If you just want top M smallest elements from N elements then use the heap that would give you the biggest element and prune the heap whenever its size goes over value M. Then take elements from the heap in reverse order.

```
package main
import (
"container/heap"
"fmt"
"math/rand"
)
type IntHeap []int
func (h IntHeap) Len() int { return len(h) }
func (h IntHeap) Less(i, j int) bool { return h[i] > h[j] }
func (h IntHeap) Swap(i, j int) { h[i], h[j] = h[j], h[i] }
func (h *IntHeap) Push(x interface{}) {
*h = append(*h, x.(int))
}
func (h *IntHeap) Pop() interface{} {
old := *h
n := len(old)
x := old[n-1]
*h = old[0 : n-1]
return x
}
const (
n = 1000000
m = 5
)
func main() {
h := &IntHeap{}
heap.Init(h)
for i := 0; i < n; i++ {
x := rand.Intn(n)
heap.Push(h,x)
if h.Len() > m {
heap.Pop(h)
}
}
r := make([]int, h.Len())
for i := len(r) - 1; i >= 0; i-- {
r[i] = heap.Pop(h).(int)
}
fmt.Printf("%v\n", r)
}
```

This algorithm has memory complexity of M and time complexity of N + N * log M + M * log M.