Spatio-Temporal Reconstructions of Global CO2-Fluxes using Gaussian Markov Random Fields

Johan Linstr\"om; Marko Scholze; Unn Dahlen

arxiv: 1907.02706 · v1 · pith:OGYCWX2Snew · submitted 2019-07-05 · 📊 stat.AP · stat.CO· stat.ME

Spatio-Temporal Reconstructions of Global CO2-Fluxes using Gaussian Markov Random Fields

Unn Dahlen , Johan Linstr\"om , Marko Scholze This is my paper

Pith reviewed 2026-05-25 02:18 UTC · model grok-4.3

classification 📊 stat.AP stat.COstat.ME

keywords CO2 flux reconstructionGaussian Markov Random Fieldsatmospheric inverse modellingspatio-temporal covarianceMatern covarianceintegrated fluxes

0 comments

The pith

CO2 fluxes modeled as continuous Gaussian Markov Random Fields avoid aggregation errors from discrete point representations.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper shows how to reconstruct global CO2 fluxes from atmospheric observations by modeling the fluxes as Gaussian Markov Random Fields on a spatially continuous domain. Instead of using discrete flux points, it uses integrated fluxes at the transport model's resolution. This approach yields a Matérn-like spatial covariance and an auto-regressive temporal covariance with seasonal dependence. A reader would care because it addresses the ill-conditioned inverse problem more accurately by reducing errors in the flux covariance structure.

Core claim

By modelling fluxes using Gaussian Markov Random Fields on a continuous domain and replacing discrete representations with integrated fluxes, the method removes aggregation errors in the flux covariance and provides a model closer to real-life space-time continuous fluxes.

What carries the argument

Gaussian Markov Random Fields with Matérn-like spatial covariance and auto-regressive temporal model with seasonal dependence, applied to integrated fluxes on continuous domain.

If this is right

Flux covariance is free of aggregation errors caused by discrete point approximations.
The model is computationally beneficial and flexible for spatio-temporal reconstructions.
Reconstructed fluxes better resemble continuous real-world processes.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

This could extend to other trace gases in atmospheric inverse problems.
Integrated flux approach may reduce biases in regional flux estimates.

Load-bearing premise

Fluxes can be adequately modeled and constrained as latent Gaussian fields with mean structure from prior estimates combining process modeling and statistical bookkeeping.

What would settle it

A comparison showing that the new continuous model produces flux estimates with lower error against independent validation data than traditional discrete models would support the claim; mismatch in covariance properties would falsify it.

Figures

Figures reproduced from arXiv: 1907.02706 by Johan Linstr\"om, Marko Scholze, Unn Dahlen.

**Figure 2.** Figure 2: Network of global measurement stations. The observations locations marked with blue [PITH_FULL_IMAGE:figures/full_fig_p010_2.png] view at source ↗

**Figure 3.** Figure 3: Results for the simulation study using observations simulated from the bottom-up fluxes. [PITH_FULL_IMAGE:figures/full_fig_p015_3.png] view at source ↗

**Figure 4.** Figure 4: Observed atmospheric CO2 concentrations (black crosses) at the six validation sites (see [PITH_FULL_IMAGE:figures/full_fig_p018_4.png] view at source ↗

**Figure 5.** Figure 5: Estimated flux anomalies for July 1999, using the six different models. The first two rows [PITH_FULL_IMAGE:figures/full_fig_p019_5.png] view at source ↗

**Figure 6.** Figure 6: Approximate standard deviations for the land and ocean anomalies estimated using the [PITH_FULL_IMAGE:figures/full_fig_p020_6.png] view at source ↗

**Figure 7.** Figure 7: Averaged land and ocean fluxes [kgC/(year · m2 )] over the period 01/1996-12/2000 using the B12-model. 22 [PITH_FULL_IMAGE:figures/full_fig_p022_7.png] view at source ↗

**Figure 8.** Figure 8: Average seasonal land and ocean fluxes [kgC [PITH_FULL_IMAGE:figures/full_fig_p023_8.png] view at source ↗

**Figure 9.** Figure 9: Posterior fluxes integrated over different regions and deseasonalized. The top row gives [PITH_FULL_IMAGE:figures/full_fig_p025_9.png] view at source ↗

**Figure 10.** Figure 10: The availability of observations over time for all stations. A more detailed description of [PITH_FULL_IMAGE:figures/full_fig_p030_10.png] view at source ↗

