Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion

Andrea Cosso; Francesco Russo

doi:10.1007/978-3-319-23425-0_2

Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion

Andrea Cosso
, Francesco Russo

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

Abstract

First, we revisit basic theory of functional Itô/path-dependent calculus, using the formulation of calculus via regularization. Relations with the corresponding Banach space valued calculus are explored. The second part of the paper is devoted to the study of the Kolmogorov type equation associated with the so called window Brownian motion, called path-dependent heat equation, for which well-posedness at the level of strict solutions is established. Then, a notion of strong approximating solution, called strong-viscosity solution, is introduced which is supposed to be a substitution tool to the viscosity solution. For that kind of solution, we also prove existence and uniqueness.

Original language	English
Title of host publication	Stochastics of Environmental and Financial Economics
Editors	Fred Espen Benth, Giulia Di Nunno
Publisher	Springer New York LLC
Pages	27-80
Number of pages	54
ISBN (Print)	9783319234243
DOIs	https://doi.org/10.1007/978-3-319-23425-0_2
Publication status	Published - 1 Jan 2016
Externally published	Yes

Publication series

Name	Springer Proceedings in Mathematics and Statistics
Volume	138
ISSN (Print)	2194-1009
ISSN (Electronic)	2194-1017

Keywords

Banach space stochastic calculus
Calculus via regularization
Functional itô/path-dependent calculus
Horizontal and vertical derivative
Strong-viscosity solutions

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10.1007/978-3-319-23425-0_2

Cite this

Cosso, A., & Russo, F. (2016). Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion. In F. E. Benth, & G. Di Nunno (Eds.), Stochastics of Environmental and Financial Economics (pp. 27-80). (Springer Proceedings in Mathematics and Statistics; Vol. 138). Springer New York LLC. https://doi.org/10.1007/978-3-319-23425-0_2

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abstract = "First, we revisit basic theory of functional It{\^o}/path-dependent calculus, using the formulation of calculus via regularization. Relations with the corresponding Banach space valued calculus are explored. The second part of the paper is devoted to the study of the Kolmogorov type equation associated with the so called window Brownian motion, called path-dependent heat equation, for which well-posedness at the level of strict solutions is established. Then, a notion of strong approximating solution, called strong-viscosity solution, is introduced which is supposed to be a substitution tool to the viscosity solution. For that kind of solution, we also prove existence and uniqueness.",

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Cosso, A & Russo, F 2016, Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion. in FE Benth & G Di Nunno (eds), Stochastics of Environmental and Financial Economics. Springer Proceedings in Mathematics and Statistics, vol. 138, Springer New York LLC, pp. 27-80. https://doi.org/10.1007/978-3-319-23425-0_2

Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion. / Cosso, Andrea; Russo, Francesco.
Stochastics of Environmental and Financial Economics. ed. / Fred Espen Benth; Giulia Di Nunno. Springer New York LLC, 2016. p. 27-80 (Springer Proceedings in Mathematics and Statistics; Vol. 138).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

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AU - Russo, Francesco

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PY - 2016/1/1

Y1 - 2016/1/1

N2 - First, we revisit basic theory of functional Itô/path-dependent calculus, using the formulation of calculus via regularization. Relations with the corresponding Banach space valued calculus are explored. The second part of the paper is devoted to the study of the Kolmogorov type equation associated with the so called window Brownian motion, called path-dependent heat equation, for which well-posedness at the level of strict solutions is established. Then, a notion of strong approximating solution, called strong-viscosity solution, is introduced which is supposed to be a substitution tool to the viscosity solution. For that kind of solution, we also prove existence and uniqueness.

AB - First, we revisit basic theory of functional Itô/path-dependent calculus, using the formulation of calculus via regularization. Relations with the corresponding Banach space valued calculus are explored. The second part of the paper is devoted to the study of the Kolmogorov type equation associated with the so called window Brownian motion, called path-dependent heat equation, for which well-posedness at the level of strict solutions is established. Then, a notion of strong approximating solution, called strong-viscosity solution, is introduced which is supposed to be a substitution tool to the viscosity solution. For that kind of solution, we also prove existence and uniqueness.

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KW - Calculus via regularization

KW - Functional itô/path-dependent calculus

KW - Horizontal and vertical derivative

KW - Strong-viscosity solutions

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BT - Stochastics of Environmental and Financial Economics

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Functional and banach space stochastic calculi: Path-dependent kolmogorov equations associated with the frame of a brownian motion

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