# Should melding/merging of binomial heaps be done in one pass or two?

Okasaki's implementation in Purely Functional Data Structures (page 22) does it in two: one to merge the forest, and one to propagate the carries. This strikes me as harder to analyze, and also probably slower, than a one-pass version. Am I missing something?

Okasaki's implementation:

```functor BinomialHeap (Element:ORDERED):HEAP=
struct
structure Elem=Element
datatype Tree = Node of int*Elem.T*Tree list
type Heap = Tree list
fun link (t1 as Node (r,x1,c1), t2 as Node (_,x2,c2))=
if Elem.leq(x1,x2)
then Node (r+1,x1,t2::c1)
else Node (r+1,x2,t1::c2)
fun insTree (t,[])=[t]
|insTree (t,ts as t'::ts')=
if rank t < rank t' then t::ts else insTree(link(t,t'),ts')
fun insert (x,ts)=insTree(Node(0,x,[]),ts) (*just for reference*)
fun merge (ts1,[])=ts1
|merge ([],ts2)=ts2
|merge (ts1 as t1::ts1', ts2 as t2:ts2')=
if rank t1 < rank t2 then t1::merge(ts1',ts2)
else if rank t2 < rank t1 then t2::merge(ts1,ts2')
end```

This strikes me as hard to analyze because you have to prove an upper bound on the cost of propagating all the carries (see below). The top-down merge implementation I came up with is much more obviously O(log n) where n is the size of the larger heap:

```functor BinomialHeap (Element:ORDERED):HEAP=
struct
structure Elem=Element
datatype Tree = Node of int*Elem.T*Tree list
type Heap = Tree list
fun rank (Node(r,_,_))=r
fun link (t1 as Node (r,x1,c1), t2 as Node (_,x2,c2))=
if Elem.leq(x1,x2)
then Node (r+1,x1,t2::c1)
else Node (r+1,x2,t1::c2)
fun insTree (t,[])=[t]
|insTree (t,ts as t'::ts')=
if rank t < rank t' then t::ts else insTree(link(t,t'),ts')
fun insert (x,ts)=insTree(Node(0,x,[]),ts)

fun merge(ts1,[])=ts1
|merge([],ts2)=ts2
|merge (ts1 as t1::ts1', ts2 as t2::ts2')=
if rank t1 < rank t2 then t1::merge(ts1',ts2)
else if rank t2 < rank t1 then t2::merge(ts1,ts2')
(*mwc=merge with carry*)
and mwc (c,ts1,[])=insTree(c,ts1)
|mwc (c,[],ts2)=insTree(c,ts2)
|mwc (c,ts1 as t1::ts1', ts2 as t2::ts2')=
if rank c < rank t1
then if rank c < rank t2 then c::merge(ts1,ts2)