colorSpec is an R package providing an S3 class with methods for color spectra. It supports the standard calculations with spectral properties of light sources, materials, cameras, eyes, scanners, etc.. And it works well with the more general action spectra. Many ideas are taken from packages hsdar [16], hyperSpec [4], pavo [17], photobiology [3], and zoo [30].
Some features:MASS::ginv()
responsivityMetrics()
to determine whether the generators lie in an open linear halfspace
computeADL()
. The electronic camera model is purely linear with no dark current offset or other deviations.
Pick up any book on color physics (e.g. [28], [20], [19], or [12]) or color management (e.g. [9]) and you will see plots of many spectra. Let’s start with a simple division of these spectra into 4 basic types:
For the infinite-dimensional spaces, the interval [380,780] is used for illustration; in specific calculations it can vary. Note that of the 4 vector spaces, only \(L^*\) and \(M\) are isomorphic, but we take the mathematical point of view that although they are isomorphic, they are not the same. For a proof of this isomorphism, see Appendix D. Multiplication operators are the infinite-dimensional generalization of diagonal matrices. For more background on this functional analysis, see [27] and [14].
For the finite-dimensional spaces, it takes the full sequence of wavelengths and not just the endpoints. The wavelength sequence is typically regular not always. In this case all 4 vector spaces are isomorphic (since they are the same dimension), but we still take the mathematical point of view that they are not the same space.
The last type='responsivity.material'
is the least common. There is an example in [9] (Figure 10.11a, page 141) of a scanner, where the 3 spectra are called the effective spectral responsivities of that scanner. They are the pointwise product of the scanner light source and the responsitivies of the scanner’s RGB sensor; see also pages 146-147. On page 335, in equation (B.4), there is a more general product. In colorSpec, both of these products and more are peformed in the function product()
. Another example of effective spectral responsivities are those of a reference scanner from SMPTE, see [22].
Every colorSpec object has one of these types, but it is not stored with the object. The object stores a quantity
which then determines the type
; see the next section for more discussion. A synonym for type
might be space
, but this could be confused with color space.
colorSpec does not actually use the finite-dimensional representations in Table 1.1; the organization is flexible. And it would not be efficient memory use to store a diagonal matrix as such. For discussion of the organization, see section 4.
Given 2 finite-dimensional spectra of types 'light'
and 'responsivity.light'
the response (a real number) is their dot product multiplied by the step between wavelengths.
All materials in this document are non-fluorescent; i.e. the outgoing photons reflected (or transmitted) only come from incoming photons of the same wavelength. A transparent material transmits an incoming light spectrum and a new spectrum emerges on the other side. If the material is not fluorescent, the outgoing spectrum is the same as the incoming, except there is a reduction of power that depends only on the wavelength (and the material). If the light power were divided into N bins, the transmitted power spectrum would be a diagonal NxN matrix times the incoming spectrum.
A reflectance spectrum is mathematically the same as a transmittance spectrum, except we compare the outgoing light spectrum to that of a perfect reflecting diffuser. Such a material does not exist, like many concepts in physics, but it is a very useful idealization.
Unfortunately there are two common metrics for quantifying spectra with type='light'
- energy of photons and number of photons. The former - radiometric - is the oldest, being used in the 19th century. The latter - actinometric - was not used until the 20th century (after the modern concept of photons was proposed in 1905). So colorimetry uses radiometric quantities by convention and actinometric ones are converted to radiometric automatically for calculations. The conversion is easy; see the function radiometric()
, [20] pp. 93-94, and [19] p. 12.
Similarly, 'responsivity.light'
can be radiometric (e.g. the CIE color matching functions) or actinometric (e.g. the quantum efficiency of a CMOS sensor). These actinometric spectra are also converted to radiometric on the fly.
plot()
calibrate()
radiometric()
and actinometric()
Note that the action
response is really a grab-bag for responses that are neither electrical
(a modern solid-state photosensor) nor neural
(a biological eye).
