Gaussian mean estimation in simulated data sets

Last updated: 2018-09-28

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File	Version	Author	Date	Message
Rmd	ac33b5e	Peter Carbonetto	2018-09-28	wflow_publish(“gaussian.mean.est.Rmd”)
Rmd	49dc15d	Peter Carbonetto	2018-09-28	I have a complete first draft of the gaussian.mean.est.Rmd analysis.
html	49dc15d	Peter Carbonetto	2018-09-28	I have a complete first draft of the gaussian.mean.est.Rmd analysis.
html	6861273	Peter Carbonetto	2018-09-28	First commit of gaussian.mean.est.html.
Rmd	f5f9258	Peter Carbonetto	2018-09-28	workflowr::wflow_publish(“gaussian.mean.est.Rmd”)

In this analysis, we assess the ability of different signal denoising methods to recover the true signal after being provided with Gaussian-distributed observations of the signal. We consider scenarios in which the data have homoskedastic errors (constant variance) and heteroskedastic errors (non-constant variance).

Since the simulation experiments are very computationally intensive, they are implemented separately (see the “dsc” directory in this git repository), and here we only create plots to summarize the results of these experiments.

Set up environment

Load the ggplot2 and cowplot packages, and the functions definining the mean and variances used to simulate the data.

library(ggplot2)
library(cowplot)
source("../code/signals.R")

Load results

Load the results of the simulation experiments.

load("../output/gaus-dscr.RData")

Simulated data with constant variances

This plot reproduces Fig. 2 of the manuscript comparing the accuracy of estimated mean curves in the data sets simulated from the “Spikes” mean function with constant variance.

First, extract the results used to generate this plot.

homo.data.smash <-
  res[res$.id    == "sp.3.v1" &
      res$method == "smash.s8",]
homo.data.smash.homo <-
  res[res$.id    == "sp.3.v1" &
      res$method == "smash.homo.s8",]
homo.data.tithresh <-
  res[res$.id == "sp.3.v1" &
      res$method == "tithresh.homo.s8",]
homo.data.ebayes <-
  res[res$.id    == "sp.3.v1" &
      res$method == "ebayesthresh",]
homo.data.smash.true <-
  res[res$.id == "sp.3.v1" &
  res$method  == "smash.true.s8",]
homo.data <-
  res[res$.id == "sp.3.v1" &
  (res$method == "smash.s8" |
   res$method == "ebayesthresh" |
   res$method == "tithresh.homo.s8"),]

Transform these results into a data frame suitable for ggplot2.

pdat <-
  rbind(data.frame(method      = "smash",
                   method.type = "est",
                   mise        = homo.data.smash$mise),
        data.frame(method      = "smash.homo",
                   method.type = "homo",
                   mise        = homo.data.smash.homo$mise),
        data.frame(method      = "tithresh",
                   method.type = "homo",
                   mise        = homo.data.tithresh$mise),
        data.frame(method      = "ebayesthresh",
                   method.type = "homo",
                   mise        = homo.data.ebayes$mise),
        data.frame(method      = "smash.true",
                   method.type = "true",
                   mise        = homo.data.smash.true$mise))
pdat <-
  transform(pdat,
            method = factor(method,
                            names(sort(tapply(pdat$mise,pdat$method,mean),
                                       decreasing = TRUE))))

Create the combined boxplot and violin plot using ggplot2.

p <- ggplot(pdat,aes(x = method,y = mise,fill = method.type)) +
     geom_violin(fill = "skyblue",color = "skyblue") +
     geom_boxplot(width = 0.15,outlier.shape = NA) +
     scale_y_continuous(breaks = seq(6,16,2)) +
     scale_fill_manual(values = c("darkorange","dodgerblue","gold"),
                       guide = FALSE) +
     coord_flip() +
     labs(x = "",y = "MISE") +
     theme(axis.line = element_blank(),
           axis.ticks.y = element_blank())
print(p)

Expand here to see past versions of plot-1-create-1.png:

Version	Author	Date
49dc15d	Peter Carbonetto	2018-09-28
6861273	Peter Carbonetto	2018-09-28

From this plot, we see that three versions of SMASH outperformed EbayesThresh and TI thresholding.

Next, we compare the same methods in simulated data sets with heteroskedastic errors.

Simulated data with heteroskedastic errors: “Spikes” mean signal and “Clipped Blocks” variance

In this scenario, data sets were simulated using the “Spikes” mean function and the “Clipped Blocks” variance function. The next couple plots reproduce part of Fig. 3 in the manuscript.

