LOB/LOD Estimation Workflow

Cyril Galitzine

2021-05-19

Load the required packages

library(MSstatsLOBD)
library(dplyr)

This Vignette provides an example workflow for how to use the package MSstatsLOBD.

Installation

To install this package, start R (version “4.0”) and enter:

if (!requireNamespace("BiocManager", quietly = TRUE))
    install.packages("BiocManager")

BiocManager::install("MSstatsLOBD")

1 Example dataset

1 Introduction

We will estimate the LOB/LOD for a few peptides an assay available on the CPTAC (Clinical Proteomic Tumor Analysis Consortium) assay portal c.f. [@Thomas]. The dataset contains spike in data for 43 distinct peptides. For each peptide, 8 distinct concentration spikes for 3 different replicates are measured. The Skyline files for the assay along with details about the experiment can be obtained from this webpage: https://assays.cancer.gov. The particular dataset examined here (called JHU_DChan_HZhang_ZZhang) can be found at https://panoramaweb.org/labkey/project/CPTAC%20Assay%20Portal/JHU_DChan_HZhang_ZZhang/Serum_QExactive_GlycopeptideEnrichedPRM/begin.view?. It should be downloaded from the MSStats website http://msstats.org/?smd_process_download=1&download_id=548.

The data is then exported in a csv file (\({\tt calibration\_data\_raw.csv}\)) from Skyline. This is done in Skyline by selecting File \(\rightarrow\) Export \(\rightarrow\) Report \(\rightarrow\) QuaSAR input and then clicking Export. The csv file contains the measured peak area for each fragment of each light and heavy version of each peptide. Depending on the format of the Skyline file and depending on whether standards were used, the particular outputs obtained in the csv file may vary. In this particular case the following variables are obtained in the output file \({\tt calibration\_data\_raw.csv}\): \({\tt File\ Name, Sample\ Name, Replicate\ Name, Protein\ Name, Peptide\ Sequence, Peptide\ Modified\ Sequence,}\)
\({\tt Precursor\ Charge, Product\ Charge,}\) \({\tt Fragment\ Ion, Average\ Measured\ Retention\ Time}\), \({\tt SampleGroup, IS\ Spike,}\) \({\tt Concentration, Replicate,light\ Area, heavy\ Area}\). A number of variables are byproducts of the acquisition process and will not be considered for the following, i.e.  \({\tt File\ Name, Sample\ Name, Replicate\ Name, SampleGroup, IS\ Spike}\).
Variables that are important for the assay characterization are detailed below (others are assumed to be self explanatory):

2 Loading and Normalization of the data

2.1 Load the raw data file and check its content.

##       File.Name Sample.Name Replicate.Name          Protein.Name
## 1 Blank_0_1.raw          NA      Blank_0_1 sp|Q9HDC9|APMAP_HUMAN
## 2 Blank_0_2.raw          NA      Blank_0_2 sp|Q9HDC9|APMAP_HUMAN
## 3 Blank_0_3.raw          NA      Blank_0_3 sp|Q9HDC9|APMAP_HUMAN
## 4       A_1.raw          NA            A_1 sp|Q9HDC9|APMAP_HUMAN
## 5       B_1.raw          NA            B_1 sp|Q9HDC9|APMAP_HUMAN
## 6       C_1.raw          NA            C_1 sp|Q9HDC9|APMAP_HUMAN
##   Peptide.Sequence Peptide.Modified.Sequence Precursor.Charge Product.Charge
## 1   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
## 2   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
## 3   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
## 4   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
## 5   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
## 6   AGPNGTLFVADAYK        AGPN[+1]GTLFVADAYK                2              1
##   Fragment.Ion Average.Measured.Retention.Time SampleGroup IS.Spike
## 1          y10                           35.19          Bl       NA
## 2          y10                           35.19          Bl       NA
## 3          y10                           35.19          Bl       NA
## 4          y10                           35.19           A       NA
## 5          y10                           35.19           B       NA
## 6          y10                           35.19           C       NA
##   Concentration Replicate light.Area heavy.Area
## 1        0.0000         1      59322          0
## 2        0.0000         2      75627          0
## 3        0.0000         3      62117          0
## 4        0.0576         1      75369          0
## 5        0.2880         1      77955      21216
## 6        1.4400         1      81893     329055