Here are the valid types and their quantities:
The colorSpec quantities are typically not the same as the SI quantities; they are more general.
First consider light sources (type='light'
).
The colorSpec quantity='energy'
includes all 5 of these power-based SI quantities: radiant power (radiant flux), irradiance, radiant exitance, radiant intensity, and radiance. And it also includes these energy-based quantities: radiant energy, radiant exposure, and the time integrals of radiant exitance, radiant intensity, and radiance. Thus quantity='energy'
includes 10 true physical SI quantities, which all include energy and optionally include area, solid angle, and time.
Similary, the colorSpec quantity='photons'
includes all 5 of these SI quantities: photon flux, photon irradiance, photon exitance, photon intensity, and photon radiance. It also includes these 5 quantities integrated over time, e.g. photon fluence.
Versions of colorSpec before 0.7-1 used power
in place of energy
. But now we have switched to energy
; see Appendix E for the reasons why. power
and power->*
are still supported, but deprecated, and will eventually be phased out.
For type='light' and type='responsivity.light'
, each radiometric quantity has a corresponding actinometric quantity. The following table shows the correspondences:
The colorSpec functions radiometric()
and actinometric()
convert back and forth between the two metrics. For energy
and energy->electrical
and energy->action
the functions actually do assume the example units. For energy->electrical
the example units in the table are in common use for electronic cameras. Note that for energy->action
, the action we have in mind is photosynthesis. A quick internet search shows that the maximum theoretical photosynthesis response is between 1/16 and 1/8 of an \(\text{O}_2\) molecule per photon. For energy->neural
see the functions man pages for more discussion.
Since these are spectra parameterized by nm, the example units should all add \(\text{nm}^{-1}\) at the end, but this is suppressed for simplicity.
Now consider materials (type='material'
). The situation here is simpler. The colorSpec quantity='reflectance'
, 'transmittance'
, and 'absorbance'
correspond directly to the SI quantities. All reflecting materials are Lambertian and opaque, and all transmitting materials have only direct transmission with no scatter.
The user constructs a colorSpec
object x
using the function colorSpec()
:
x <- colorSpec( data, wavelength, quantity='auto', organization='auto', specnames=NULL )
The arguments are:
data
a vector or matrix of the spectrum values. In case data
is a vector, x
has a single spectrum and the number of points in that spectrum is the length of data
. In case data
is a matrix, the spectra are stored in the columns, so the number of points in each spectrum is the number of rows in data
. It is OK for the matrix to have only 0 or 1 column.
wavelength
a numeric vector of wavelengths for all the spectra in x
. The length of this vector must be equal to NROW(data)
, and the unit must be nanometers. The sequence must be increasing. The wavelength
of x
can be changed after construction.
quantity
a character string giving the quantity of all spectra; see Table 2.1 for a list of valid values. In case quantity='auto'
, a guess is made from the specnames
. The quantity
of x
can be changed later.
organization
a character string giving the desired organization of the returned colorSpec object. In case organization='auto'
, the organization is 'vector'
or 'matrix'
depending on data
. The organization
of x
can be changed after construction. See the next section for discussion of all 4 possible organizations.
specnames
a character vector with length equal to the number of spectra in data
, and with no duplicates. If specnames=NULL
and data
is a vector, then specnames
is set to deparse(substitute(data))
. If specnames=NULL
and data
is a matrix, then specnames
is set to colnames(data)
. If specnames
is still not a character vector with the right length, or if there are duplicate names, then specnames
is set to 'S1', 'S2', ...
with a warning message. Names can be changed after construction.
Compare colorSpec()
with the function stats::ts()
.