**Figure 11.** Figure 11: The numerical integration of basis functions to the observation grid, [PITH_FULL_IMAGE:figures/full_fig_p032_11.png] view at source ↗

**Figure 12.** Figure 12: Part of the observation matrix related to a single location, [PITH_FULL_IMAGE:figures/full_fig_p037_12.png] view at source ↗

**Figure 13.** Figure 13: The matrix ivec(AT i ), composed into sub-matrices ivec(AT c,i), ivec(AT a,i), and a zero matrix. S2.4 Computational costs Considering the necessary computations; the Choleskey factors Rt, Rs, and L scale as O(nt), O(n 3/2 s ) and O(n 3 obs), respectively. The different computational cost depends on the sparsity due to the temporal and spatial GMRFs (Rue and Held, 2004, Ch. 2.4). Given the Choleskey facto… view at source ↗

**Figure 14.** Figure 14: Earth divided into eight regions, five continental regions and three ocean regions, for [PITH_FULL_IMAGE:figures/full_fig_p041_14.png] view at source ↗

**Figure 15.** Figure 15: Flux anomalies for January 1999, using the six different models. The first two rows show [PITH_FULL_IMAGE:figures/full_fig_p042_15.png] view at source ↗

**Figure 16.** Figure 16: Flux anomalies for April 1999, using the six different models. The first two rows show [PITH_FULL_IMAGE:figures/full_fig_p043_16.png] view at source ↗

**Figure 17.** Figure 17: Flux anomalies for October 1999, using the six different models. The first two rows show [PITH_FULL_IMAGE:figures/full_fig_p044_17.png] view at source ↗

read the original abstract

Atmospheric inverse modelling is a method for reconstructing historical fluxes of green-house gas between land and atmosphere, using observed atmospheric concentrations and an atmospheric tracer transport model. The small number of observed atmospheric concentrations in relation to the number of unknown flux components makes the inverse problem ill-conditioned, and assumptions on the fluxes are needed to constrain the solution. A common practise is to model the fluxes using latent Gaussian fields with a mean structure based on estimated fluxes from combinations of process modelling (natural fluxes) and statistical bookkeeping (anthropogenic emissions). Here, we reconstruct global \CO flux fields by modelling fluxes using Gaussian Markov Random Fields (GMRF), resulting in a flexible and computational beneficial model with a Mat\'ern-like spatial covariance, and a temporal covariance defined through an auto-regressive model with seasonal dependence. In contrast to previous inversions, the flux is defined on a spatially continuous domain, and the traditionally discrete flux representation is replaced by integrated fluxes at the resolution specified by the transport model. This formulation removes aggregation errors in the flux covariance, due to the traditional representation of area integrals by fluxes at discrete points, and provides a model closer resembling real-life space-time continuous fluxes.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

Continuous-domain GMRF for CO2 fluxes fixes aggregation in the covariance by construction, but the abstract shows no results or validation to judge whether it delivers on accuracy or speed.

read the letter

The paper's core move is to put the flux field on a continuous spatial domain and replace point fluxes with exact integrals over the transport-model grid cells. That step removes the aggregation error in the covariance that comes from pretending area integrals are just point samples. The stress-test note is right that this part holds without internal contradiction once the GMRF is defined continuously and the observation operator integrates properly. The spatial covariance is Matérn-like and the temporal part is a seasonal autoregressive model, both standard but applied here to the integrated setting. The mean is taken from the usual mix of process models and bookkeeping, which is not new but is stated clearly. This is the main technical difference from prior discrete inversions. The formulation itself is described cleanly and the motivation for avoiding aggregation error is direct. No circularity in the parameters is apparent from the abstract. The obvious gap is that nothing is shown: no synthetic tests, no real-data runs, no comparison of posterior uncertainty or computational cost against a discrete baseline. The claim that the model is more realistic and computationally beneficial therefore rests on the construction alone. If the full paper contains those experiments and they are reproducible, the work becomes useful. If not, it stays a modeling note. This is aimed at the atmospheric inverse-modeling community that already uses Gaussian fields for fluxes. A reader who needs to implement or extend covariance structures for integrated observations would find the setup worth looking at. I would send it to peer review because the formulation addresses a real, recurring technical issue and the math appears consistent; referees can then check whether the promised gains appear in practice.

