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Some remarks about Lab 1

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Title: Some remarks about Lab 1


1
Some remarks about Lab 1
2
  • image(parana.krige,valsqrt(parana.krigekrige.var
    ))
  • contour(parana.krige,locloci,addT)

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  • likfit(parana,nugget470,cov.model"gaussian",ini.
    cov.parsc(5000,250))
  • kappa not used for the gaussian correlation
    function
  • --------------------------------------------------
    -------
  • likfit likelihood maximisation using the
    function optim.
  • likfit estimated model parameters
  • beta tausq sigmasq phi
  • " 260.6" " 521.1" "6868.9" " 336.2"
  • Practical Range with cor0.05 for asymptotic
    range 16808.82
  • likfit maximised log-likelihood -669.3

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Nonstationary variance
  • Let ?(x) be a Gaussian process with constant mean
    ?, constant variance ??????, and correlation
    .
  • f is the same deformation as for the covariance
    modelling.
  • Define the variance process
  • Its distribution at gauged sites is

9
Moments of the variance process
  • Mean
  • Variance
  • Covariance
  • Correlation

10
Priors
  • N(?,?)
  • The full conditional distributions are then of
    the same form (Gibbs sampler).
  • To set the hyperparameters we use an empirical
    approach Let Sii be the sample variance at site
    i.

11
Method of moments
  • Setting the sample moments (over the sites) equal
    to the theoretical moments we get
  • and let that be the prior mean. The prior
    variance is set appropriately diffuse.

12
French precipitation
  • Constant variance Nonconstant
  • variance

13
Prediction vs estimation
  • Leave out 8 stations, use remaining 31 for
    estimation
  • Compute predictive distribution for the 8
    stations
  • Plot observed variances (incl. nugget) vs.
    estimated variances
  • and against predictive distribution

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Estimated variance field
16
Global processes
  • Problems such as global warming require modeling
    of processes that take place on the globe (an
    oriented sphere).
  • Optimal prediction of quantities such as global
    mean temperature need models for global
    covariances.
  • Note spherical covariances can take values in
    -1,1not just imbedded in R3.
  • Also, stationarity and isotropy are identical
    concepts on the sphere.

17
Isotropic covariances on the sphere
Isotropic covariances on a sphere are of the
form where p and q are directions, ?pq the angle
between them, and Pi the Legendre polynomials
18
Some examples
  • Let ai?i, o?lt1. Then
  • Let ai(2i1)ri. Then
  • Given C(p,q)

19
Global temperature
  • Global Historical Climatology Network 7280
    stations with at least 10 years of data. Subset
    with 839 stations with data 1950-1991 selected.

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Isotropic correlations
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Spherical deformation
  • Need isotropic covariance model on transformation
    of sphere/globe
  • Covariance structure on convex manifolds
  • Simple option deform globe into another globe
  • Alternative MRF approach

22
A class of global transformations
  • Deformation of sphere g(g1,g2)
  • latitude def
  • longitude def
  • Avoid crossing of latitudes or longitudes
  • Poles are fixed points
  • Equator can be fixed as well

23
Simple latitude deformation
knot
Iterated simple deformations
24
Two-dimensional deformation
  • Let b and ? depend on longitude ?
  • Alternating deform longitude and latitude.

location
scale
amplitude
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Three iterations
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Resulting isocovariance curves
27
Comparison
  • Isotropic Anisotropic

28
Assessing uncertainty
29
Another current climate problem
  • General circulation models require accurate
    historical ocean surface temperature records
  • Data from buoys, ships, satellites
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