**dpcR** is an R package designed to perform analysis of digital PCR (dPCR) experiments. This vignette covers important features of the package and should be used as an addendum to the manual.

Our **dpcR** package employs the nomenclature of the MIQE guidelines for dPCR (Jim F Huggett et al. (2013), Jim F. Huggett, Cowen, and Foy (2014)). \(\lambda\) is the mean number of molecules per partition. Total number of partitions is given by \(n\). \(k\) is the number of positive partitions.

\[ \lambda = - \ln \left(1 - \frac{k}{n} \right) \]

Firstly, we describe `dpcr`

class, a parent class for all classes designed to contain dPCR data. Further, we closer inspect `adpcr`

which is a class responsible for array-based dPCR experiments (all experiments, where output data has precise localization in two dimensions). Often these types of dPCR experiments are called champer digital PCR (cdPCR).

Real-time quantitative qPCR (qPCR) experiments do not follow the fundamental assumption of dPCR reactions (the mean number of template molecule per partition smaller than 1). However, it is possible to ‘convert’ the qPCR into a dPCR. We present a tool to analyze results from *high-throughput* qPCR systems by using the dPCR analysis methodology as implemented in the **dpcR** package. The `qpcr2pp`

function converts qPCR amplification curve data to a `qdpcr`

object (see section about `qdpcr`

). The calculation of the Cq values from the amplification curves is internally done via functions from the **qpcR** package by Ritz and Spiess (2008).

`dpcr`

objectThe key class of the **dpcR** package is `dpcr`

. It has the following slots:

* *.Data* - matrix containing data from dPCR runs (see ‘*.Data* slot’ subsection). It is further specified by the *type* slot.

* *n* - number of partitions read in each run.

* *exper* - name of the experiment.

* *replicate* - name (or more conveniently ID) of a replicate.

* *assay* - name of the assay.

* *type* - name of the data (see ‘*type* slot’ subsection)

Although, this class is designed to contain results from all dPCR experiments, the user will interact mostly with its inheritors as `adpcr`

or `dpcr`

.

`dpcr`

is a S4 object. Below is shown how to extract elements from the slots of a S4 object:

```
# Below we have S4 object
s4 <- sim_adpcr(m = 100, n = 496, times = 100, pos_sums = FALSE, n_panels = 3)
```

`## The assumed volume of partitions in each run is equal to 1.`

`## The assumed volume uncertainty in each run is equal to 0.`

```
# Is it a dpcr object?
class(s4)
```

`## [1] "adpcr"`

```
# Yes, it is. Let's see what we have in type slot
slot(s4, "type")
```

`## [1] "nm"`

```
# We can use also shorter notation
s4@type
```

`## [1] "nm"`

`dpcr`

objects management (`bind_dpcr`

, `extract_run`

)All `dpcr`

objects should be managed using special functions provided by this package: `bind_dpcr`

and `extract_run`

. The former binds `dpcr`

objects, the latter extracts parts of the `dpcr`

object. It is important to use this functions, because they preserve other attributes important for `dpcr`

objects as number of partitions, names of experiments, assays and technical replicates.

```
# Create single adpcr object. The following code is also true for
# other objects inhering from dpcr, as dpcr or qdpcr
single_run <- sim_adpcr(m = 100, n = 765, times = 100, pos_sums = FALSE, n_panels = 1)
two_runs <- bind_dpcr(single_run, single_run)
three_runs <- bind_dpcr(single_run, single_run, single_run)
# It is also possible to bind a list of dpcr objects...
three_runs_list <- bind_dpcr(list(single_run, single_run, single_run))
# ... which may be useful in do.call statements
dpcr_list <- do.call(bind_dpcr, lapply(5L:10*10, function(n_template)
sim_adpcr(m = n_template, n = 765, times = 100, pos_sums = FALSE, n_panels = 1)))
```

`bind_dpcr`

may be seen as the analogue of the R function cbind. The main difference is the lack of recycling. If two objects with uneven number of data points are bound together, the shorter is completed with missing values (NA).

```
longer_run <- sim_adpcr(m = 10, n = 15, times = 100, pos_sums = FALSE, n_panels = 1)
shorter_run <- sim_adpcr(m = 10, n = 10, times = 100, pos_sums = FALSE, n_panels = 1)
shortest_run <- sim_adpcr(m = 10, n = 5, times = 100, pos_sums = FALSE, n_panels = 1)
# Expect informative message after binding
res <- bind_dpcr(longer_run, shorter_run, shortest_run)
```

