I'm trying to define a function manipulating matrices of strings in R.

**{+,*} MATRICES MULTIPLICATION**

The {+,*}-product of two square matrices **A** and **B** of dimension n is a matrix **C** defined by the elements: **C**_{i,j} = Sum_{k=1,...,n}**A**_{i,k} * **B**_{k,j}.

For example, consider the matrix `M <- matrix(c(a,b,0,0,c,d,0,0,e),3,3)`

. Then M times M is `M <- matrix(c(a^2,a*b+b*c,b*d,0,c^2,c*d+d*e,0,0,e^2),3,3)`

.

**{c(,),paste0(,)} MATRICES MULTIPLICATION**

The rule of this operation I would like to implement are the same of the previous stated multiplication with the essential mutation that the sum should be a concatenation and the product should be a paste. In other words, where in the previous formula we found `a+b`

, now the output should be "c(a,b)", and when we found `a*b`

, now we should read this as `paste0(a,b)`

.

Some of the usual properties have to be respescted, namely the distributive properties and the 0 element properties. Hence, if `a <- c("q",0,"w")`

and `b <- c("e")`

then `a*b <- c("qe",0,"we")`

(and we should freely forget the 0 element, dropping it as it won't affect the computation.

Moreover, we are multiplying equaldimensioned matrices, hence each element **C**_{i,j} = Sum_{k=1,...,n}**A**_{i,k} * **B**_{k,j} is now to be read as `c("A[i,1]B[1,j]",...,"A[i,n]B[n,j]")`

.

For semplicity sakeness, let's consider **B** always a *simple* matrix, meaning that each of its elements are atomic string, and not concatenation of string (the generalization is a subsequent step).

Let's give an example. Let `A <- matrix(c("a","b",0,0,"c","d",0,0,"e"),3,3)`

, then `mult(A,A) = matrix(c("aa",c("ab","bc"),"bd",0,"cc",c("cd","de"),0,0,"ee"),3,3)`

and `mult(mult(A,A),A) = matrix(c("aaa",c("aab","abc","bcc"),c("abd","bcd","bde"),0,"ccc",c("ccd","cde","dee"),0,0,"eee"),3,3)`

.

**PARTIAL (NOT WORKING) IMPLEMENTATION**

Consider as input a couple of nxn matrices **M** , **N** with whether 0 or array of strings c(*s*_{1},*s*_{2},...) as **i,j** elements. As output I would like to have a matrix **MN = M x N** where the multiplication is defined in analogy with the symbolic multiplication:

**MN**_{i,j} = 0 if **M**_{i,.} or **N**_{.,j} is 0

**MN**_{i,j} = paste(**M**_{i,.},**N**_{.,j}) otherwise (using the *distributive* property of `paste()`

)

I gave a (wrong, does not check properly the zeros) definition of the base *row/column paste* function as

```
MijPaste <- function(Row,Col){
if(Col[1]=="0"){
Mij <- 0
} else if(Row[1]=="0"){
Mij <- 0
} else
Mij <- paste(Row,Col,sep="")
return(Mij)
}
```

I've not been able to go from this step to a proper definition of the multiplication function, as the element Mij that I would like to insert inside the matrix are not of the right dimension. And hence I get a `number of items to replace is not a multiple of replacement length`

error. My current implementation is:

```
# define the dimension of the matrix, here for example 3
dim <- 3
# define the Multiplication function as an iteration of the MijPaste function
Mult <- function(M1,M2){
#allocate a matrix of dimension nxn
M <- matrix(0,dim,dim)
#for each element i,j define it as the MijPaste of row i column j
for(i in 1:dim){
for(j in 1:dim){
stringi <- M1[i,]
stringj <- M2[,j]
M[i,j] <- MijPaste(stringi,stringj)
}
}
return(M)
}
```

The code doesn't work. I could probably change the matrix into a multidimensional array, but I would like the output to be usable as a matrix for further multiplication (for example to defin (MxN)xC).

How can I do?

Thank you!

P.S. You can test the code using a simple example matrix

```
Matr <- matrix(c("11","12","13","21","22","23","31","32","33"),dim,dim)
```

and running

```
Mult(Matr,Matr)
```

`c("A[i,1]B[1,j]",...,"A[i,n]B[n,j]")`

to`M[i,j]`

. You have tocollapsethis vector to a length-one character string first, as I pointed out in my comments below. – Ferdinand.kraft Mar 29 '13 at 22:38