Complete solution to a conjecture on Randić index

European Journal of Operational Research 200 (2010) 9–13

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European Journal of Operational Research journal homepage: www.elsevier.com/locate/ejor

Discrete Optimization

Complete solution to a conjecture on Randic´ index q Xueliang Li a,*, Bolian Liu b, Jianxi Liu a a b

Center for Combinatorics and LPMC-TJKLC, Nankai University, Tianjin 300071, PR China School of Mathematical Science, South China Normal University, Guangzhou 510631, PR China

a r t i c l e

i n f o

Article history: Received 20 September 2007 Accepted 6 December 2008 Available online 24 December 2008 Keywords: Simple graph Minimum degree Randic´ index Minimum value

a b s t r a c t For a graph G, the Randic´ index RðGÞ of G is defined by RðGÞ ¼

P

u;v

1 pffiffiffiffiffiffiffiffiffiffiffiffi ffi, where dðuÞ is the degree of a dðuÞdðv Þ

vertex u and the summation runs over all edges uv of G. Let Gðk; nÞ be the set of connected simple graphs } s once asked for finding the minimum value of the of order n with minimum degree k. Bollobás and Erdo Randic´ index among the graphs in Gðk; nÞ. There have been many partial solutions for this question. In this paper we give a complete solution to the question. Ó 2008 Elsevier B.V. All rights reserved.

1. Introduction The Randic´ index R ¼ RðGÞ of a graph G is defined as follows:

R ¼ RðGÞ ¼

X u;v

1 pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ; dðuÞdðv Þ

ð1:1Þ

where dðuÞ denotes the degree of a vertex u and the summation runs over all edges uv of G. This topological index was first proposed by Randic´ [19] in 1975, suitable for measuring the extent of branching of the carbon-atom skeleton of saturated hydrocarbons. Randic´ himself demonstrated [19] that his index is well correlated with a variety of physico-chemical properties of alkanes. The R became one of the most popular molecular descriptors to which three books are devoted [10,12,13]. Initially, the Randic´ index was studied only by chemists [10,11], but recently it attracted much attention also of mathematicians [13]. One of the mathematical questions asked in connection with R is which graphs in a given class of graphs have maximum and minimum R values [2,18]. Let Gðk; nÞ be the set of connected simple graphs of order n } s asked for finding the minimum value of the Randic´ index with minimum degree k. In [6] Fajtlowitcz mentioned that Bollobás and Erdo among the graphs in Gðk; nÞ. The solution of such problem turned out to be difficult, and only a few partial results have been achieved so } s found that for a connected graph G far. In [2] Bollobás and Erdo

RðGÞ P

pffiffiffiffiffiffiffiffiffiffiffiffi n  1;

ð1:2Þ

and the bound is tight if and only if G is a star. The problem for k ¼ 2 was solved in [5], which gave a stronger result, say, if the minimum degree is greater or equal to 2, then

2n  4 1 ; RðGÞ P pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ 2n  2 n  1

ð1:3Þ

and the bound is tight if and only if G ¼ K I 2;n2 which arises from the complete bipartite graph K 2;n2 by joining the vertices in the partite set with two vertices by a new edge. In these papers a graph theoretical approach has been used. In other papers [3,4,7–9], a linear programming and a quadratic programming technique [14] for finding extremal graphs has been used. In [15] the problem was solved for k ¼ 1 and k ¼ 2, respectively, by using linear programming. Delorme et al. [10] gave a conjecture about this problem. The conjecture in [5] is that the Randic´ index for graphs in Gðk; nÞ, where 1 6 k 6 n  2, attains its minimum value q

Supported by NSFC No. 10831001, 10771080 PCSIRT and the ‘‘973” program. * Corresponding author. Tel.: +86 22 23502180; fax: +86 22 23509272. E-mail address: [email protected] (X. Li).

0377-2217/$ - see front matter Ó 2008 Elsevier B.V. All rights reserved. doi:10.1016/j.ejor.2008.12.010