2.2 Normalize Dataset

We normalize the intensity of the light peptides using that of the heavy peptides. This corrects any systematic errors that can occur during a run or across replicates. The calculation is greatly simplified by the use of the \({\tt tidyr}\) and \({\tt dplyr}\) packages. The area from all the different peptide fragments is first summed then log transformed. The median intensity of the reference heavy peptides \({\tt medianlog2heavy}\) is calculated. Their intensities should ideally remain constant across runs since the spiked concentration of the heavy peptide is constant. The difference between the median for all the heavy peptide spikes is calculated. It is then used to correct (i.e. to normalize) the intensity of the light peptides \({\tt log2light}\) to obtain the adjusted intensity \({\tt log2light\_norm}\). The intensity is finally converted back to original space.

## `summarise()` has grouped output by 'Peptide.Sequence', 'Replicate', 'SampleGroup', 'Concentration'. You can override using the `.groups` argument.
## # A tibble: 6 x 4
##   INTENSITY CONCENTRATION NAME               REPLICATE
##       <dbl>         <dbl> <chr>                  <int>
## 1    34177.        0.0576 AAPAPQEATATFNSTADR         1
## 2   448636.        0.288  AAPAPQEATATFNSTADR         1
## 3        0         0      AAPAPQEATATFNSTADR         1
## 4        0         0      AAPAPQEATATFNSTADR         1
## 5    62968.        0      AAPAPQEATATFNSTADR         1
## 6    43668.        0      AAPAPQEATATFNSTADR         1

3 LOB/LOD definitions

3.1 Assay characterization procedure

In the following we estimate the LOB and LOD for individual peptides. The first step in the estimation is to fit a function to all the (Spiked Concentration, Measured Intensity) points. When the \({\tt nonlinear\_quantlim}\) function is used, the function that is fit automatically adapts to the data. For instance, when the data is linear, a straight line is used, while when a threshold (i.e.  a leveling off of the measured intensity at low concentrations) an elbow like function is fit. The fit is called \({\tt MEAN}\) in the output of function \({\tt nonlinear\_quantlim}\) as shown in Fig.1. Each value of \({\tt MEAN}\) is given for a particular \({\tt CONCENTRATION}\) value \({\tt CONCENTRATION}\) is thus a discretization of x–Spiked Concentration axis. The lower and upper bound of the 90% prediction interval of the fit are called \({\tt LOW}\) and \({\tt UP}\) in the output of \({\tt nonlinear\_quantlim}\). They correspond respectively to the 5% and 95% percentile of predictions.

The second step in the procedure is to estimate the upper bound of the noise in the blank sample (blue dashed line in Fig. 1). It is found by assuming that blank sample measurements are normally distributed.

3.2 LOB/LOD definitions

We define the LOB as the highest apparent concentration of a peptide expected when replicates of a blank sample containing no peptides are measured. This amounts to finding the concentration at the intersection of the fit (which represents the averaged measured intensity) with the 95% upper prediction bound of the noise.

The LOD is defined as the measured concentration value for which the probability of falsely claiming the absence of a peptide in the sample is 0.05, given a probability 0.05 of falsely claiming its presence. Estimating the LOD thus amounts to finding the concentration at the intersection between the 5% percentile line of the prediction interval of the fit (i.e. the lower bound of the 90% prediction interval) and the 95% percentile line of the blank sample. At the LOB concentration, there is an 0.05 probability of false positive and a 50% chance of false negative. At the LOD concentration there is 0.05 probability of false negative and a false positive probability of 0.05 in accordance with its definition. By default, a probability of 0.05 for the LOB/LOD estimation is used but it can be changed, as detailed in the manual.