A spectrum is similar to a time-series (with time replaced by wavelength), and so the organization of a colorSpec
object is similar to that of the time-series objects in package stats. A single time-series is organized as a vector with class ts
, and a multiple time series is organized as a matrix (with the series in the columns) with class mts
. We decided to use a single class name colorSpec
, continue the idea of different organizations, and allow 2 more organizations. Here are the 4 possible organizations, in order of increasing complexity:
'vector'
The object is a numeric vector with attributes but no dimensions, like a time-series ts
. This organization works for a single spectrum only, which is very common. The common arithmetic operations work well with this organization. The length of the vector is the number of wavelengths. The class of the object is c('colorSpec','numeric')
.
'matrix'
The object is a matrix with attributes, like a multiple time-series mts
. This is probably the most suitable organization in most cases, but it does not support extra data (see 'df.row'
below). The common arithmetic and subsetting operations work well; and even round()
works. The number of columns is the number of spectra, and the spectrum names are stored as the column names. This organization can be used for any number of spectra, including 0 or 1. The class of the object is c('colorSpec', 'matrix')
.
'df.col'
The object is a data frame with attributes. The spectra are stored in the columns. But the first column is always the wavelength sequence, so the spectra are in columns 2:(M+1), where M is the number of spectra. This organization mirrors the most common organization in text files and spreadsheets. The common arithmetic operations do not work, and the initial wavelength column is awkward to handle. The spectrum names are stored as the column names of the data frame. This organization can be used for any number of spectra, including 0 or 1. This organization imitates the “long” format in package hyperSpec. The class of the object is c('colorSpec', 'data.frame')
.
'df.row'
The object is a data frame with attributes. The last (right-most) column is a matrix with spectra in the rows. This matrix is the transpose of the matrix used when the organization is 'matrix'
. The common arithmetic operations do not work. The spectrum names are stored as the row names of the data frame. This organization can be used for any number of spectra, including 0 or 1. This organization imitates the “tall” format in package hyperSpec. This is the only organization that supports extra data associated with each spectrum, such as physical parameters, time parameters, descriptive strings, or whatever. This extra data occupies the initial columns of the data frame that come before the spectra, and can be any data frame with the right number of rows. This extra data can be assigned to any spectrum with the 'df.row'
organization. The class of the object is c('colorSpec', 'data.frame')
.
The attribute list is kept as small as possible. Here it is:
The user should never have to modify these using the function attr()
.
There are 5 text file formats that can be imported; no binary formats are supported yet. The function readSpectra()
reads a few lines from the top of the file to try and determine the type. If successful, it then calls the appropriate read function; see the colorSpec reference guide for details. The file formats are:
XYY
There is a line matching '^(wave|wv?l)'
(not case sensitive) followed by the the names of the spectra. This is the column header line. All lines above this one are taken to be metadata. This is probably the most common file format; see the sample file ciexyz31_1.csv
.
spreadsheet
There is a line matching '^(ID|SAMPLE|Time)'
. This line and lines below must be tab-separated. Fields matching '^[A-Z]+([0-9.]+)nm$'
are taken to be spectral data and other fields are taken to be extradata. All lines above this one are taken to be metadata. The organization of the returned object is 'df.row'
. This is a good format for automated acquisition of many spectra, using a spectrometer. See the sample file E131102.txt
.
scope
This is a file format used by Ocean Optics spectrometer software. There is a line >>>>>Begin Processed Spectral Data<<<<<
. The following lines contain wavelength and energy separated by a tab. There is only 1 spectrum per file. The organization of the returned object is 'vector'
. See the sample file pos1-20x.scope
.
CGATS
This is a standardized format for exchange of color data, covered by both ANSI and ISO standards, see [2] and [11]. It might be best understood by looking at some samples, such as inst/extdata/objects/Rosco.txt
. Unfortunately these standards do not give a standard way to name the spectral data. The function readSpectra()
considers field names that match the pattern "^(nm|SPEC_|SPECTRAL_)[_A-Z]*([0-9.]+)$"
to be spectral data and other fields are considered extra data. The organization of the returned object is 'df.row'
.