This plot shows the mean function as a block line, and the +/- 2 standard deviations as orange lines:

t         <- (1:1024)/1024
mu        <- spikes.fn(t,"mean")
sigma.ini <- sqrt(cblocks.fn(t,"var"))
sd.fn     <- sigma.ini/mean(sigma.ini) * sd(mu)/3
par(cex.axis = 1,cex.lab = 1.25)
plot(mu,type = "l", ylim = c(-0.05,1),xlab = "position",ylab = "",
     lwd = 1.75,xaxp = c(0,1024,4),yaxp = c(0,1,4))
lines(mu + 2*sd.fn,col = "darkorange",lty = 5,lwd = 1.75)
lines(mu - 2*sd.fn,col = "darkorange",lty = 5,lwd = 1.75)

Extract the results from running the simulations.

hetero.data.smash <-
  res[res$.id == "sp.3.v5" & res$method == "smash.s8",]
hetero.data.smash.homo <-
  res[res$.id == "sp.3.v5" & res$method == "smash.homo.s8",]
hetero.data.tithresh.homo <-
  res[res$.id == "sp.3.v5" & res$method == "tithresh.homo.s8",]
hetero.data.tithresh.rmad <-
  res[res$.id == "sp.3.v5" & res$method == "tithresh.rmad.s8",]
hetero.data.tithresh.smash <-
  res[res$.id == "sp.3.v5" & res$method == "tithresh.smash.s8",]
hetero.data.tithresh.true <-
  res[res$.id == "sp.3.v5" & res$method == "tithresh.true.s8",]
hetero.data.ebayes <-
  res[res$.id == "sp.3.v5" & res$method == "ebayesthresh",]
hetero.data.smash.true <-
  res[res$.id == "sp.3.v5" & res$method == "smash.true.s8",]

Transform these results into a data frame suitable for ggplot2.

pdat <-
  rbind(data.frame(method      = "smash",
                   method.type = "est",
                   mise        = hetero.data.smash$mise),
        data.frame(method      = "smash.homo",
                   method.type = "homo",
                   mise        = hetero.data.smash.homo$mise),
        data.frame(method      = "tithresh.rmad",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.rmad$mise),
        data.frame(method      = "tithresh.smash",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.smash$mise),
        data.frame(method      = "tithresh.true",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.true$mise),
        data.frame(method      = "ebayesthresh",
                   method.type = "homo",
                   mise        = hetero.data.ebayes$mise),
        data.frame(method      = "smash.true",
                   method.type = "true",
                   mise        = hetero.data.smash.true$mise))
pdat <-
  transform(pdat,
            method = factor(method,
                            names(sort(tapply(pdat$mise,pdat$method,mean),
                                       decreasing = TRUE))))

Create the combined boxplot and violin plot using ggplot2.

p <- ggplot(pdat,aes(x = method,y = mise,fill = method.type)) +
     geom_violin(fill = "skyblue",color = "skyblue") +
     geom_boxplot(width = 0.15,outlier.shape = NA) +
     scale_fill_manual(values=c("darkorange","dodgerblue","limegreen","gold"),
                       guide = FALSE) +
     coord_flip() +
     scale_y_continuous(breaks = seq(10,70,10)) +
     labs(x = "",y = "MISE") +
     theme(axis.line = element_blank(),
           axis.ticks.y = element_blank())
print(p)

In the “Spikes” scenario, we see that SMASH, when allowing for heteroskedastic errors, outperforms EbayesThresh and all variants of TI thresholding (including TI thresholding with the true variance). Further, SMASH performs almost as well when estimating the variance compared to when provided with the true variance.

Simulated data with heteroskedastic errors: “Corner” mean signal and “Doppler” variance

In this next scenario, the data sets were simulated using the “Corner” mean function and the “Doppler” variance function. These plots were also used for Fig. 3 of the manuscript.

This plot shows the mean function as a block line, and the +/- 2 standard deviations as orange lines:

mu        <- cor.fn(t,"mean") 
sigma.ini <- sqrt(doppler.fn(t,"var"))
sd.fn     <- sigma.ini/mean(sigma.ini) * sd(mu)/3
plot(mu,type = "l", ylim = c(-0.05,1),xlab = "position",ylab = "",
     lwd = 1.75,xaxp = c(0,1024,4),yaxp = c(0,1,4))
lines(mu + 2*sd.fn,col = "darkorange",lty = 5,lwd = 1.75)
lines(mu - 2*sd.fn,col = "darkorange",lty = 5,lwd = 1.75)

Extract the results from running these simulations.

hetero.data.smash.2 <-
  res[res$.id == "cor.3.v3" & res$method == "smash.s8",]
hetero.data.smash.homo.2 <-
  res[res$.id == "cor.3.v3" & res$method == "smash.homo.s8",]
hetero.data.tithresh.homo.2 <-
  res[res$.id == "cor.3.v3" & res$method == "tithresh.homo.s8",]
hetero.data.tithresh.rmad.2 <-
  res[res$.id == "cor.3.v3" & res$method == "tithresh.rmad.s8",]
hetero.data.tithresh.smash.2 <-
  res[res$.id == "cor.3.v3" & res$method == "tithresh.smash.s8",]
hetero.data.tithresh.true.2 <-
  res[res$.id == "cor.3.v3" & res$method == "tithresh.true.s8",]
hetero.data.ebayes.2 <-
  res[res$.id == "cor.3.v3" & res$method == "ebayesthresh",]
hetero.data.smash.true.2 <-
  res[res$.id == "cor.3.v3" & res$method == "smash.true.s8",]