4 Estimation of the LOB/LOD for dataset

4.1 LOB/LOD estimation for a non-linear peptide

## # A tibble: 6 x 4
##   INTENSITY CONCENTRATION NAME          REPLICATE
##       <dbl>         <dbl> <chr>             <int>
## 1    26291.        0.0576 LPPGLLANFTLLR         1
## 2   244841.        0.288  LPPGLLANFTLLR         1
## 3        0         0      LPPGLLANFTLLR         1
## 4   774274.        0      LPPGLLANFTLLR         1
## 5   482008.        0      LPPGLLANFTLLR         1
## 6   780792.        0      LPPGLLANFTLLR         1
##   CONCENTRATION   MEAN        LOW       UP      LOB     LOD   SLOPE INTERCEPT
## 1  0.000000e+00 160404 -377365.90 747814.3 2.867615 3.01081 2408123 -26039767
## 2  1.776357e-15 160404 -317429.72 734732.1 2.867615 3.01081 2408123 -26039767
## 3  5.760000e-02 160404  126900.76 195846.3 2.867615 3.01081 2408123 -26039767
## 4  2.880000e-01 160404  118147.15 202321.0 2.867615 3.01081 2408123 -26039767
## 5  7.040283e-01 160404   46792.48 319179.7 2.867615 3.01081 2408123 -26039767
## 6  1.440000e+00 160404  -68994.54 365639.9 2.867615 3.01081 2408123 -26039767
##            NAME    METHOD
## 1 LPPGLLANFTLLR NONLINEAR
## 2 LPPGLLANFTLLR NONLINEAR
## 3 LPPGLLANFTLLR NONLINEAR
## 4 LPPGLLANFTLLR NONLINEAR
## 5 LPPGLLANFTLLR NONLINEAR
## 6 LPPGLLANFTLLR NONLINEAR

After estimating LOB/LOD we can plot the results.

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The threshold is captured by the fit at low concentrations. The \({\tt MEAN}\) of the output of the function is the red line (mean prediction) in the plots. \({\tt LOW}\) is the orange line (5% percentile of predictions) while \({\tt UP}\) is the upper boundary of the red shaded area. The LOB is the concentration at the intersection of the fit and the estimate for the 95% upper bound of the noise (blue line). A more accurate “smoother” fit can be obtained by increasing the number of points \({\tt Npoints}\) used to discretize the concentration axis (see manual for \({\tt nonlinear\_quantlim}\)).

The nonlinear MSStats function (\({\tt nonlinear\_quantlim}\)) works for all peptides (those with a linear response and those with a non-linear response). We now examine a peptide with a linear behavior.

4.2 LOB/LOD estimation for a linear peptide

FALSE # A tibble: 6 x 4
FALSE   INTENSITY CONCENTRATION NAME            REPLICATE
FALSE       <dbl>         <dbl> <chr>               <int>
FALSE 1   323763.        0.0576 FVGTPEVNQTTLYQR         1
FALSE 2  2036098.        0.288  FVGTPEVNQTTLYQR         1
FALSE 3      205.        0      FVGTPEVNQTTLYQR         1
FALSE 4  1431235.        0      FVGTPEVNQTTLYQR         1
FALSE 5  1244348.        0      FVGTPEVNQTTLYQR         1
FALSE 6  1455085.        0      FVGTPEVNQTTLYQR         1
##   CONCENTRATION      MEAN       LOW        UP       LOB       LOD   SLOPE
## 1  0.000000e+00  342817.6 -571678.8 1370674.5 0.2646257 0.2744765 5020096
## 2  1.776357e-15  342817.6 -669810.2 1494551.6 0.2646257 0.2744765 5020096
## 3  5.760000e-02  666302.3  538736.2  781826.3 0.2646257 0.2744765 5020096
## 4  2.880000e-01 1960240.8 1909423.2 2009281.4 0.2646257 0.2744765 5020096
## 5  7.040283e-01 4296677.6 4157392.8 4427033.1 0.2646257 0.2744765 5020096
## 6  1.440000e+00 8429933.5 8214575.7 8609017.6 0.2646257 0.2744765 5020096
##   INTERCEPT            NAME    METHOD
## 1  10349528 FVGTPEVNQTTLYQR NONLINEAR
## 2  10349528 FVGTPEVNQTTLYQR NONLINEAR
## 3  10349528 FVGTPEVNQTTLYQR NONLINEAR
## 4  10349528 FVGTPEVNQTTLYQR NONLINEAR
## 5  10349528 FVGTPEVNQTTLYQR NONLINEAR
## 6  10349528 FVGTPEVNQTTLYQR NONLINEAR
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The plots indicate that the fit is observed to be linear as the response is linear.

