/* Insert the element e into the relaxed Fibonacci heap Q */
1.Form a tree with a single node N of type I consisting of element e
2. Add(Q, N)
3. With each node N of type I we associate a ﬁeld lost which denotes the
number of children of type I lost by N since its lost ﬁeld was last reset to
For any node N of type I in Q, deﬁne WN as the weight of node N as
follows: WN = 0, if N:lost = 0. Else, WN = 2
Also for any node N of type I, deﬁne wN as the increase in WN due to N
losing its last child. That is, wN = 0 or 1 or 2
on whether N:lost = 0 or 1 or greater than one.
Deﬁne weight W =
WN for all N of type I in Q.
Every relaxed Fibonacci heap has a special variable P, which is equal to
one of the nodes of the tree. Initially, P = R.
(a) R:lost = R0:lost = R1:lost = ::: = Rk¡1:lost = 0.
(b) Let N be any node of type I. Let N:degree = d and let the children
of N of type I be N0, N1, ..., Nd¡1. Then, for any Ni
:lost ¸ i.
(c) W · n + wP .
4. Associated with Q we have a list LM = (M1; M2; :::; Mm) of all nodes of
type II in Q other than R0
. Each node Mi was originally the R0
relaxed Fibonacci heap Qi till some meld operation. Let ni denote the
number of nodes in Qi
just before that meld operation.
:degree · 4dlog nie + 4.
(b) ni + i · n
I hope it helps