Transform these results into a data frame suitable for ggplot2.

pdat <-
  rbind(data.frame(method      = "smash",
                   method.type = "est",
                   mise        = hetero.data.smash.2$mise),
        data.frame(method      = "smash.homo",
                   method.type = "homo",
                   mise        = hetero.data.smash.homo.2$mise),
        data.frame(method      = "tithresh.rmad",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.rmad.2$mise),
        data.frame(method      = "tithresh.smash",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.smash.2$mise),
        data.frame(method      = "tithresh.true",
                   method.type = "tithresh",
                   mise        = hetero.data.tithresh.true.2$mise),
        data.frame(method      = "ebayesthresh",
                   method.type = "homo",
                   mise        = hetero.data.ebayes.2$mise),
        data.frame(method      = "smash.true",
                   method.type = "true",
                   mise        = hetero.data.smash.true.2$mise))
pdat <-
  transform(pdat,
            method = factor(method,
                            names(sort(tapply(pdat$mise,pdat$method,mean),
                                       decreasing = TRUE))))

Create the combined boxplot and violin plot using ggplot2.

p <- ggplot(pdat,aes(x = method,y = mise,fill = method.type)) +
     geom_violin(fill = "skyblue",color = "skyblue") +
     geom_boxplot(width = 0.15,outlier.shape = NA) +
     scale_fill_manual(values=c("darkorange","dodgerblue","limegreen","gold"),
                       guide = FALSE) +
     coord_flip() +
     scale_y_continuous(breaks = seq(1,5)) +
     labs(x = "",y = "MISE") +
     theme(axis.line = element_blank(),
           axis.ticks.y = element_blank())
print(p)

Similar to the “Spikes” scenario, we see that the SMASH method, when allowing for heteroskedastic variances, outperforms both the TI thresholding and EbayesThresh approaches.

Session information

sessionInfo()
# R version 3.4.3 (2017-11-30)
# Platform: x86_64-apple-darwin15.6.0 (64-bit)
# Running under: macOS High Sierra 10.13.6
# 
# Matrix products: default
# BLAS: /Library/Frameworks/R.framework/Versions/3.4/Resources/lib/libRblas.0.dylib
# LAPACK: /Library/Frameworks/R.framework/Versions/3.4/Resources/lib/libRlapack.dylib
# 
# locale:
# [1] en_US.UTF-8/en_US.UTF-8/en_US.UTF-8/C/en_US.UTF-8/en_US.UTF-8
# 
# attached base packages:
# [1] stats     graphics  grDevices utils     datasets  methods   base     
# 
# other attached packages:
# [1] cowplot_0.9.3 ggplot2_3.0.0
# 
# loaded via a namespace (and not attached):
#  [1] Rcpp_0.12.18      later_0.7.2       dscr_0.1-7       
#  [4] compiler_3.4.3    pillar_1.2.1      git2r_0.21.0     
#  [7] plyr_1.8.4        workflowr_1.1.1   bindr_0.1.1      
# [10] R.methodsS3_1.7.1 R.utils_2.6.0     tools_3.4.3      
# [13] digest_0.6.16     evaluate_0.10.1   tibble_1.4.2     
# [16] gtable_0.2.0      pkgconfig_2.0.1   rlang_0.2.1      
# [19] shiny_1.1.0       yaml_2.2.0        bindrcpp_0.2.2   
# [22] withr_2.1.2       stringr_1.3.0     dplyr_0.7.5      
# [25] knitr_1.20        rprojroot_1.3-2   grid_3.4.3       
# [28] tidyselect_0.2.4  glue_1.2.0        R6_2.2.2         
# [31] rmarkdown_1.9     purrr_0.2.5       magrittr_1.5     
# [34] whisker_0.3-2     promises_1.0.1    backports_1.1.2  
# [37] scales_0.5.0      htmltools_0.3.6   assertthat_0.2.0 
# [40] xtable_1.8-2      mime_0.5          colorspace_1.4-0 
# [43] httpuv_1.4.3      stringi_1.1.7     lazyeval_0.2.1   
# [46] munsell_0.4.3     R.oo_1.21.0

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Gaussian mean estimation in simulated data sets

Zhengrong Xing, Peter Carbonetto and Matthew Stephens

Set up environment

Load results

Simulated data with constant variances

Simulated data with heteroskedastic errors: “Spikes” mean signal and “Clipped Blocks” variance

Simulated data with heteroskedastic errors: “Corner” mean signal and “Doppler” variance

Session information