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X. Li et al. / European Journal of Operational Research 200 (2010) 9–13

for the graph K I k;nk which arises from the complete bipartite graph K k;nk by joining every pair of vertices in the partite set with k vertices by a new edge. Conjecture 1 [5]. Let G ¼ ðV; EÞ be a graph of order n with minimum degree k. Then

kðn  kÞ RðGÞ P pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ kðn  1Þ

  k 1 ; 2 n1

ð1:4Þ

where equality holds if and only if G ¼ K I k;nk . Using again linear programming, Pavlovic´ [16] proved that Conjecture 1 holds when k ¼ ðn  1Þ=2 or k ¼ n=2. See also [14] for further results proved by using quadratic programming. Divnic and Pavlovic´ [17] proved that Conjecture 1 holds when k 6 n=2 and nk P n  k, where nk denotes the number of vertices of degree k. Recently in [1], however, Aouchiche and Hansen showed that Conjecture 1 does not hold in general and proposed a modified conjecture as follows. Let the graph Gn;p;k be the complement of a graph Gn;p;k composed of a ðn  k  1Þ-regular graph on p vertices together with n  p isolated vertices. The minimal counterexample of Conjecture 1 is the graph G7;4;5 , which was given in [1], see Fig. 1. Let

8 nþ2 if > 2 > > nþ3 < if 2 kn ¼ nþ4 > > 2 if > : nþ3 if 2

n  0ðmod 4Þ; n  1ðmod 4Þ; n  2ðmod 4Þ; n  3ðmod 4Þ;

8 n2 > < 2 if n  2ðmod 4Þ and k is even; n p¼ if n  3ðmod 4Þ; 2 > :  n otherwise: 2

ð1:5Þ

For such a graph G ¼ Gn;p;k ,

RðGÞ ¼

ðn  pÞðn  p  1Þ pðp þ k  nÞ pðn  pÞ þ þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi : 2ðn  1Þ 2k kðn  1Þ

Using these results, the authors of [1] gave the following Conjecture 2 as a modification of Conjecture 1. Conjecture 2 [1]. Let G ¼ ðV; EÞ be a graph of order n with minimum degree k, and kn and p be given in (1.5). Then

RðGÞ P

8 kðk1Þ kðnkÞ > ffi < 2ðn1Þ þ pffiffiffiffiffiffiffiffiffiffi kðn1Þ

if k < kn ;

> ffiffiffiffiffiffiffiffiffiffiffi if kn 6 k 6 n  2; þ pðpþknÞ þ ppðnpÞ : ðnpÞðnp1Þ 2ðn1Þ 2k kðn1Þ

where equality holds if and only if G is

KI k;nk

for k < kn , and Gn;p;k for k P kn .

}s’ question of finding the minimum value of the Randic´ index for the In this paper, we want to completely solve the Bollobás and Erdo graphs in Gðk; nÞ. As usual, we formulate the question into a mathematical programming problem. Denote by ni the number of vertices of degree i in G, and by xi;j ðxi;j P 0Þ the number of edges joining the vertices of degrees i and j in G. The mathematical description of our problem is as follows:

min RðGÞ ¼

X k6i6n1 i6j6n1

x pi;jffiffiffi ij

subject to: n1 X

xi;j þ 2xi;i ¼ ini

for k 6 i 6 n  1;

ð1:6Þ

j¼k j–i

nk þ nkþ1 þ    þ nn1 ¼ n;

ð1:7Þ

xi;j 6 ni nj for k 6 i 6 n  1; i < j 6 n  1;   ni xi;i 6 for k 6 i 6 n  1; 2

ð1:8Þ ð1:9Þ

xi;j ; ni are nonnegative integers; for k 6 i 6 j 6 n  1:

ð1:10Þ

Obviously, (1.6)–(1.10) define a nonlinearly constrained optimization problem.

G 7,4,5

G 7,4,5

Fig. 1. The minimal counterexample of Conjecture 1.

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X. Li et al. / European Journal of Operational Research 200 (2010) 9–13

2. Main result Denote

8n > > > 2  >  n > n > > > 2 or 2 > >  > > > 2n > > < or nþ2 p ¼ n2 2 2 > > >n > > > 2 > >   n > > n > > > 2 or 2 > > :  n 2

if n  0ðmod 4Þ; if n  1ðmod4Þ and k is even; if n  1ðmod 4Þ and k is odd; if n  2ðmod 4Þ and k is even;

ð2:11Þ

if n  2ðmod 4Þ and k is odd if n  3ðmod 4Þ and k is even if n  3ðmod 4Þ and k is odd:

Theorem 2.1. Let G ¼ ðV; EÞ be a graph of order n with minimum degree k, and p be given in (2.11). Then we have

RðGÞ P

8 kðk1Þ kðnkÞ > ffi < 2ðn1Þ þ pffiffiffiffiffiffiffiffiffiffi kðn1Þ > : ðnpÞðnp1Þ 2ðn1Þ

þ

pðpþknÞ 2k

if k 6 n=2; pðnpÞ

þ pffiffiffiffiffiffiffiffiffiffiffi if k > n=2;

where equality holds if and only if G is

kðn1Þ

KI k;nk

for k 6 n=2, and Gn;p;k for k > n=2.

