Itô formula and applications. Osaka J. Math. 51(3):729–783.
  • Flandoli, F., Zanco, G. (2016). An infinite-dimensional approach to path-dependent Kolmogorov equations. Ann. Probab. 44(4):2643–2693. DOI: 10.1214/15-AOP1031.
  • Leão, D., Ohashi, A., Simas, A. B. (2018). A weak version of path-dependent functional Itô calculus. Ann. Probab. 46(6):3399–3441. DOI: 10.1214/17-AOP1250.
  • Young, L. C. (1936). An inequality of the Hölder type, connected with Stieltjes integration. Acta Math. 67(0):251–282. DOI: 10.1007/BF02401743.
  • Gubinelli, M. (2004). Controlling rough paths. J. Funct. Anal. 216(1):86–140. DOI: 10.1016/j.jfa.2004.01.002.
  • Friz, P. K., Hairer, M. (2014). A Course on Rough Paths. Cham: Springer.
  • Lejay, A. (2010). Controlled differential equations as young integrals: a simple approach. J. Differ. Equ. 249(8):1777–1798. DOI: 10.1016/j.jde.2010.05.006.
  • Lyons, T. (1994). Differential equations driven by rough signals. I. An extension of an inequality of L. C. Young. Math. Res. Lett. 1(4):451–464. DOI: 10.4310/MRL.1994.v1.n4.a5.
  • Gubinelli, M., Lejay, A., Tindel, S. (2006). Young integrals and spdes. Potential Anal. 25(4):307–326. DOI: 10.1007/s11118-006-9013-5.
  • Maslowski, B., Nualart, D. (2003). Evolution equations driven by a fractional brownian motion. J. Funct. Anal. 202(1):277–305.
  • Neuenkirch, A., Nourdin, I., Tindel, S. (2008). Delay equations driven by rough paths. Electron. J. Probab. 13(0):2031–2068. DOI: 10.1214/EJP.v13-575.
  • Lejay, A. (2012). Global solutions to rough differential equations with unbounded vector fields, Séminaire de Probabilités XLIV, Lecture Notes in Math., vol. 2046. Heidelberg: Springer, pp. 215–246.
  • Bailleul, I., Gubinelli, M. (2017). Unbounded rough drivers. Ann. Fac. Sci. Toulouse Math. (6) 26(4):795–830. no. MR 3746643
  • Friz, P. K., Victoir, N. B. (2010). Multidimensional Stochastic Processes as Rough Paths: theory and Applications. Cambridge: Cambridge University Press.
  • Dupire, B. (2009). Functional Itô Calculus, Bloomberg Portfolio Research Paper no. 2009-04.
  • Bonsall, F. F., Vedak, K. B. (1962). Lectures on Some Fixed Point Theorems of Functional Analysis, no. 26, Bombay: Tata Institute of Fundamental Research Bombay,

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