Control
This is a personal format used for digitizing images of plots from manufacturer datasheets and academic papers. It is structured like a Microsoft .INI
file. There is a [Control]
section establishing a simple linear map from the image pixels in the file to the wavelength and spectrum quantities. Only 3 points are really necessary. It is OK for there to be a little rotation of the plot axes relative to the image. This is followed by a section for each spectrum, in XY pixel units only. Conversion to wavelength and spectral quantities happens during on-the-fly after read. The organization of the returned object is 'vector'
.
There is a function cs.options()
for setting options private to the package. There are 3 such options, and all are related to the package logging mechanism. All messages go to the console.
There is an option for setting the logging level. The levels are the 6 standard ones taken from Log4J
: FATAL
, ERROR
, WARN
, INFO
, DEBUG
, and TRACE
. One can set higher levels to see more info.
By default, when an ERROR
event occurs, execution stops. But there is a colorSpec option to continue. The logging level FATAL
is reserved for internal errors, when execution always stops.
Finally, there is an option for how the message is formatted - a layout option. For details see the help page for the function cs.options()
.
Here are a few possible improvements and additions.
wavelength
handling the wavelength sequence, e.g. for product()
and resample()
, is an annoyance. We might consider adding a global wavelength option that all spectra are automatically resampled to.
fluorescent materials
Recall that a non-fluorescent material corresponds to a diagonal matrix, which operates in a trivial way on light spectra. A diagonal matrix can be stored much more compactly as a plain vector, and multiplication of a diagonal matrix by a vector simplifies to entrywise (Hadamard) multiplication. A fluorescent material corresponds to a non-diagonal matrix – called the Excitation Emission Matrix or Donaldson Matrix. The product in Appendix C is still multilinear, but the material product in the middle is no longer symmetric, so enhancements to the product computations must be made. This is a new level of complexity and memory usage, and may require a new type of memory organization.
comparisons
There should a metric of some kind that compares two material spectra. There should be a way to compare 2 colorSpec objects of the same type, especially 'responsivity.light'
. For example, there would then be a way to evaluate how close an electronic camera comes to satisying the Maxwell-Ives Criterion. Possible metrics would be the principal angles between subspaces.
plot()
the product()
function saves the terms with the product object, but the plot()
function ignores them. It may be useful to have an option to plot the individual terms too.
The following are built-in colorSpec objects that are commonly used. They are global objects that are automatically available when colorSpec is loaded. For more details on each see the corresponding help topic.
Each built-in colorSpec object in Appendix A takes time to fully document in .Rd
help files. Here are some bonus spectra files under folder extdata
that users may find interesting and useful. Use the function readSpectra()
to construct a colorSpec object from the file, for example:
= readSpectra( system.file( 'extdata/illuminants/sunlight.txt', package='colorSpec' ) )
sunlight sunlight
##
## colorSpec object. The organization is 'df.col'. Object size is 5008 bytes.
## the object describes a single source of light, and the quantity is 'energy' (energy of photons, which is radiometric).
## Wavelength range: 300 to 830 nm. Step size is 10 nm.
##
## 1 spectra
## 54 data points / spectrum
##
## Source Min Max LambdaMax Integral
## 1 sunlight.Energy 0 1167 480 472390
See the top of each file for sources, attribution, and other information. Alternatively, one can run summary()
on the imported object. Some of the files in Control
format have associated JPG
or PNG
images of plots.
This Appendix is a very formal mathematical treatment of spectra. In infinite dimensions we use the terminology of functional analysis. In finite dimensions we use the terminology of linear algebra. For easier reference here is a repeat of Table 1.1:
There are 5 natural binary products on these spaces:
An equivalent way to handle these material diagonal matrices is to represent them instead as simple vectors – the entries along the diagonal. The above products with diagonal matrices then become the much simpler entrywise or Hadamard product. This is how it is done in colorSpec, using R’s built-in entrywise product operation.