Proof. It is easy to see that nn1 6 k, or the minimum degree of a graph in Gðk; nÞ would be larger than k. Therefore we only need to consider the case when nn1 6 k. Let nn1 ¼ k  t for some integer t such that 0 6 t 6 k, and let Rkt denote the Randic´ index for any graph in Gðk; nÞ with nn1 ¼ k  tð0 6 t 6 kÞ. Since xi;n1 ¼ ni nn1 for k 6 i 6 n  2 and xn1;n1 ¼ nn1 ðnn1  1Þ=2, we have

Rkt ¼

X k6i6n1 i6j6n1

n2 X x ni nn1 n ðn  1Þ pi;jffiffiffi ¼ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ n1 n1 2ðn  1Þ iðn  1Þ ij i¼k

n2 x 1X xj1;j x xjþ1;j xj;n2 pk;jffiffiffiffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ 2 pj;jffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ 2 j¼k ðj  1Þj jðj þ 1Þ jðn  2Þ jj kj

P

n2 X i¼k

þ

¼

! ni nn1 nn1 ðnn1  1Þ 1 2xk;k xk;kþ1 xk;n2 pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ pffiffiffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ 2ðn  1Þ 2 iðn  1Þ kðk þ 1Þ kðn  2Þ kk

n2 xk;j þ    þ xj1;j þ 2xj;j þ xj;jþ1 þ    þ xj;n2 1 X pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi 2 j¼kþ1 jðn  1Þ

n2 X i¼k

þ

!

ð2:12Þ

ni nn1 n ðn  1Þ 1 2xk;k xk;kþ1 xk;n2 pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ n1 n1 pffiffiffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ 2ðn  1Þ 2 iðn  1Þ kðk þ 1Þ kðn  2Þ kk

!

n2 jnj  nj nn1 1 X pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi 2 j¼kþ1 jðn  1Þ

ð2:13Þ

n2 pffi n2 X X 1 nn1 n nn1 ðnn1  1Þ pjffi þ jnj þ pffiffiffiffiffiffiffiffiffiffiffiffi ¼ pffiffiffiffiffiffiffiffiffiffiffiffi 2ðn  1Þ 2 n  1 j¼kþ1 j 2 n  1 j¼kþ1 ! 1 2xk;k xk;kþ1 xk;n2 nk nn1 pffiffiffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ; 2 kðk þ 1Þ kðn  2Þ kðn  1Þ kk 1 ffi where inequality (2.12) holds because p1ffii P pffiffiffiffiffiffi for k þ 1 6 i 6 n  2, and equality (2.13) holds because of (1.6). After substitution of n1 nn1 ¼ k  t and nk ¼ n  k þ t  nkþ1  nkþ2      nn2 into the last equality, we have

Rkt P

Since ptffiffi k

! ! n2 pffi pffiffiffi ðk  tÞðk  t  1Þ ðk  tÞðn  k þ tÞ X 1 1 t nj pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi pffiffiffiffiffiffiffiffiffiffiffiffi j  k  ðk  tÞ pffiffiffi  pffi þ pffiffiffi þ þ 2ðn  1Þ kðn  1Þ 2 n 1 j k k j¼kþ1 ! 1 2xk;k xk;kþ1 xk;n2 pffiffiffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi : þ 2 kðk þ 1Þ kðn  2Þ kk

pffi pffiffi pffiffiffiffi pffi pffiffiffi pffi pffiffiffi j k kj > k  t for k þ 1 6 j 6 n  2, we have j  k > ðk  tÞ pffiffiffi , i.e., j  k > ðk  tÞ

> 0. Since if nj ¼ 0 then xi;j ¼ 0 for k 6 i 6 j 6 n  2, we then have

kj



p1ffiffi k

   pffi pffiffiffi 1ffi . Thus j  k  ðk  tÞ p1ffiffik  p1 ffi þ p j

j

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X. Li et al. / European Journal of Operational Research 200 (2010) 9–13

! ! n2 pffi pffiffiffi ðk  tÞðk  t  1Þ ðk  tÞðn  k þ tÞ X 1 1 t nj pffiffiffiffiffiffiffiffiffiffiffi ffi pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ j  k  ðk  tÞ pffiffiffi  pffi þ pffiffiffi 2ðn  1Þ kðn  1Þ j k k 2 n1 j¼kþ1 ! 1 2xk;k xk;kþ1 xk;n2 pffiffiffiffiffi þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi ffi þ    þ pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ 2 kðk þ 1Þ kðn  2Þ kk P