`## Different number of partitions. Shorter objects completed with NA values.`

```
# Print the whole data
slot(res, ".Data")
```

```
## Experiment11.1 Experiment12.1 Experiment12.1
## [1,] 1 0 2
## [2,] 0 4 1
## [3,] 0 2 2
## [4,] 0 0 2
## [5,] 2 1 4
## [6,] 1 0 NA
## [7,] 0 2 NA
## [8,] 2 1 NA
## [9,] 0 0 NA
## [10,] 0 0 NA
## [11,] 0 NA NA
## [12,] 1 NA NA
## [13,] 3 NA NA
## [14,] 0 NA NA
## [15,] 0 NA NA
```

`extract_run`

is an equivalent of Extract. It extracts one or more runs from the `dpcr`

objects preserving other properties (as an appropriate replicate ID and so on).

`five_runs <- sim_adpcr(m = 2, n = 10, times = 100, pos_sums = FALSE, n_panels = 5)`

`## The assumed volume of partitions in each run is equal to 1.`

`## The assumed volume uncertainty in each run is equal to 0.`

`print(five_runs)`

```
## Experiment1.1 Experiment1.2 Experiment1.3 Experiment1.4 Experiment1.5
## [1,] 0 0 0 0 1
## [2,] 1 1 1 0 0
## [3,] 1 0 1 0 0
## [4,] 0 0 0 0 0
## [5,] 0 1 0 0 0
##
## 5 data points ommited.
## Data type: 'nm'
```

```
# Extract runs by the index
only_first_run <- extract_run(five_runs, 1)
only_first_and_second_run <- extract_run(five_runs, c(1, 2))
# See if proper replicated were extracted
slot(only_first_and_second_run, "replicate")
```

```
## [1] 1 2
## Levels: 1 2
```

```
no_first_run <- extract_run(five_runs, -1)
slot(no_first_run, "replicate")
```

```
## [1] 2 3 4 5
## Levels: 2 3 4 5
```

```
# Extract runs by the name
run_Experiment1.3 <- extract_run(five_runs, "Experiment1.3")
slot(run_Experiment1.3, "replicate")
```

```
## [1] 3
## Levels: 3
```

```
run_Experiment1.3and5 <- extract_run(five_runs, c("Experiment1.3", "Experiment1.5"))
slot(run_Experiment1.3and5, "replicate")
```

```
## [1] 3 5
## Levels: 3 5
```

Since the *.Data* slot inherits from the matrix class, it is possible to also use normal *Extract* operator (‘[’). For more information about this topic, see ‘*.Data* slot’ subsection.

Digital PCR data is always a matrix (see `?matrix`

in R). Columns and rows represent respectively individual runs and their data points. Since data points are not always equivalent to partitions, the true number of partitions for each run is always defined in the slot *n*.

```
# Create two array dPCR experiments. Mind the difference in the n parameter.
sample_adpcr <- bind_dpcr(sim_adpcr(m = 100, n = 765, times = 100, pos_sums = FALSE, n_panels = 1),
rename_dpcr(sim_adpcr(m = 100, n = 763, times = 100, pos_sums = FALSE,
n_panels = 1),
exper = "Experiment2"))
```

`## Different number of partitions. Shorter objects completed with NA values.`

In the code chunk above, we created two array dPCR experiments with respectively 765 and 763 partitions. Inspect the last five data points:

```
# It's possible to manipulate data points from dpcr object using all functions that work for matrices
tail(sample_adpcr)
```

```
## Experiment1.1 Experiment2.1
## [760,] 0 0
## [761,] 0 0
## [762,] 0 1
## [763,] 0 0
## [764,] 0 NA
## [765,] 0 NA
```

Both experiments have 765 data points. We see that in case of a shorter experiment, two data points have the value NA. If we analyze the *n* slot:

`slot(sample_adpcr, "n")`

`## [1] 765 763`

We see the expected number of partitions. It is especially important in case of fluorescence dPCR data, where one droplet may have assignments of few data points.

