I have a solution, but it's not particularly efficient. I implemented the tree as a bunch of three element lists, like [Element, Left, Right], but it should work the same.
% returns a list of nodes at the given level of the tree
level( , _,  ).
level( [Element, _, _], 0, [Element] ) :- !.
level( [_, Left, Right], N, Result ) :-
NewN is N - 1,
level( Left, NewN, LeftResult ),
level( Right, NewN, RightResult ),
append( LeftResult, RightResult, Result ).
% does a bfs, returning a list of lists, where each inner list
% is the nodes at a given level
bfs( Tree, Result ) :-
level( Tree, 0, FirstLevel ), !,
bfs( Tree, 1, FirstLevel, , BFSReverse ),
reverse( BFSReverse, Result ).
bfs( _, _, , Accum, Accum ) :- !.
bfs( Tree, Num, LastLevel, Accum, Result ) :-
level( Tree, Num, CurrentLevel ), !,
NewNum is Num + 1,
bfs( Tree, NewNum, CurrentLevel, [LastLevel|Accum], Result ).
It should be possible to do this in O(n), but this is O(n^2). I started to work on another solution that returns the level of each element in O(n), but I'm not sure how to transform that list to the solution format in O(n) without resorting to assert/retract.