ðk  tÞðk  t  1Þ ðk  tÞðn  k þ tÞ xk;k pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ : 2ðn  1Þ k kðn  1Þ

Notice that equalities hold in all the above inequalities if and only if nj ¼ 0; j ¼ k þ 1; k þ 2; . . . ; n  2. Thus,

Rkt P

ðk  tÞðk  t  1Þ ðk  tÞðn  k þ tÞ xk;k pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ ; 2ðn  1Þ k kðn  1Þ

where equality holds if and only if nj ¼ 0; j ¼ k þ 1; k þ 2; . . . ; n  2. We know that if nj ¼ 0; j ¼ k þ 1; k þ 2; . . . ; n  2, then nk ¼ n  k þ t; nn1 ¼ k  t; xk;k ¼ ðn  k þ tÞt=2; xn1;n1 ¼ ðk  tÞðk  t  1Þ=2 and all other xi;j and xi;i are equal to zero. Therefore,

Rkt P

ðk  tÞðk  t  1Þ ðk  tÞðn  k þ tÞ ðn  k þ tÞt pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ ; 2ðn  1Þ 2k kðn  1Þ

where equality holds if and only if nj ¼ 0; j ¼ k þ 1; k þ 2; . . . ; n  2. Let

f ðk; tÞ ¼

ðk  tÞðn  k þ tÞ ðk  tÞðk  t  1Þ ðn  k þ tÞt pffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi þ þ : 2ðn  1Þ 2k kðn  1Þ

We only need to get the minimum value of f ðk; tÞ, by distinguishing two cases. Case 1. k 6 n=2. Since of ðk; tÞ=ot ¼ nþ2t2k 2



p1ffiffi k

2 1 ffi  pffiffiffiffiffiffi P 0, and of ðk; tÞ=ot > 0 strictly holds except for k  t ¼ n=2, i.e., k ¼ n=2 þ t, we know that f ðk; tÞ n1

attains its minimum if and only if t ¼ 0 since k 6 n=2 in this case. So, in this case we can conclude that the Randic´ index attains its  minimum in Gðk; nÞ if and only if all the above equalities hold, which  k and all other xi;j ; xi;i are equal to zero. Therefore, a graph G in means that nk ¼ n  k; nn1 ¼ k; nj ¼ 0; j ¼ k þ 1; . . . ; n  2; xn1;n1 ¼ 2 Gðk; nÞ attains the minimum value of the Randic´ index if and only if G ¼ K k;nk for k 6 n=2. Case 2. n  2 P k > n=2.



2

2 1 ffi 1 ffi p1ffiffi  pffiffiffiffiffiffi Let of ðk; tÞ=ot ¼ nþ2t2k ¼ 0. Then t ¼ k  n=2. Since o2 f ðk; tÞ=ot2 ¼ p1ffiffik  pffiffiffiffiffiffi > 0, f ðk; tÞ attain its minimum if and only if 2 n1 n1 k t ¼ k  n=2. Then we have nk ¼ n=2; xk;k ¼ nð2k  nÞ=2 and xn1;n1 ¼ nðn  2Þ=8. Next, we need to check whether they are integers or not, since the obtained solutions have no graph theoretical meaning when one of the three values, namely, xk;k ¼ ðn  k þ tÞt=2, xn1;n1 ¼ ðk  tÞðk  t  1Þ=2 and t, is not an integer.

Subcase 2.1. n  0ðmod 4Þ. We can easily check that t ¼ k  n=2; xk;k ¼ n=2 and xn1;n1 ¼ nðn  2Þ=8 are integers in this case. Therefore, a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G ¼ Gn;n=2;k in the case n  0ðmod 4Þ. Subcase 2.2. n  1ðmod 4Þ. We see first that t ¼ k  n=2 is not an integer in this case. Therefore, the obtained solutions have no graph theoretical meaning. Then t can not attain k  n=2 if we want to get the minimum value of the Randic´ index in Gðk; nÞ. We then let t 6 k  nþ1 or t P k  n1 . 2 2 , we have n þ 2t  2k 6 1 < 0. Thus of ðk; tÞ=ot < 0. Therefore, f ðk; tÞ attains its minimum if and only if t ¼ k  nþ1 in this For t 6 k  nþ1 2 2 case. And then nk ¼ ðn  1Þ=2; nn1 ¼ ðn þ 1Þ=2; xk;k ¼ ðn  1Þð2k  n  1Þ=8; xn1;n1 ¼ ðn þ 1Þðn  1Þ=2 all are integers. So, pffiffiffiffiffiffiffiffiffiffiffi þ ðnþ1Þðn1Þ þ ðnþ1Þðn1Þ . For t P k  n1 , we have n þ 2t  2k P 1 > 0. Thus of ðk; tÞ=ot > 0. Therefore, f ðk; tÞ attains its minf ðk; tÞ ¼ ðn1Þð2kn1Þ 8k 8ðn1Þ 2 4