The important feature of *.Data* is inheritance from `matrix`

class, which opens numerous possibilities for data manipulation.

```
# Quickly count positive partitions
colSums(sample_adpcr > 0)
```

```
## Experiment1.1 Experiment2.1
## 96 NA
```

```
# Baseline fluorescence data
sim_dpcr(m = 3, n = 2, times = 5, fluo = list(0.1, 0)) - 0.05
```

```
## Experiment1.1
## [1,] -0.0500000
## [2,] 0.1496668
## [3,] 0.3473387
## [4,] 0.5410404
## [5,] 0.7288367
##
## 59 data points ommited.
## Data type: 'fluo'
```

Data from dPCR experiments may have several types:

* **ct** (**c**ycle **t**hreshold): cycle threshold of each partition.

* **fluo**: fluorescence intensity of each partition.

* **nm** (**n**umber of **m**olecules): number of molecules in each partition (usually such precise data come only from simulations).

* **np** (**n**umber of **p**ositives): status (positive (1) or negative(0)) of each partition.

* **tnp** (**t**otal **n**umber of **p**ositives): total number of positive partitions in the run (*.Data* in this case is matrix with single row and number of columns equal to the number of runs).

In case of **fluo** and **tnp** types, the number of data points in *.Data* slot is hardly ever equal to the real number of partitions `dpcr`

.

```
# Inspect all types of data
# Cq
# Load package with qPCR data
library(chipPCR)
qpcr2pp(data = C127EGHP[, 1L:6], type = "ct")
```

```
## qPCR1.1
## [1,] 34.09434
## [2,] 13.00000
## [3,] 12.26415
## [4,] 12.75472
## [5,] 12.26415
##
## Data type: 'ct'
```

```
# fluo
sim_dpcr(m = 3, n = 2, times = 5, fluo = list(0.1, 0)) - 0.05
```

```
## Experiment1.1
## [1,] -0.05000000
## [2,] 0.04983342
## [3,] 0.14866933
## [4,] 0.24552021
## [5,] 0.33941834
##
## 59 data points ommited.
## Data type: 'fluo'
```

```
# nm
sim_adpcr(m = 235, n = 765, times = 100, pos_sums = FALSE, n_panels = 3)
```

`## The assumed volume of partitions in each run is equal to 1.`

`## The assumed volume uncertainty in each run is equal to 0.`

```
## Experiment1.1 Experiment1.2 Experiment1.3
## [1,] 0 0 0
## [2,] 0 0 1
## [3,] 0 0 0
## [4,] 0 0 0
## [5,] 0 1 0
##
## 760 data points ommited.
## Data type: 'nm'
```

```
# np
binarize(sim_adpcr(m = 235, n = 765, times = 100, pos_sums = FALSE, n_panels = 3))
```

```
## The assumed volume of partitions in each run is equal to 1.
## The assumed volume uncertainty in each run is equal to 0.
```

```
## Experiment1.1 Experiment1.2 Experiment1.3
## [1,] 0 1 0
## [2,] 0 0 0
## [3,] 0 0 1
## [4,] 0 0 0
## [5,] 0 1 1
##
## 760 data points ommited.
## Data type: 'np'
```

```
# tnp
sim_adpcr(m = 235, n = 765, times = 100, pos_sums = TRUE, n_panels = 3)
```

```
## The assumed volume of partitions in each run is equal to 1.
## The assumed volume uncertainty in each run is equal to 0.
```

```
## Experiment1.1 Experiment1.2 Experiment1.3
## [1,] 195 198 201
##
## Data type: 'tnp'
```

`adpcr`

classIf the data output of an dPCR system has exact locations in two-dimensional space, it belongs to the `adpcr`

class. It is the case for all dPCR experiments conducted on panels, arrays and so on. The `adpcr`

object inherits from `dpcr`

objects, but has special slots specifying the dimensions and their names.

The planar representation of `adpcr`

objects is created by the `adpcr2panel`

function.

`adpcr2panel(six_panels)[["Experiment3.1"]][1L:6, 1L:6]`

```
## 1 2 3 4 5 6
## 1 0 0 0 1 0 0
## 2 0 0 0 1 0 1
## 3 0 0 0 0 0 0
## 4 0 0 0 0 0 0
## 5 0 0 0 0 0 0
## 6 0 1 1 0 0 0
```

Data from dPCR arrays can be easily visualized using the `plot_panel`

function.

```
# Remember, you can plot only single panel at once
plot_panel(extract_run(adpcr_experiments, 1), main = "Experiment 1")
```

The same data can be visualized easily in binarized form (positive/negative partitions).