The first 4 products can be strung together to get a product: \[L \times M_1 \times ... \times M_m \times L^* \to R\] It is not hard to show that this product is multilinear. This means that if one fixes all terms except the \(i^{th}\) material location, then the composition: \[M \to L \times M_1 \times ... \times \bullet \times ... \times M_m \times L^* \to R\] is linear, see [15]. The first inclusion map means to place the material spectrum in \(M\) at the ith variable slot \(\bullet\) in the product. The composition map is a functional on \(M\) which is an element of \(M^*\), i.e. a material responder. This special method of creating a material responder - a spectrum in \(M^*\) - plus all the products in the above table, are available in the function product()
in colorSpec. See that help page for examples. Compare the previous equation with equation (B.4) (page 335) in [9].
The right-hand term \(R\) can be thought of as standing for Response or Real numbers. In colorSpec the light responders can have multiple channels, e.g. R, G, and B, and so there are conventions on the admissible numbers of spectra for each term in these products. See the help page for colorSpec::product()
for details.
This appendix gives some proofs of some earlier statements about infinite dimensional function spaces. It is not relevant to the software in any way, and is likely of interest only to mathematicians and physicists. This proof is not original and is largely an expanded version of a discussion on math.stackexchange.com, see [25].
Throughout this appendix, \(L^1\) denotes \(L^1[0,1]\), which is isomorphic to \(L^1[ \lambda_{min}, \lambda_{max}]\) where \([ \lambda_{min}, \lambda_{max}]\) is an arbitrary interval of wavelengths. Furthermore, \(L^\infty\) denotes \(L^\infty[0,1]\), and \(\mu\) denotes Lebesgue measure on \([0,1]\).
Proposition: Suppose \(\phi :[0,1] \to \mathbb{R}\) is a measurable function, and that \(\phi f \in L^1\) whenever \(f \in L^1\). Define the multiplication operator \(M_{\phi} : L^1 \to L^1\) by \(M_{\phi}(f) = \phi f\). ThenLemma: Given \(f,g \in L^1\) and a sequence \({f_n} \in L^1\) and \(\phi\) as above. Suppose \[a) ~ f_n \to f ~~~~~~~\text{and} ~~~~~~~~ b) ~ \phi f_n \to g\]
where both convergences are in \(L^1\). Then \(\phi f = g\) almost everywhere.
Proof: From \(a)\), and Theorem 3.12 in [21], p. 70, \(f_n\) has a subsequence that converges to \(f\) a.e. Replace \(f_n\) by this subsequence and \(a)\) and \(b)\) are still true. From \(b)\), \(\phi f_n\) has a subsequence that converges to \(g\) a.e. Replace \(\phi f_n\) and \(f_n\) by this subsequence and \(a)\) and \(b)\) are still true. So we have \[a') ~ f_n \to f ~~~~~~~\text{and}~~~~~~~~ a'') ~ \phi f_n \to \phi f ~~~~~~~\text{and}~~~~~~~~ b') ~ \phi f_n \to g\] where all convergences are almost everywhere. From \(a'')\) and \(b')\) we conclude that \(\phi f = g\) a.e. \(\square\).
