Skip to contents

spray

Overview

The spray package provides functionality for sparse arrays.
In a sparse arrays, nonzero elements are stored along with an index vector describing their coordinates. The spray package provides functionality for sparse arrays and interprets them as multivariate polynomials.

Installation

You can install the released version of spray from CRAN with:

# install.packages("spray")  # uncomment this to install the package
library("spray")

The spray package in use

Base R has extensive support for multidimensional arrays. Consider

a <- array(0,dim=4:12)
a[2,2,2,2,2,2,2,2,2] <- 17
a[3,4,2,2,7,2,3,2,3] <- 18

Handling a requires storage of floating point numbers (of which two are nonzero), represented in an elegant format amenable to extraction and replacement. Arrays such as this in which many of the elements are zero are common and in this case storing only the nonzero elements and their positions would be a more compact and efficient representation. To create a sparse array object in the spray package, one specifies a matrix of indices with each row corresponding to the position of a nonzero element, and a numeric vector of values:

library("spray")
M <- rbind(
  c(2,2,2,2,2,2,2,2,2),
  c(3,4,2,2,7,2,3,2,3))

S1 <- spray(M,7:8)
S1
#>                        val
#>  3 4 2 2 7 2 3 2 3  =    8
#>  2 2 2 2 2 2 2 2 2  =    7

Note that object S1 is rather compact by comparison with plain array a, as it needs to record only a 18-element index array of integers and two double-precision entries. The order in which the elements are stored is implementation-specific (see the vignette for details and an extended discussion).

Basic arithmetic is implemented where appropriate. If we define

S2 <-spray(rbind(
  c(1,2,3,1,3,3,1,4,1),
  c(3,4,2,2,7,2,3,2,3)), c(100,-8))
S2
#>                        val
#>  3 4 2 2 7 2 3 2 3  =   -8
#>  1 2 3 1 3 3 1 4 1  =  100

then

S1+S2
#>                        val
#>  2 2 2 2 2 2 2 2 2  =    7
#>  1 2 3 1 3 3 1 4 1  =  100

(the entry with value 8 has cancelled out).

The spray package and multivariate polynomials

One natural application for spray objects is multivariate polynomials. Defining

S1 <- spray(matrix(c(0,0,0,1,0,0,1,1,1,2,0,3),ncol=3),1:4)
S2 <- spray(matrix(c(6,-7,8,0,0,2,1,1,3),byrow=TRUE,ncol=3),c(17,11,-4))
S1
#>            val
#>  1 1 3  =    4
#>  0 0 2  =    2
#>  0 1 0  =    3
#>  0 0 1  =    1
S2
#>             val
#>  1  1 3  =   -4
#>  0  0 2  =   11
#>  6 -7 8  =   17

it is natural to interpret the rows of the index matrix as powers of different variables of a multivariate polynomial, and the values as being the coefficients. This is realised in the package using the polyform print option, which if set to TRUE, modifies the print method:

options(polyform = TRUE)
S1
#> +4*x*y*z^3 +2*z^2 +3*y +z
S2
#> -4*x*y*z^3 +11*z^2 +17*x^6*y^-7*z^8

(only the print method has changed; the objects themselves are unaltered). The print method interprets, by default, the three columns as variables although this behaviour is user-definable. With this interpretation, multiplication and addition have natural definitions as multivariate polynomial multiplication and addition:

S1+S2
#> +13*z^2 +3*y +z +17*x^6*y^-7*z^8
S1*S2
#> +17*x^6*y^-7*z^9 +11*z^3 +51*x^6*y^-6*z^8 +34*x^6*y^-7*z^10 -4*x*y*z^4
#> +33*y*z^2 -12*x*y^2*z^3 +22*z^4 +36*x*y*z^5 +68*x^7*y^-6*z^11
#> -16*x^2*y^2*z^6
S1^2+4*S2
#> +8*x*y*z^4 +9*y^2 +68*x^6*y^-7*z^8 +24*x*y^2*z^3 -16*x*y*z^3
#> +16*x*y*z^5 +45*z^2 +16*x^2*y^2*z^6 +4*z^3 +12*y*z^2 +4*z^4 +6*y*z

It is possible to introduce an element of symbolic calculation, exhibiting familiar algebraic identities. Consider the lone() function, which creates a sparse array whose multivariate polynomial interpretation is a single variable:

x <- lone(1, 3)
y <- lone(2, 3)
z <- lone(3, 3)
(x + y) * (y + z) * (x + z) - (x + y + z) * (x*y + x*z + y*z)
#> -x*y*z

thus illustrating the identity .

Spray objects can be coerced to functions:

S4 <- spray(cbind(1:3, 3:1), 1:3)
f <- as.function(S4)
f(c(1, 2))
#>  X 
#> 22

Differentiation is also straightforward. Suppose we wish to calculate the multivariate polynomial corresponding to

(xyz + x+2y+3z)^3.

This would be

aderiv((xyz(3) + linear(1:3))^3, 1:3)
#> +216*x +108*x^2*y

The package vignette offers a detailed discussion of the package design philosophy; also, the mvp package provides a further interpretation of the concept of “sparse” in the context of multivariate polynomials.