kðn1Þ

in this case. And then nk ¼ ðn þ 1Þ=2; nn1 ¼ ðn  1Þ=2; xk;k ¼ ðn þ 1Þð2k  n þ 1Þ=8; xn1;n1 ¼ minimum if and only if t ¼ k  n1 2 pffiffiffiffiffiffiffiffiffiffiffi þ ðn1Þðn3Þ pffiffiffiffiffiffiffiffiffiffiffi þ ðnþ1Þðn1Þ þ ðnþ1Þðn1Þ ¼ ðn1Þð2kn1Þ þ ðnþ1Þðn1Þ , which is ðn  1Þðn  3Þ=2 all are integers if k is even. So, minf ðk; tÞ ¼ ðnþ1Þð2knþ1Þ 8k 8ðn1Þ 8k 8ðn1Þ 4

kðn1Þ

4

kðn1Þ

. the same as the minimum value for the above case when t 6 k  nþ1 2 Therefore, a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G is Gn;bnc;k for k both even and odd, or Gn;dne;k 2 2 for k even in the case n  1ðmod4Þ. Subcase 2.3. n  2ðmod 4Þ. We can easily check that t ¼ k  n=2; xk;k ¼ nð2k  nÞ=8 and xn1;n1 ¼ nðn  2Þ=8 are integers if k is odd in this case. Therefore, a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G is Gn;n=2;k for k odd in the case n  1ðmod 4Þ. If k is even, then xk;k ¼ nð2k  nÞ=8 is not an integer in this case, which means that t can not attain k  n=2 if we want to get the minor t P k  n2 . imum value of the Randic´ index in Gðk; nÞ. We then let t 6 k  nþ2 2 2

X. Li et al. / European Journal of Operational Research 200 (2010) 9–13

13

For t 6 k  nþ2 , we have n þ 2t  2k 6 2 < 0. Thus of ðk; tÞ=ot < 0. Therefore, f ðk; tÞ attains its minimum if and only if t ¼ k  nþ2 in this 2 2 case. And then nk ¼ ðn  2Þ=2; nn1 ¼ ðn þ 2Þ=2; xk;k ¼ ðn  2Þð2k  n  2Þ=8; xn1;n1 ¼ nðn þ 2Þ=2 all are integers. So, minf ðk; tÞ ¼ ðn2Þð2kn2Þ nðnþ2Þ pffiffiffiffiffiffiffiffiffiffiffi þ 8ðn1Þ þ ðn2Þðnþ2Þ . 8k 4

kðn1Þ

For t P k  n2 , we have n þ 2t  2k P 2 > 0. Thus of ðk; tÞ=ot > 0. Therefore, f ðk; tÞ attains its minimum if and only if t ¼ k  n2 in this 2 2 case. And then nk ¼ ðn þ 2Þ=2; nn1 ¼ ðn  2Þ=2; xk;k ¼ ðn þ 2Þð2k  n þ 2Þ=8; xn1;n1 ¼ ðn  2Þðn  4Þ=2 all are integers. So, minf ðk; tÞ ¼ ðnþ2Þð2knþ2Þ nðnþ2Þ pffiffiffiffiffiffiffiffiffiffiffi þ ðn2Þðn4Þ pffiffiffiffiffiffiffiffiffiffiffi þ 8ðn1Þ þ ðn2Þðnþ2Þ ¼ ðn2Þð2kn2Þ þ ðn2Þðnþ2Þ , which is the same as the minimum value for the above case when 8k 8ðn1Þ 8k 4 kðn1Þ 4 kðn1Þ . t 6 k  nþ2 2 Therefore, in the case n  2ðmod 4Þ and k is odd, a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G ¼ Gn;2n;k . In the case n  2ðmod 4Þ and k is even, a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G ¼ Gn;n2;k or 2 Gn;nþ2;k . 2

Subcase 2.4. n  3ðmod 4Þ. Similar to the proof of Subcase 2.2, we can get that a graph G in Gðk; nÞ attains the minimum value of the Randic´ index if and only if G is Gn;dne;k for k both even and odd, or Gn;bnc;k for k even. 2

2

The proof is now complete. h

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