Referee Report

1 major / 1 minor

Summary. The paper proposes reconstructing global CO2 fluxes via atmospheric inverse modeling by representing the fluxes as latent Gaussian fields on a spatially continuous domain using Gaussian Markov Random Fields (GMRFs). The model employs a Matérn-like spatial covariance and an autoregressive temporal covariance with seasonal dependence; the key change is replacing traditional discrete point fluxes with exact integrated fluxes over transport-model grid cells.

Significance. If validated, the continuous-domain formulation would remove a source of covariance aggregation error that arises when area integrals are approximated by point values, yielding a model that more closely matches the underlying space-time continuous process while retaining the computational advantages of GMRFs. The approach is internally consistent by construction once the observation operator integrates the field exactly.

major comments (1)

[Abstract] Abstract, second paragraph: the central claim that the continuous formulation removes aggregation errors is correct by construction, yet the manuscript supplies no numerical results, validation experiments, or quantitative error analysis comparing the integrated-flux GMRF to a traditional discrete-point representation; without these the practical significance of the modeling change cannot be assessed.

minor comments (1)

[Abstract] The abstract does not specify the transport model, grid resolution, or the exact form of the integration operator used to obtain the observation matrix; these details are needed for reproducibility.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their thoughtful review and positive assessment of the internal consistency of the continuous-domain formulation. We address the single major comment below.

read point-by-point responses

Referee: [Abstract] Abstract, second paragraph: the central claim that the continuous formulation removes aggregation errors is correct by construction, yet the manuscript supplies no numerical results, validation experiments, or quantitative error analysis comparing the integrated-flux GMRF to a traditional discrete-point representation; without these the practical significance of the modeling change cannot be assessed.

Authors: We agree that demonstrating the practical magnitude of the aggregation error reduction would strengthen the paper. The current manuscript focuses on the theoretical construction and computational implementation; no direct numerical comparison to a discrete-point baseline is included. In the revised version we will add a dedicated comparison section that (i) derives the difference in the implied covariance matrices under the two representations, (ii) quantifies the resulting discrepancy in the observation operator for a set of synthetic flux fields, and (iii) reports the effect on posterior flux uncertainty and bias in a controlled inversion experiment using the same transport model. revision: yes

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper introduces a GMRF-based model for continuous-domain fluxes with Matérn spatial covariance and AR(1) temporal structure with seasonal dependence. The central methodological claim—that replacing point fluxes with exact grid-cell integrals removes aggregation error—follows directly from the definition of the observation operator and the continuous-domain specification; it is a modeling choice whose correctness is independent of any fitted result or self-citation. No derivation step reduces a claimed prediction or uniqueness result to a parameter fit or to a prior paper by the same authors. The construction is self-contained against external benchmarks for GMRF and AR processes.

Axiom & Free-Parameter Ledger

2 free parameters · 2 axioms · 0 invented entities

The method rests on the domain assumption that CO2 fluxes admit a latent Gaussian representation with the chosen covariance families; no new physical entities are introduced and the mean structure is imported from prior estimates.

free parameters (2)

Matérn spatial covariance parameters
Parameters controlling range and smoothness are part of the GMRF specification and would be set or estimated from data.
Autoregressive temporal parameters with seasonal dependence
Coefficients of the AR process and seasonal terms are required to define the temporal covariance.

axioms (2)

domain assumption Fluxes can be modeled as latent Gaussian fields whose mean is supplied by external process-model and bookkeeping estimates.
Invoked to regularize the ill-conditioned inverse problem (abstract, paragraph 2).
standard math Standard properties of Gaussian Markov Random Fields and Matérn covariances hold on the sphere or projected domain.
Used to obtain the stated spatial covariance structure.

pith-pipeline@v0.9.0 · 5747 in / 1291 out tokens · 36857 ms · 2026-05-25T02:18:41.008887+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

14 extracted references

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Akaike, H. (1969). Fitting autoregressive models for prediction. Annals of the Institute of Statistical Mathematics, 21:243–247. Andres, R. J., Marland, G., Fung, I., and Matthews, E. (1996). A 1 ◦×1◦ distribution of carbon dioxide emissions from fossil fuel consumption and cement manufacture, 1950-1990. Global Bio- geochemical Cycles, 10(3):419–429. Bake...