`plot_panel(binarize(extract_run(adpcr_experiments, 1)), main = "Experiment 1")`

The `plot_panel`

function returns invisibly coordinates, that are compatible with **graphics** and **ggplot2** packages.

```
# Extract graphical coordinates
panel_data <- plot_panel(extract_run(adpcr_experiments, 1), plot = FALSE)
ggplot_coords <- cbind(panel_data[["ggplot_coords"]], value = as.vector(extract_run(adpcr_experiments, 1)))
# Plot panel using different graphics package
library(ggplot2)
ggplot(ggplot_coords[, -5], aes(x = x, y = y, fill = value)) +
geom_tile()
```

The `test_panel`

function is useful for testing the randomness of the spatial distribution of template molecules over the array. This function was implemented to test if technical flaws may corrupt the result of an dPCR experiment. This may occur during incorrect filling of the chamber, defects of the chamber or contaminations.

```
# The test_panel function performs a test for each experiment in apdr object.
test_panel(six_panels)
```

```
## $Experiment1.1
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 16.756, df = 24, p-value = 0.2822
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
##
## $Experiment1.2
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 15.495, df = 24, p-value = 0.1891
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
##
## $Experiment2.1
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 11.603, df = 24, p-value = 0.03196
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
##
## $Experiment2.2
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 18.183, df = 24, p-value = 0.4119
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
##
## $Experiment3.1
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 19.831, df = 24, p-value = 0.5873
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
##
## $Experiment3.2
##
## Chi-squared test of CSR using quadrat counts
## Pearson X2 statistic
##
## data: single_panel
## X2 = 17.868, df = 24, p-value = 0.3812
## alternative hypothesis: two.sided
##
## Quadrats: 5 by 5 grid of tiles
```

Further tests are available in the **spatstat** package, which is also utilizing S4 object system. The data exchange between the **dpcR** and the **spatstat** packages is streamlined by the `adpcr2ppp`

function, which converts `adpcr`

object to ppp class taking into account spatial coordinates of positive partitions.

`qdpcr`

classThe unique feature of **dpcR** package is conversion of qPCR data to dPCR-like experiments. The qPCR data should be in a format as used by the **qpcR** package (see qpcR_datasets), where columns represents particular experiments and one column contains cycle number. For pre-processing of raw amplification curve data we recommend the **chipPCR** package (Rödiger, Burdukiewicz, and Schierack (2015)).

```
# Load chiPCR package to access C317.amp data
library(chipPCR)
# Convert data to qdpcr object
qdat <- qpcr2pp(data = C317.amp, type = "np", Cq_range = c(10, 30))
```

`qdpcr`

inherits from `dpcr`

objects and may be analyzed using above mentioned methods. Moreover, the converted data may visualized using the `plot`

method.

`plot(qdat)`

The import functions accessible under `read_dpcr`

cover common dPCR systems. To extend the scope of our software, we introduced a universal dPCR data exchange format REDF (raw exchange digital PCR format).

REDF (Raw Exchange Digital PCR Format) has a tabular structure. Each dPCR run (represented by a row) is described using following properties:

**experiment**: name of the experiment to which run belongs.**replicate**: name or ID of the replicate of the experiment.**assay**: name of the assay to which experiment belongs. Often name of the channel used to detect positive partitions.**k**: number of positive partitions (integer).**n**: total number of partitions (integer).**v**: volume of the partition (nL).**uv**: uncertainty of partition’s volume (nL).**threshold**: partitions with**k**equal or higher than threshold are treated as positve.**panel_id**: id or name of the panel. This column should be included only in case of array-based digital PCR experiments.

Generalized Linear Models (GLM) are linear models for data, where the response variables may have non-normal distributions (as for example binomial distributed positive partitions in dPCR experiments). Using GLM we can describe relationships between results of dPCR:

\[\log{Y} = \beta^T X\]

where \(Y\) are counts, \(X\) are experiments names (categorical data) and \(\beta\) are linear model coefficients for every experiment. Moreover, \(\exp{\beta} = \lambda\).

