simple examples of filter function, recursive option specifically

Question

I am seeking some simple (i.e. - no maths notation, long-form reproducible code) examples for the filter function in R I think I have my head around the convolution method, but am stuck at generalising the recursive option. I have read and battled with various documentation, but the help is just a bit opaque to me.

Here are the examples I have figured out so far:

# Set some values for filter components
f1 <- 1; f2 <- 1; f3 <- 1;

And on we go:

# basic convolution filter
filter(1:5,f1,method="convolution")
[1] 1 2 3 4 5

#equivalent to:
x[1] * f1 
x[2] * f1 
x[3] * f1 
x[4] * f1 
x[5] * f1 

# convolution with 2 coefficients in filter
filter(1:5,c(f1,f2),method="convolution")
[1]  3  5  7  9 NA

#equivalent to:
x[1] * f2 + x[2] * f1
x[2] * f2 + x[3] * f1
x[3] * f2 + x[4] * f1 
x[4] * f2 + x[5] * f1 
x[5] * f2 + x[6] * f1

# convolution with 3 coefficients in filter
filter(1:5,c(f1,f2,f3),method="convolution")
[1] NA  6  9 12 NA

#equivalent to:
 NA  * f3 + x[1] * f2 + x[2] * f1  #x[0] = doesn't exist/NA
x[1] * f3 + x[2] * f2 + x[3] * f1
x[2] * f3 + x[3] * f2 + x[4] * f1 
x[3] * f3 + x[4] * f2 + x[5] * f1 
x[4] * f3 + x[5] * f2 + x[6] * f1

Now's when I am hurting my poor little brain stem. I managed to figure out the most basic example using info at this post: https://stackoverflow.com/a/11552765/496803

filter(1:5, f1, method="recursive")
[1]  1  3  6 10 15

#equivalent to:

x[1]
x[2] + f1*x[1]
x[3] + f1*x[2] + f1^2*x[1]
x[4] + f1*x[3] + f1^2*x[2] + f1^3*x[1]
x[5] + f1*x[4] + f1^2*x[3] + f1^3*x[2] + f1^4*x[1]

Can someone provide similar code to what I have above for the convolution examples for the recursive version with filter = c(f1,f2) and filter = c(f1,f2,f3)?

Answers should match the results from the function:

filter(1:5, c(f1,f2), method="recursive")
[1]  1  3  7 14 26

filter(1:5, c(f1,f2,f3), method="recursive")
[1]  1  3  7 15 30

EDIT

To finalise using @agstudy's neat answer:

> filter(1:5, f1, method="recursive")
Time Series:
Start = 1 
End = 5 
Frequency = 1 
[1]  1  3  6 10 15
> y1 <- x[1]                                            
> y2 <- x[2] + f1*y1      
> y3 <- x[3] + f1*y2 
> y4 <- x[4] + f1*y3 
> y5 <- x[5] + f1*y4 
> c(y1,y2,y3,y4,y5)
[1]  1  3  6 10 15

and...

> filter(1:5, c(f1,f2), method="recursive")
Time Series:
Start = 1 
End = 5 
Frequency = 1 
[1]  1  3  7 14 26
> y1 <- x[1]                                            
> y2 <- x[2] + f1*y1      
> y3 <- x[3] + f1*y2 + f2*y1
> y4 <- x[4] + f1*y3 + f2*y2
> y5 <- x[5] + f1*y4 + f2*y3
> c(y1,y2,y3,y4,y5)
[1]  1  3  7 14 26

and...

> filter(1:5, c(f1,f2,f3), method="recursive")
Time Series:
Start = 1 
End = 5 
Frequency = 1 
[1]  1  3  7 15 30
> y1 <- x[1]                                            
> y2 <- x[2] + f1*y1      
> y3 <- x[3] + f1*y2 + f2*y1
> y4 <- x[4] + f1*y3 + f2*y2 + f3*y1
> y5 <- x[5] + f1*y4 + f2*y3 + f3*y2
> c(y1,y2,y3,y4,y5)
[1]  1  3  7 15 30

Answer 1

In the recursive case, I think no need to expand the expression in terms of xi. The key with "recursive" is to express the right hand expression in terms of previous y's.

I prefer thinking in terms of filter size.

filter size =1

y1 <- x1                                            
y2 <- x2 + f1*y1      
y3 <- x3 + f1*y2 
y4 <- x4 + f1*y3 
y5 <- x5 + f1*y4 

filter size = 2

y1 <- x1                                            
y2 <- x2 + f1*y1      
y3 <- x3 + f1*y2 + f2*y1    # apply the filter for the past value and add current input
y4 <- x4 + f1*y3 + f2*y2
y5 <- x5 + f1*y4 + f2*y3

Answer 2

Here's the example that I've found most helpful in visualizing what recursive filtering is really doing:

(x <- rep(1, 10))
# [1] 1 1 1 1 1 1 1 1 1 1

as.vector(filter(x, c(1), method="recursive"))  ## Equivalent to cumsum()
#  [1]  1  2  3  4  5  6  7  8  9 10
as.vector(filter(x, c(0,1), method="recursive"))
#  [1] 1 1 2 2 3 3 4 4 5 5
as.vector(filter(x, c(0,0,1), method="recursive"))
#  [1] 1 1 1 2 2 2 3 3 3 4
as.vector(filter(x, c(0,0,0,1), method="recursive"))
#  [1] 1 1 1 1 2 2 2 2 3 3
as.vector(filter(x, c(0,0,0,0,1), method="recursive"))
#  [1] 1 1 1 1 1 2 2 2 2 2

Answer 3

With recursive, the sequence of your "filters" is the additive coefficient for the previous sums or output values of the sequence. With filter=c(1,1) you're saying "take the i-th component in my sequence x and add to it 1 times the result from the previous step and 1 times the results from the step before that one". Here's a couple examples to illustrate

I think the lagged effect notation looks like this:

## only one filter, so autoregressive cumsum only looks "one sequence behind"
> filter(1:5, c(2), method='recursive')
Time Series:
Start = 1 
End = 5 
Frequency = 1 
[1]  1  4 11 26 57

1 = 1
2*1 + 2 = 4
2*(2*1 + 2) + 3 = 11
...

## filter with lag in it, looks two sequences back
> filter(1:5, c(0, 2), method='recursive')
Time Series:
Start = 1 
End = 5 
Frequency = 1 
[1]  1  2  5  8 15

1= 1
0*1 + 2 = 2
2*1 + 0*(0*1 + 2) + 3 = 5
2*(0*1 + 2) + 0 * (2*1 + 0*(0*1 + 2) + 3) + 4 = 8
2*(2*1 + 0*(0*1 + 2) + 3) + 0*(2*(0*1 + 2) + 0 * (2*1 + 0*(0*1 + 2) + 3) + 4) + 5 = 15

Do you see the cumulative pattern there? Put differently.

1 = 1
0*1 + 2 = 2
2*1 + 0*2 + 3 = 5
2*2 + 0*5 + 4 = 8
2*5 + 0*8 + 5 = 15

Answer 4

I spent one hour in reading this, below is my summary, by comparison with Matlab

NOTATION: command in Matlab = command in R

filter([1,1,1], 1, data) = filter(data, [1,1,1], method = "convolution") ; but the difference is that the first 2 elements are NA 


filter(1, [1,-1,-1,-1], data) = filter(data, [1,1,1], method = "recursive")

If you know some from DSP, then recursive is for IIR, convolution is for FIR