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Multi-variate factorisation of numerical simulations

Daniel J. Lunt, Deepak Chandan, Alan M. Haywood, G Lunt, J Rougier, Ulrich Salzmann, Gavin A. Schmidt, Paul J. Valdes

2021Geoscientific model development18 citationsDOIOpen Access PDF

Abstract

Abstract. Factorisation (also known as “factor separation”) is widely used in the analysis of numerical simulations. It allows changes in properties of a system to be attributed to changes in multiple variables associated with that system. There are many possible factorisation methods; here we discuss three previously proposed factorisations that have been applied in the field of climate modelling: the linear factorisation, the Stein and Alpert (1993) factorisation, and the Lunt et al. (2012) factorisation. We show that, when more than two variables are being considered, none of these three methods possess all four properties of “uniqueness”, “symmetry”, “completeness”, and “purity”. Here, we extend each of these factorisations so that they do possess these properties for any number of variables, resulting in three factorisations – the “linear-sum” factorisation, the “shared-interaction” factorisation, and the “scaled-residual” factorisation. We show that the linear-sum factorisation and the shared-interaction factorisation reduce to be identical in the case of four or fewer variables, and we conjecture that this holds for any number of variables. We present the results of the factorisations in the context of three past studies that used the previously proposed factorisations.

Topics & Concepts

FactorizationMathematicsContext (archaeology)Applied mathematicsVariable (mathematics)ResidualConjectureComputational chemistryStatistical physicsPure mathematicsChemistryAlgorithmPhysicsMathematical analysisPaleontologyBiologyClimate variability and modelsAtmospheric chemistry and aerosolsMeteorological Phenomena and Simulations
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