A method of spherical harmonic analysis in the geosciences via hierarchical Bayesian inference

Muir, Jack B.; Tkalčić, Hrvoje

doi:10.1093/gji/ggv361

Cited by 7 publications

(7 citation statements)

References 32 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…To investigate the effect of CMB topography on our results, we compare tomographic models derived from: 1) PKPab-PKIKP and 2) PcP-P datasets. The two independent datasets result in similar models of harmonic degrees 1 and 2 using the Bayesian hierarchical method of Muir and Tkalčić 19 , illustrating that large scale CMB topography does not have a dominant impact on travel times of these two datasets ( Figure S1 ). In the case that CMB topography had a strong degree 1 or degree 2 signal dominating the velocity heterogeneity, it would generate PKPab-PKIKP and PcP-P differential travel times of opposite sign, resulting in negatively correlated velocity anomalies between the two models, which we do not see.…”

mentioning

confidence: 81%

Strong, Multi-Scale Heterogeneity in Earth’s Lowermost Mantle

Tkalčić

Young

Muir

et al. 2015

Sci Rep

View full text Add to dashboard Cite

The core mantle boundary (CMB) separates Earth’s liquid iron outer core from the solid but slowly convecting mantle. The detailed structure and dynamics of the mantle within ~300 km of this interface remain enigmatic: it is a complex region, which exhibits thermal, compositional and phase-related heterogeneity, isolated pockets of partial melt and strong variations in seismic velocity and anisotropy. Nonetheless, characterising the structure of this region is crucial to a better understanding of the mantle’s thermo-chemical evolution and the nature of core-mantle interactions. In this study, we examine the heterogeneity spectrum from a recent P-wave tomographic model, which is based upon trans-dimensional and hierarchical Bayesian imaging. Our tomographic technique avoids explicit model parameterization, smoothing and damping. Spectral analyses reveal a multi-scale wavelength content and a power of heterogeneity that is three times larger than previous estimates. Inter alia, the resulting heterogeneity spectrum gives a more complete picture of the lowermost mantle and provides a bridge between the long-wavelength features obtained in global S-wave models and the short-scale dimensions of seismic scatterers. The evidence that we present for strong, multi-scale lowermost mantle heterogeneity has important implications for the nature of lower mantle dynamics and prescribes complex boundary conditions for Earth’s geodynamo.

show abstract

mentioning

confidence: 81%

Strong, Multi-Scale Heterogeneity in Earth’s Lowermost Mantle

Tkalčić

Young

Muir

et al. 2015

Sci Rep

View full text Add to dashboard Cite

show abstract

“…This allows for the noise in the data to be properly accounted for without requiring subjective, and usually wrong, user input quantifying the uncertainty associated with the data. This technique has been applied extensively in the geophysical literature (e.g., Bodin, Sambridge, Rawlinson, & Arroucau, ; Bodin, Sambridge, Tkalcic, et al, ; Kolb & Lekić, ; Muir & Tkalčić, ). This is an improvement on Grose et al () where the data are smoothed using a radial basis interpolation scheme and no specific assumptions are made about the noise in the data.…”

Section: A Probabilistic Framework For Modeling Fold Geometriesmentioning

confidence: 99%

“…Bayesian inference is a commonly used method for solving nonlinear problems with extensive application in geosciences particularly in solving inverse problems in geophysics (e.g. Kolb & Lekić, 2014;Mosegaard & Tarantola, 1995;Muir & Tkalčić, 2015). The main advantage of using Bayesian methods over standard statistical methods is in the ability to incorporate additional knowledge in the form of prior distributions.…”

Section: Bayesian Inferencementioning

confidence: 99%

“…When using structural observations to create a 3‐D model, or in this case characterize the fold geometry, we are actually interested in the combined misfit between the model and the structural observations, that is, how closely do we expect the model to fit the data. Rather than adding further subjectivity into the modeling process, uncertainty of structural observations can be incorporated using a hierarchical Bayesian approach where the data uncertainty is represented by an additional PDF, similar to Muir and Tkalčić (). The misfit ( σ ) between the observed fold rotation angle and the model (equation ) is represented using an uninformed hyperparameter, Jeffery's prior (Sivia, ).…”

Section: A Probabilistic Framework For Modeling Fold Geometriesmentioning

confidence: 99%

See 1 more Smart Citation

Inversion of Structural Geology Data for Fold Geometry

et al. 2018

View full text Add to dashboard Cite

Recent developments in structural modeling techniques have dramatically increased the capability to incorporate fold‐related data into the modeling workflow. However, these techniques are lacking a mathematical framework for properly addressing structural uncertainties. Previous studies investigating structural uncertainties have focused on the sensitivity of the interpolator to perturbing the input data. These approaches do not incorporate conceptual uncertainty about the geological structures and interpolation process to the overall uncertainty estimate. In this work, we frame structural modeling as an inverse problem and use a Bayesian framework to reconcile structural parameters and data uncertainties. Bayesian inference is applied for determining the posterior probability distribution of fold parameters given a set of structural observations and prior distributions based on general geological knowledge and regional observations. This approach allows for an inversion of structural geology data, where each realization can differ in the structural description of the fold geometries, instead of finding only a single best fit solution. We show that analyzing the variability between the resulting models highlights uncertainties associated with the geometry of regional structures. These areas can be used to target where additional data would be most beneficial for improving the model quality and efficiently reducing structural uncertainty.

show abstract

“…In case the results have no statistically significant effects, then the number is sufficiently large. Muir and Tkalčić (2015) utilized the corrected Akaike information criterion AIC to choose an optimal maximum order of expansion for irregular data on the sphere in a hierarchical Bayesian setting. The results show that the third-fifth orders of expansion in SHs are generally a turning point from fast to slow reduction in AIC in terms of balancing explanatory power with simplicity (although not the smallest AIC).…”

Section: Guidance For the Number Of Basis Functionsmentioning

confidence: 99%

Computer Model Calibration with Large Non-Stationary Spatial Outputs: Application to the Calibration of a Climate Model

Chang

Guillas

2018

Journal of the Royal Statistical Society Series C: Applied Statistics

View full text Add to dashboard Cite

Summary Bayesian calibration of computer models tunes unknown input parameters by comparing outputs with observations. For model outputs that are distributed over space, this becomes computationally expensive because of the output size. To overcome this challenge, we employ a basis representation of the model outputs and observations: we match these decompositions to carry out the calibration efficiently. In the second step, we incorporate the non‐stationary behaviour, in terms of spatial variations of both variance and correlations, in the calibration. We insert two integrated nested Laplace approximation–stochastic partial differential equation parameters into the calibration. A synthetic example and a climate model illustration highlight the benefits of our approach.

show abstract

A method of spherical harmonic analysis in the geosciences via hierarchical Bayesian inference

Cited by 7 publications

References 32 publications

Strong, Multi-Scale Heterogeneity in Earth’s Lowermost Mantle

Strong, Multi-Scale Heterogeneity in Earth’s Lowermost Mantle

Inversion of Structural Geology Data for Fold Geometry

Computer Model Calibration with Large Non-Stationary Spatial Outputs: Application to the Calibration of a Climate Model

Contact Info

Product

Resources

About