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[2]

Brenkert, A

Science, 290(5495):1342–1346. Brenkert, A. L. (2003). Carbon dioxide emission estimates from fossil-fuel burning, hydraulic cement production, and gas ﬂaring for 1995 on a one degree grid cell basis. [Available at http://cdiac.esd.ornl.gov/ndps/ndp058a.html]. Brockwell, Peter J. adn Davis, R. A. (2009). Time Series: Theory and Methods . Springer, second e...

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[3]

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annual mean control results and sensitivity to transport and prior ﬂux information. Tellus B: Chemical and Physical Meteorology, 55(2):555–579. Gurney, K. R., Law, R. M., Denning, A. S., Rayner, P. J., Pak, B. C., Baker, D., Bousquet, P., Bruhwiler, L., Chen, Y.-H., Ciais, P., et al. (2004). Transcom 3 inversion intercomparison: Model mean results for the...

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inversion of the transport of CO 2 in the 1980s. Journal of Geophysical Research: Atmospheres, 104(D15):18555–18581. Knorr, W. (2000). Annual and interannual co2 exchanges of the terrestrial biosphere: Process-based simulations and uncertainties. Global Ecology and Biogeography, 9(3):225–252. Lang, A., Schwab, C., et al. (2015). Isotropic gaussian random ...

2000
[5]

Tellus B: Chemical and Physical Meteorology, 55(2):580–595

sensitivity of annual mean results to data choices. Tellus B: Chemical and Physical Meteorology, 55(2):580–595. Le Qu´ er´ e, C., Andrew, R. M., Friedlingstein, P., Sitch, S., Hauck, J., Pongratz, J., Pickers, P. A., Korsbakken, J. I., Peters, G. P., Canadell, J. G., Arneth, A., Arora, V. K., Barbero, L., Bastos, A., Bopp, L., Chevallier, F., Chini, L. P....

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[6]

Lindgren, F

Earth System Science Data , 10(4):2141–2194. Lindgren, F. and Rue, H. (2007). Explicit construction of GMRF approximations to generalised Mat´ ern ﬁelds on irregular grids. Technical Report 12, Centre for Mathematical Sciences, Lund University, Lund, Sweden. Lindgren, F., Rue, H., and Lindstr¨ om, J. (2011). An explicit link between gaussian ﬁelds and gau...

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[7]

Journal of Geophysical Research: Atmospheres , 113(D21)

results using atmospheric measure- ments. Journal of Geophysical Research: Atmospheres , 113(D21). OCO-2 (2019). Orbiting carbon observatory-2 (OCO-2). https://ocov2.jpl.nasa.gov/. accessed 2019-05-15. Peters, W., Miller, J., Whitaker, J., Denning, A., Hirsch, A., Krol, M., Zupanski, D., Bruhwiler, L., and Tans, P. (2005). An ensemble data assimilation sy...

2019
[8]

28 Simpson, D., Illian, J., Lindgren, F., Sorbye, S., and Rue, H. (2016). Going oﬀ grid: Computationally eﬃcient inference for log-gaussian cox processes. Biometrika, online:1–22. Takahashi, T., Sutherland, S. C., Sweeney, C., Poisson, A., Metzl, N., Tilbrook, B., Bates, N., Wan- ninkhof, R., Feely, R. A., Sabine, C., et al. (2002). Global sea–air CO2 ﬂux...

2016
[9]

for each grid cell sk inJ . Given a basis expansion (6) of the spatial ﬁeld, the basis functions are evaluated for each point in the dense grid, and the integrals are approximated using sums, ∫ s∈sk x(s,t )ds = nℓ∑ ℓ=1 (∫ s∈sk φℓ(s)ds ) ωℓ(t)≈ nℓ∑ ℓ=1   ∑ {i:si∈sk} φℓ(si)∆si  ωℓ(t). (36) Here ∆si represents the size of the grid cell centred at si; not...

1950
[10]

8):   1 −a 0

Yule-Walker equations (Brockwell, 2009, Ch. 8):   1 −a 0 ... −b −a 1 0 ... −b 0 ... 0 −b 0 ... −a 1 0 −b 0 ... −a 1   ·   r(0) r(1) ... r(p−

2009
[11]

(46) For a pure seasonal component, i.e

+b·r(k−p), k>p. (46) For a pure seasonal component, i.e. a = 0 and p> 1, we have r(k) = { σ2 e b|l| 1−b2, k =lp l ∈ Z 0, otherwise, (47) and for the standard AR(1)-process (b = 0): r(k) =σ2 e a|k| 1−a2. (48) S2 Computational details Parameters estimates for the model (consisting of a latent Gaussian ﬁeld with Gaussian observations) are obtained by maximis...