Estimated means copies per partitions obtained from the model are compared each other using multiple t-test.

```
# Compare experiments using GLM
# 1. Perform test
comp <- test_counts(six_panels)
# 2. See summary of the test
summary(comp)
```

```
## group lambda lambda.low lambda.up experiment replicate k n
## 1 1 0.01315896 0.00585827 0.02946780 1 1.5 10.0 765
## 2 2 0.05439622 0.03601619 0.08178439 2 1.5 40.5 765
## 3 3 0.12295677 0.09284418 0.16207750 3 1.5 88.5 765
```

```
# 3. Plot results of the test
plot(comp, aggregate = FALSE)
```

```
# 4. Aggregate runs to their groups
plot(comp, aggregate = TRUE)
```

```
# 5. Extract coefficients for the further usage
coef(comp)
```

```
## group lambda lambda.low lambda.up experiment
## Experiment1.1 1 0.01448347 0.006670729 0.03130435 Experiment1
## Experiment1.2 1 0.01183446 0.005045810 0.02763125 Experiment1
## Experiment2.1 2 0.05232582 0.034376033 0.07928375 Experiment2
## Experiment2.2 2 0.05646661 0.037656342 0.08428503 Experiment2
## Experiment3.1 3 0.12813050 0.097256819 0.16801233 Experiment3
## Experiment3.2 3 0.11778304 0.088431546 0.15614267 Experiment3
## replicate k n
## Experiment1.1 1 11 765
## Experiment1.2 2 9 765
## Experiment2.1 1 39 765
## Experiment2.2 2 42 765
## Experiment3.1 1 92 765
## Experiment3.2 2 85 765
```

The Poisson regression on binary data (positive/negative partition) can be used only when the concentration of template molecules in samples is small (positive partitions contain rarely more than 1 template particle). Higher concentrations requires binomial regression.

The dPCR experiments may also be compared pairwise using the uniformly most powerful (UMP) ratio test (Fay 2010). Furthermore, computed p-values are adjusted using Benjamini & Hochberg correction (Benjamini and Hochberg 1995) to control family-wise error rate.

The UMP ratio test has following null-hypothesis:

\[ H_0: \frac{\lambda_1}{\lambda_2} = 1 \]

The generally advised Wilson’s confidence intervals (Brown, Cai, and DasGupta 2001) are computed independently for every dPCR experiment. The confidence intervals are adjusted using Dunn – Šidák correction to ensure that they simultaneously contain true value of \(lambda\):

\[ \alpha_{\text{adj}} = 1 - (1 - \alpha)^\frac{1}{T} \]

For example, the 0.95 significance levels means, that probability of the all real values being in the range of its respective confidence intervals is 0.95.

```
#1. Perform multiple test comparison using data from the previous example
comp_ratio <- test_counts(six_panels, model = "ratio")
#2. See summary of the test
summary(comp_ratio)
```

```
## group lambda lambda.low lambda.up experiment replicate k n
## 1 1 0.01315896 0.00585827 0.02946780 1 1.5 10.0 765
## 2 2 0.05439622 0.03601619 0.08178439 2 1.5 40.5 765
## 3 3 0.12295677 0.09284418 0.16207750 3 1.5 88.5 765
```

```
#3. Plot results of the test
plot(comp_ratio, aggregate = FALSE)
```

```
#4. Aggregate runs to their groups
plot(comp_ratio, aggregate = TRUE)
```

```
#5. Extract coefficients for the further usage
coef(comp)
```

```
## group lambda lambda.low lambda.up experiment
## Experiment1.1 1 0.01448347 0.006670729 0.03130435 Experiment1
## Experiment1.2 1 0.01183446 0.005045810 0.02763125 Experiment1
## Experiment2.1 2 0.05232582 0.034376033 0.07928375 Experiment2
## Experiment2.2 2 0.05646661 0.037656342 0.08428503 Experiment2
## Experiment3.1 3 0.12813050 0.097256819 0.16801233 Experiment3
## Experiment3.2 3 0.11778304 0.088431546 0.15614267 Experiment3
## replicate k n
## Experiment1.1 1 11 765
## Experiment1.2 2 9 765
## Experiment2.1 1 39 765
## Experiment2.2 2 42 765
## Experiment3.1 1 92 765
## Experiment3.2 2 85 765
```

```
# Compare results of two methods
par(mfrow=c(2,1))
plot(comp, aggregate = FALSE)
title("GLM")
plot(comp_ratio, aggregate = FALSE)
title("Ratio")
```

`par(mfrow=c(1,1))`

Two approaches presented above were compared in a simulation approach over 150.000 simulated array dPCR experiments. Each simulation contained six reactions. Three of them had roughly the same amount of molecules per plate and other three had experiments with 10 to 50 molecules more. Experiments were compared using GLM and MT frameworks.