Proof of Proposition: Parts \(a)\) and \(b)\) of the Lemma state that \((f_n,\phi f_n) \to (f,g)\) in \(L^1 \times L^1\). Define the graph of \(M_{\phi}\) in \(L^1 \times L^1\) to be the set of all pairs \((f,\phi f)\), \(f \in L^1\). The conclusion of the Lemma states that this graph is closed. So by the closed graph theorem ([21] p. 122), \(M_\phi\) is continuous. This shows part \(1.\)
Consider the functional \(f \mapsto \int \phi f \, d\mu\) on \(L^1\). It is the composition of \(M_\phi\) and a trivially continuous functional, and is therefore continous. Since \(L^1\) is \(\sigma\)-finite, the standard duality theorem ([21] p. 136), implies that there is a unique \(g \in L^\infty\) so that \(\int \phi f \, d\mu = \int g f \, d\mu\) for all \(f \in L^1\). Therefore \(\phi = g\), and this shows part \(2.\)
If \(\left\lVert \phi \right\rVert_\infty = 0\) then \(\phi=0\) and \(\left\lVert M_\phi \right\rVert = 0\), so part \(3.\) is trivially true. Assume now that \(\left\lVert \phi \right\rVert_\infty > 0\). Let \(f \in L^1\) with \(\left\lVert f \right\rVert = 1\). Then \[\left\lVert M_\phi (f) \right\rVert_1 ~=~ \int_0^1 \left\lvert \phi f \right\rvert \, d\mu ~=~ \int_0^1 \left\lvert \phi \right\rvert \left\lvert f \right\rvert \, d\mu ~\le~ \left\lVert \phi \right\rVert_\infty \int_0^1 \left\lvert f \right\rvert \, d\mu ~=~ \left\lVert \phi \right\rVert_\infty \] This shows \(\left\lVert M_\phi \right\rVert \le \left\lVert \phi \right\rVert_\infty\). For the other direction, let \(\alpha\) be any number with \(0 < \alpha < \left\lVert \phi \right\rVert_\infty\), and let \(E_\alpha := \left\lvert \phi \right\rvert ^{-1} ( [\alpha,\infty] )\). Then by the definition of \(\left\lVert \phi \right\rVert_\infty\), \(\mu( E_\alpha) > 0\). Let \(f_\alpha := \chi_{E_\alpha} / \mu( E_\alpha)\) (the \(L^1\)-normalized indicator function of \(E_\alpha\)). Then \[ \left\lVert M_\phi (f_\alpha) \right\rVert_1 ~:=~ \left\lVert \phi f_\alpha \right\rVert_1 ~:=~ \int_0^1 \left\lvert \phi \right\rvert f_\alpha \, d\mu ~\ge~ \int_0^1 \alpha f_\alpha \, d\mu ~=~ \alpha \int_0^1 f_\alpha \, d\mu ~=~ \alpha \left\lVert f_\alpha \right\rVert_1 ~=~ \alpha \] So \(\left\lVert M_\phi \right\rVert \ge \alpha\) for every \(\alpha < \left\lVert \phi \right\rVert_\infty\), which implies \(\left\lVert M_\phi \right\rVert \ge \left\lVert \phi \right\rVert_\infty\). This shows part \(3.\) \(\square\).
Corollary: Let \(M\) be the vector space of all multiplication operators on \(L^1\). Then the mapping \(L^\infty \to M\) given by \(\phi \mapsto M_\phi\) is a norm-preserving isomorphism.
Proof:The mapping is clearly injective. The Proposition shows that it is surjective and norm-preserving. \(\square\)
Consider these subtle differences in the way light sources and responders (detectors) are appropriately measured:
'power->neural'
), a photovoltaic cell ('power->electrical'
), or photosynthesis ('power->action'
). All of these respond (almost) instantaneously. 'energy->electrical'
), or erythemal exposure ('energy->action'
). For these responders there is a well-defined integration time.
Since color science emphasizes constant light sources and biological eyes, power has always seemed more appropriate to me than energy. But starting with colorSpec version 0.7-1 I decided to switched to energy
for these reasons:
energy->electrical
) what matters to the color of the photograph is the integral of the spectrum (the energy) of the flash bulb over the exposure interval of the camera. This is a case when the light spectrum is not constant; it can vary over that interval. Similarly, in photosynthesis (energy->action
) what matters to the plant is the integral of daylight from sunrise to sunset. Think of the daytime as a very long pulse. For an example, see the file solar.exposure.txt
in Appendix B.
I also considered allowing both energy
and power
, and both photons
and photons/time
. But this would force the user to decide whether a light source is constant or variable, and whether a responder/detector is integrating or non-integrating. So things quickly got complicated. These common radiant SI quantities - radiant power, irradiance, radiant exitance, radiant intensity, radiance - differ only in area and steradian. Time is now grouped with these 2 geometric units.