2009
[12]

First, we note that, RTST =AT⇐⇒RTST i =AT i , i = 1,...n obs (61) whereAi is the ith row inA

Here, A[sj ] c andA[sj ] a represents the non-zero elements of rows in JcLω andJaLω, corresponding to location sj. First, we note that, RTST =AT⇐⇒RTST i =AT i , i = 1,...n obs (61) whereAi is the ith row inA. Using the Kronecker structure of R =RT⊗RS we have (Fernandes 37 et al., 1998), RTST i =AT i ⇔ST i = (RT T⊗RT S ) −1 AT i ⇔ST i = (R−T T ⊗R−T S )AT i...

1998
[13]

Moreover, the columns representing sensitivities to well mixed ﬂuxes are the same for all observations

The ﬁrst di−C columns in Ai are equal (sensitivities to well mixed ﬂuxes), the next C columns represent sensitivities to the C ﬂux ﬁelds just before observational time, and the following nt−di columns are zero (sensitivities to future ﬂuxes). Moreover, the columns representing sensitivities to well mixed ﬂuxes are the same for all observations. As a resul...

2004
[14]

and we can reuse the R−T S ivec(AT c,i) computations for the constant part. For the temporal component the sparse triangular systems has to be solved for all observations and locations resulting in a total cost of O(nobsntnℓ) =O(nobsnω), which is the dominating factor when computing S =AR−1 z . di − C C nt − di nℓ nt ivec(AT c,i) ivec(AT a,i) 0 Figure 13:...

2004

[1] [1]

Akaike, H. (1969). Fitting autoregressive models for prediction. Annals of the Institute of Statistical Mathematics, 21:243–247. Andres, R. J., Marland, G., Fung, I., and Matthews, E. (1996). A 1 ◦×1◦ distribution of carbon dioxide emissions from fossil fuel consumption and cement manufacture, 1950-1990. Global Bio- geochemical Cycles, 10(3):419–429. Bake...

1969

[2] [2]

Brenkert, A

Science, 290(5495):1342–1346. Brenkert, A. L. (2003). Carbon dioxide emission estimates from fossil-fuel burning, hydraulic cement production, and gas ﬂaring for 1995 on a one degree grid cell basis. [Available at http://cdiac.esd.ornl.gov/ndps/ndp058a.html]. Brockwell, Peter J. adn Davis, R. A. (2009). Time Series: Theory and Methods . Springer, second e...

2003

[3] [3]

Tellus B: Chemical and Physical Meteorology, 55(2):555–579

annual mean control results and sensitivity to transport and prior ﬂux information. Tellus B: Chemical and Physical Meteorology, 55(2):555–579. Gurney, K. R., Law, R. M., Denning, A. S., Rayner, P. J., Pak, B. C., Baker, D., Bousquet, P., Bruhwiler, L., Chen, Y.-H., Ciais, P., et al. (2004). Transcom 3 inversion intercomparison: Model mean results for the...

2004

[4] [4]

Journal of Geophysical Research: Atmospheres, 104(D15):18555–18581

inversion of the transport of CO 2 in the 1980s. Journal of Geophysical Research: Atmospheres, 104(D15):18555–18581. Knorr, W. (2000). Annual and interannual co2 exchanges of the terrestrial biosphere: Process-based simulations and uncertainties. Global Ecology and Biogeography, 9(3):225–252. Lang, A., Schwab, C., et al. (2015). Isotropic gaussian random ...

2000

[5] [5]

Tellus B: Chemical and Physical Meteorology, 55(2):580–595

sensitivity of annual mean results to data choices. Tellus B: Chemical and Physical Meteorology, 55(2):580–595. Le Qu´ er´ e, C., Andrew, R. M., Friedlingstein, P., Sitch, S., Hauck, J., Pongratz, J., Pickers, P. A., Korsbakken, J. I., Peters, G. P., Canadell, J. G., Arneth, A., Arora, V. K., Barbero, L., Bastos, A., Bopp, L., Chevallier, F., Chini, L. P....