On average, 2.03 and 1.98 reactions were assessed to a wrong group by respectively GLM and MT.

A single GLM comparison took roughly 183 times longer than MT (on average 1.10 seconds versus 0.006 seconds on the Intel i7-2600 processor). The difference grows with the number of experiments and number of partitions (data not shown).

Average coverage probability is the proportion of the time that the interval contains the true value of \(\lambda\).

In the example below, we simulated 1 droplet dPCR experiments (2 droplets each) for each level of \(\lambda\) (1.2 experiments total). We computed the average probability coverage of CI obtained by three methods: Dube’s(Dube, Qin, and Ramakrishnan 2008), Bhat’s(Bhat et al. 2009) and by MT (\(\alpha = 0.95\)).

To assess simultaneous coverage probability, we randomly divided experiments into 2000 groups (500 experiments each) for each possible value of \(\lambda\). We counted frequency of groups in which all confidence intervals contain the true value of \(\lambda\).

The dashed black line marks 0.95 border.

Method name | Type of coverage | Value |
---|---|---|

Adjusted | Average probability coverage | 1.00 |

Bhat | Average probability coverage | 0.69 |

Dube | Average probability coverage | 0.95 |

Adjusted | Simultaneous probability coverage | 0.95 |

Bhat | Simultaneous probability coverage | 0.00 |

Dube | Simultaneous probability coverage | 0.01 |

Benjamini, Yoav, and Yosef Hochberg. 1995. “Controlling the False Discovery Rate: A Practical and Powerful Approach to Multiple Testing.” *Journal of the Royal Statistical Society. Series B (Methodological)* 57 (1). Blackwell Publishing for the Royal Statistical Society: 289–300.

Bhat, Somanath, Jan Herrmann, Paul Armishaw, Philippe Corbisier, and Kerry R Emslie. 2009. “Single Molecule Detection in Nanofluidic Digital Array Enables Accurate Measurement of DNA Copy Number.” *Analytical and Bioanalytical Chemistry* 394 (2): 457–67. doi:10.1007/s00216-009-2729-5.

Brown, Lawrence D., T. Tony Cai, and Anirban DasGupta. 2001. “Interval Estimation for a Binomial Proportion.” *Statist. Sci.* 16 (2). The Institute of Mathematical Statistics: 101–33. doi:10.1214/ss/1009213286.

Dube, Simant, Jian Qin, and Ramesh Ramakrishnan. 2008. “Mathematical Analysis of Copy Number Variation in a DNA Sample Using Digital PCR on a Nanofluidic Device.” *PloS One* 3 (8): e2876. doi:10.1371/journal.pone.0002876.

Fay, Michael. 2010. “Two-Sided Exact Tests and Matching Confidence Intervals for Discrete Data.” *Proceedings of the National Academy of Sciences of the United States of America* 2 (1): 53–58.

Huggett, Jim F, Carole A Foy, Vladimir Benes, Kerry Emslie, Jeremy A Garson, Ross Haynes, Jan Hellemans, et al. 2013. “The Digital MIQE Guidelines: Minimum Information for Publication of Quantitative Digital PCR Experiments.” *Clinical Chemistry* 59 (6): 892–902. doi:10.1373/clinchem.2013.206375.

Huggett, Jim F., Simon Cowen, and Carole A. Foy. 2014. “Considerations for Digital PCR as an Accurate Molecular Diagnostic Tool.” *Clinical Chemistry*, October, clinchem.2014.221366. doi:10.1373/clinchem.2014.221366.

Pabinger, Stephan, Stefan Rödiger, Albert Kriegner, Klemens Vierlinger, and Andreas Weinhäusel. 2014. “A Survey of Tools for the Analysis of Quantitative PCR (qPCR) Data.” *Biomolecular Detection and Quantification* 1 (1): 23–33. doi:10.1016/j.bdq.2014.08.002.

Ritz, Christian, and Andrej-Nikolai Spiess. 2008. “qpcR: An R Package for Sigmoidal Model Selection in Quantitative Real-Time Polymerase Chain Reaction Analysis.” *Bioinformatics* 24 (13): 1549–51. doi:10.1093/bioinformatics/btn227.

Rödiger, Stefan, Michał Burdukiewicz, and Peter Schierack. 2015. “chipPCR: an R package to pre-process raw data of amplification curves.” *Bioinformatics* 31 (17): 2900–2902. doi:10.1093/bioinformatics/btv205.