**Question:** Given a vector, I want to know the minimum of a series of cumulative sums, where each cumulative sum is calculated for an increasing starting index of the vector and a fixed ending index (1:5, 2:5, ..., 5:5). Specifically, I am wondering if this can be calculated w/o using a `for()`

loop, and if there is potentially a term for this algorithm/ calculation. I am working in R.

**Context:** The vector of interest contains a time series of pressure changes. I want to know of the largest (or smallest) net change in pressure across a range of starting points but with a fixed end point.

**Details + Example:**

```
#Example R code
diffP <- c(0, -1, 0, 1, 0, 0, 1, 0, 0, 0, 0, 0, -1, 0, 0, 0, 0, 0, 0, 0, -1, 0, 0)
minNet1 <- min(cumsum(diffP))
minNet1 #over the whole vector, the "biggest net drop" (largest magnitude with negative sign) is -1.
#However, if I started a cumulative sum in the second half of diffP, I would get a net pressure change of -2.
hold <- list()
nDiff <- length(diffP)
for(j in 1:nDiff){
hold[[j]] <- cumsum(diffP[j:nDiff])
}
answer <- min(unlist(hold)) #this gives the answer that I ultimately want
```

Hopefully my example above has helped to articulate my question. `answer`

contains the correct answer, but I'd rather do this without a `for()`

loop in R. Is there a better way to do this calculation, or maybe a name I can put to it?