2018

[6] [6]

Lindgren, F

Earth System Science Data , 10(4):2141–2194. Lindgren, F. and Rue, H. (2007). Explicit construction of GMRF approximations to generalised Mat´ ern ﬁelds on irregular grids. Technical Report 12, Centre for Mathematical Sciences, Lund University, Lund, Sweden. Lindgren, F., Rue, H., and Lindstr¨ om, J. (2011). An explicit link between gaussian ﬁelds and gau...

2007

[7] [7]

Journal of Geophysical Research: Atmospheres , 113(D21)

results using atmospheric measure- ments. Journal of Geophysical Research: Atmospheres , 113(D21). OCO-2 (2019). Orbiting carbon observatory-2 (OCO-2). https://ocov2.jpl.nasa.gov/. accessed 2019-05-15. Peters, W., Miller, J., Whitaker, J., Denning, A., Hirsch, A., Krol, M., Zupanski, D., Bruhwiler, L., and Tans, P. (2005). An ensemble data assimilation sy...

2019

[8] [8]

28 Simpson, D., Illian, J., Lindgren, F., Sorbye, S., and Rue, H. (2016). Going oﬀ grid: Computationally eﬃcient inference for log-gaussian cox processes. Biometrika, online:1–22. Takahashi, T., Sutherland, S. C., Sweeney, C., Poisson, A., Metzl, N., Tilbrook, B., Bates, N., Wan- ninkhof, R., Feely, R. A., Sabine, C., et al. (2002). Global sea–air CO2 ﬂux...

2016

[9] [9]

for each grid cell sk inJ . Given a basis expansion (6) of the spatial ﬁeld, the basis functions are evaluated for each point in the dense grid, and the integrals are approximated using sums, ∫ s∈sk x(s,t )ds = nℓ∑ ℓ=1 (∫ s∈sk φℓ(s)ds ) ωℓ(t)≈ nℓ∑ ℓ=1   ∑ {i:si∈sk} φℓ(si)∆si  ωℓ(t). (36) Here ∆si represents the size of the grid cell centred at si; not...

1950

[10] [10]

8):   1 −a 0

Yule-Walker equations (Brockwell, 2009, Ch. 8):   1 −a 0 ... −b −a 1 0 ... −b 0 ... 0 −b 0 ... −a 1 0 −b 0 ... −a 1   ·   r(0) r(1) ... r(p−

2009

[11] [11]

(46) For a pure seasonal component, i.e

+b·r(k−p), k>p. (46) For a pure seasonal component, i.e. a = 0 and p> 1, we have r(k) = { σ2 e b|l| 1−b2, k =lp l ∈ Z 0, otherwise, (47) and for the standard AR(1)-process (b = 0): r(k) =σ2 e a|k| 1−a2. (48) S2 Computational details Parameters estimates for the model (consisting of a latent Gaussian ﬁeld with Gaussian observations) are obtained by maximis...

2009

[12] [12]

First, we note that, RTST =AT⇐⇒RTST i =AT i , i = 1,...n obs (61) whereAi is the ith row inA

Here, A[sj ] c andA[sj ] a represents the non-zero elements of rows in JcLω andJaLω, corresponding to location sj. First, we note that, RTST =AT⇐⇒RTST i =AT i , i = 1,...n obs (61) whereAi is the ith row inA. Using the Kronecker structure of R =RT⊗RS we have (Fernandes 37 et al., 1998), RTST i =AT i ⇔ST i = (RT T⊗RT S ) −1 AT i ⇔ST i = (R−T T ⊗R−T S )AT i...

1998

[13] [13]

Moreover, the columns representing sensitivities to well mixed ﬂuxes are the same for all observations

The ﬁrst di−C columns in Ai are equal (sensitivities to well mixed ﬂuxes), the next C columns represent sensitivities to the C ﬂux ﬁelds just before observational time, and the following nt−di columns are zero (sensitivities to future ﬂuxes). Moreover, the columns representing sensitivities to well mixed ﬂuxes are the same for all observations. As a resul...

2004

[14] [14]

and we can reuse the R−T S ivec(AT c,i) computations for the constant part. For the temporal component the sparse triangular systems has to be solved for all observations and locations resulting in a total cost of O(nobsntnℓ) =O(nobsnω), which is the dominating factor when computing S =AR−1 z . di − C C nt − di nℓ nt ivec(AT c,i) ivec(AT a,i) 0 Figure 13:...

2004