Efe, M. Ö.Özbay, Hitay2016-02-082016-02-0820031387-3954http://hdl.handle.net/11693/24383This paper focuses on the multi-input dynamical modeling of one-dimensional heat conduction process with uncertainty on thermal diffusivity parameter. Singular value decomposition is used to extract the most significant modes. The results of the spatiotemporal decomposition have been used in cooperation with Galerkin projection to obtain the set of ordinary differential equations, the solution of which synthesizes the temporal variables. The spatial properties have been generalized through a series of test cases and a low order model has been obtained. Since the value of the thermal diffusivity parameter is not known perfectly, the obtained model contains uncertainty. The paper describes how the uncertainty is modeled and how the boundary conditions are separated from the remaining terms of the dynamical equations. The results have been compared with those obtained through analytic solution. © Taylor and Francis Ltd.EnglishHeat conductionInfinite dimensional systemModel reductionMulti-input modelingSingular value decompositionConduction processDynamical equationGalerkin projectionsInfinite-dimensional systemModel reductionMultiinputOne-dimensional heatSpatio-temporal decompositionHeat conductionOrdinary differential equationsSingular value decompositionUncertainty analysisBoundary conditionsFluid flowHeat conductionHeat transferMathematical modelingMulti input dynamical modeling of heat flow with uncertain diffusivity parameterArticle10.1076/mcmd.9.4.437.27902