JOURNAL ARTICLE
Solving parabolic Wick-stochastic boundary value problems using a finite element method
Year: 2003 Journal: Stochastics and stochastics reports Vol: 75 (1-2)Pages: 57-92
Abstract
A class of linear parabolic stochastic boundary value problems of Wick-type is studied. The equations are understood in a weak sense on a suitable stochastic distribution space, and existence and uniqueness results are provided. The paper continues to discuss a numerical method for this type of problem, based on a Galerkin type of approximation. Estimates showing linear convergence in time and space are derived, and rate of convergence results for the stochastic dimension are reported.
Keywords:
Mathematics Uniqueness Mathematical analysis Finite element method Galerkin method Type (biology) Parabolic partial differential equation Convergence (economics) Boundary value problem Applied mathematics Rate of convergence Dimension (graph theory) Space (punctuation) Partial differential equation Computer science
Metrics
17
Cited By
2.60
FWCI (Field Weighted Citation Impact)
33
Refs
0.91
Citation Normalized Percentile
Is in top 1%
Is in top 10%
Citation History
Topics
Stochastic processes and financial applications
Social Sciences → Economics, Econometrics and Finance → Finance
Housing Market and Economics
Social Sciences → Economics, Econometrics and Finance → Economics and Econometrics
Probabilistic and Robust Engineering Design
Social Sciences → Decision Sciences → Statistics, Probability and Uncertainty
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