In physics, wavelengths are in some interval of real numbers - an uncountable set. But in engineering, one is forced to use wavelengths taken from a finite table of values. Given a table of wavelengths and values, a software package must make some sort of choice of what the physical interpretation of this table really is. In colorSpec the choice is schizophrenic - there are multiple interpretations.
With few exceptions, a table of wavelengths and values is interpreted as a step function. Such functions are sometimes called piecewise-constant. This requires a lengthy explanation. Suppose X
is a colorSpec object with \(N\) wavelengths: \(\lambda_1 < \lambda_2 < \ldots < \lambda_N\). Define \(N\) intervals \(I_i := [\beta_{i-1},\beta_i]\) where \[\begin{equation}
\beta_0 := \tfrac{3}{2}\lambda_1 - \tfrac{1}{2}\lambda_2 ~~~~~
\beta_i := (\lambda_i + \lambda_{i+1})/2, ~ i{=}1,\ldots,N-1 ~~~~~
\beta_N := \tfrac{3}{2}\lambda_N - \tfrac{1}{2}\lambda_{N-1}
\end{equation}\] The intervals \(I_i\) are a partition of \([\beta_0,\beta_N]\). Note that \([\beta_0,\beta_N]\) is slightly bigger than \([\lambda_1,\lambda_N]\) because the endpoints are extended. Define the \(i'th\) step \(\mu_i := \operatorname{length}(I_i), ~ i{=}1,\ldots,N\). If the sequence \(\{\lambda_i\}\) is regular (\(\lambda_{i+1}-\lambda_i\) is constant), then \(\mu_i\) is constant with the same value, and each \(\lambda_i\) is the center of \(I_i\). Now suppose X
has \(m\) spectra (channels) with vector values \(\mathbf{y}_i \in \mathbb{R}^m\). Then the physical function realization of X
is a function \(\mathbf{y}(\lambda) : [\beta_0,\beta_N] \to \mathbb{R}^m\) that takes the constant value \(\mathbf{y}_i\) on \(I_i\). If the sequence \(\{\lambda_i\}\) is regular, then all \(\mathbf{y}_i\) have the same weight, including the first and last. This is the step function interpretation used in product()
, interpolate()
, bandSpectra()
, and many other places.
The exceptions are resample()
and plot()
. In resample()
the physical functions are piecewise-linear, piecewise-cubic, or piecewise-quintic, depending on the argument method
(a smoothing method is also available). In plot()
the spectra are plotted as piecewise-linear (using lines()
) by default, but an option to plot as step functions (using segments()
) was added in v. 1.2-0.
The function product()
often takes the product of spectra. Note that the product of piecewise-linear functions is not piecewise-linear, but the product of step functions is still a step function.
In lengthy calculations using both interpretations, there are inevitable numerical errors, which are certainly larger than the usual numerical roundoff. But we do not attempt carry the error analysis any further than that.
R version 4.2.0 (2022-04-22 ucrt) Platform: x86_64-w64-mingw32/x64 (64-bit) Running under: Windows 10 x64 (build 19044) Matrix products: default locale: [1] LC_COLLATE=C [2] LC_CTYPE=English_United States.utf8 [3] LC_MONETARY=English_United States.utf8 [4] LC_NUMERIC=C [5] LC_TIME=English_United States.utf8 attached base packages: [1] stats graphics grDevices utils datasets methods base other attached packages: [1] colorSpec_1.4-0 loaded via a namespace (and not attached): [1] digest_0.6.29 R6_2.5.1 jsonlite_1.8.0 [4] magrittr_2.0.3 evaluate_0.15 rlang_1.0.2 [7] stringi_1.7.6 jquerylib_0.1.4 bslib_0.3.1 [10] rmarkdown_2.14 tools_4.2.0 stringr_1.4.0 [13] xfun_0.30 yaml_2.3.5 fastmap_1.1.0 [16] compiler_4.2.0 microbenchmark_1.4.9 htmltools_0.5.2 [19] knitr_1.39 sass_0.4.1