4.3 LOB/LOD linear estimation for a non-linear peptide

##   CONCENTRATION       MEAN        LOW         UP       LOB       LOD   SLOPE
## 1  0.000000e+00  -63444.32 -591314.14  419670.88 0.7354503 0.8484417 2381531
## 2  1.776357e-15  -63444.32 -551773.30  458827.62 0.7354503 0.8484417 2381531
## 3  5.760000e-02   15555.28  -13888.26   47852.53 0.7354503 0.8484417 2381531
## 4  2.880000e-01  331553.71  286405.57  378001.54 0.7354503 0.8484417 2381531
## 5  7.040283e-01  902145.21  757570.98 1027095.44 0.7354503 0.8484417 2381531
## 6  1.440000e+00 1911545.83 1713991.74 2131618.76 0.7354503 0.8484417 2381531
##   INTERCEPT          NAME METHOD
## 1  -5750520 LPPGLLANFTLLR LINEAR
## 2  -5750520 LPPGLLANFTLLR LINEAR
## 3  -5750520 LPPGLLANFTLLR LINEAR
## 4  -5750520 LPPGLLANFTLLR LINEAR
## 5  -5750520 LPPGLLANFTLLR LINEAR
## 6  -5750520 LPPGLLANFTLLR LINEAR

After estimating LOB/LOD we can plot the results.

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4.4 LOB/LOD linear estimation for a linear peptide

##   CONCENTRATION      MEAN       LOW        UP       LOB       LOD   SLOPE
## 1  0.000000e+00  577625.5 -316971.1 1663107.1 0.2377245 0.2495455 5020096
## 2  1.776357e-15  577625.5 -351541.3 1583402.5 0.2377245 0.2495455 5020096
## 3  5.760000e-02  880822.7  771725.0  996990.7 0.2377245 0.2495455 5020096
## 4  2.880000e-01 2093611.8 2040779.1 2143478.2 0.2377245 0.2495455 5020096
## 5  7.040283e-01 4283518.6 4135607.4 4402410.4 0.2377245 0.2495455 5020096
## 6  1.440000e+00 8157556.9 7942874.1 8348558.7 0.2377245 0.2495455 5020096
##   INTERCEPT            NAME METHOD
## 1  10349524 FVGTPEVNQTTLYQR LINEAR
## 2  10349524 FVGTPEVNQTTLYQR LINEAR
## 3  10349524 FVGTPEVNQTTLYQR LINEAR
## 4  10349524 FVGTPEVNQTTLYQR LINEAR
## 5  10349524 FVGTPEVNQTTLYQR LINEAR
## 6  10349524 FVGTPEVNQTTLYQR LINEAR

After estimating LOB/LOD we can plot the results.

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REFERENCES

C. Galitzine et al. “Nonlinear regression improves accuracy of characterization of multiplexed mass spectrometric assays.” Molecular & Cellular Proteomics (2018), doi:10.1074/mcp.RA117.000322