Abstract

Topological indices correlate certain physicochemical properties like boiling point, stability, and strain energy of chemical compounds. In this report, we compute M-polynomials for PAMAM dendrimers and polyomino chains. Moreover, by applying calculus, we compute nine important topological indices of under-study dendrimers and chains.

1. Introduction

The polyomino chains constitute a finite 2-connected floor plan, where each inner face (or a unit) is surrounded by a square of length one. We can say that it is a union of cells connected by edges in a planar square lattice. For the origin of dominoes, we quote [1]. The polyomino chains have a long history dating back to the beginning of the 20th century, but they were originally promoted by Golomb [2, 3]. Dendrimers [4] are repetitively branched molecules. The name comes from the Greek word, which translates to “trees.” Synonymous terms for dendrimers include arborols and cascade molecules. The first dendrimer was made by Fritz Vögtle in [5]. For detailed study about dendrimer structures we refer the reader to [6–9].

Many studies have shown that there is a strong intrinsic link between the chemical properties of chemical compounds and drugs (such as melting point and boiling point) and their molecular structure [10, 11]. The topological index defined on the structure of these chemical molecules can help researchers better understand the physical characteristics, chemical reactivity, and biological activity [12]. Therefore, the study of topological indices of chemical substances and chemical structures of drugs can make up for the lack of chemical experiments and provide theoretical basis for the preparation of drugs and chemical substances. In the previous two decades, a number of topological indices have been characterized and utilized for correlation analysis in pharmacology, environmental chemistry, toxicology, and theoretical chemistry [13]. Hosoya polynomial (Wiener polynomial) [14] plays a pivotal role in finding topological indices that depend on distances. From this polynomial, a long list of distance-based topological indices can be easily evaluated. A similar breakthrough was obtained recently by Klavžar et al. [15], in the context of degree-based indices. In the year 2015, authors in [15] introduced the M-polynomial, which plays similar role “to what Hosoya polynomial does” to determine many topological indices depending on the degree of end vertices [16–20].

In the present paper, we compute M-polynomials for different dendrimer structures and polyomino chains. By applying fundamental calculus, we recover nine degree-based topological indices for these dendrimers and chains.

2. Basic Definitions and Literature Review

In this paper, we fixed G as a connected graph, V (G) is the set of vertices, E (G) is the set of edges, and is the degree of any vertex v. Most of the definitions presented in this section can be found in [17].

Definition 1 (see [15]). The M-polynomial of G is defined aswhere , , and is the edge that is  .

The very first topological index was the Wiener index, defined by Wiener in 1945, when he was studying boiling point of alkane [21]. For comprehensive details about the applications of Wiener index, see [22, 23]. After that, in 1975, Milan Randić [24] introduced the first degree-based topological index, which is now known as Randić index and is defined asThe generalized Randić index is defined asplease see [25–29].

The inverse generalized Randić index is defined asIt can be seen easily that the Randić index is particular case of the generalized Randić index and the inverse generalized Randić index. Other oldest degree-based topological indices are Zagreb indices. The first Zagreb index is defined asand the second Zagreb index is defined asThe second modified Zagreb index is defined asFor detailed study about Zagreb indices, we refer the reader to [30–32]. There are many other degree-based topological indices, for example, symmetric division index: harmonic index: inverse sum index:augmented Zagreb index:We refer to [33–45] for detailed survey about the above defined indices and applications. Tables exhibited in [15–19] relate some notable degree-based topological indices with M-polynomial with the following notations [17]:

3. Computational Results

In this section we give our computational results.

3.1. M-Polynomials and Degree-Based Indices for PAMAM Dendrimers

Polyamidoamine (PAMAM) dendrimers are hyperbranched polymers with unparalleled molecular uniformity, narrow molecular weight distribution, defined size and shape characteristics, and a multifunctional terminal surface. These nanoscale polymers consist of an ethylenediamine core, a repetitive branching amidoamine internal structure, and a primary amine terminal surface. Dendrimers are “grown” off a central core in an iterative manufacturing process, with each subsequent step representing a new “generation” of dendrimer. Increasing generations (molecular weight) produce larger molecular diameters, twice the number of reactive surface sites and approximately double the molecular weight of the preceding generation. PAMAM dendrimers also assume a spheroidal, globular shape at generation 4 and above (see molecular simulation below). Their functionality is readily tailored, and their uniformity, size, and highly reactive “molecular Velcro” surfaces are the functional keys to their use. Here we consider , which denote PAMAM dendrimers with trifunctional core unit generated by dendrimer generations with n growth stages, and , the PAMAM dendrimers with different core generated by dendrimer generators with n growth stages. is kinds of PAMAM dendrimers with n growth stages

Theorem 2. For the PAMAM dendrimers , we have

Proof. Let denote PAMAM dendrimers with trifunctional core unit generated by dendrimer generations with n growth stages.
The edge set of has following four partitions: Nowand

Theorem 3. For the PAMAM dendrimers , we have1.2.3.4.5.6.7.8.9.

Proof. Let denote PAMAM dendrimers with trifunctional core unit generated by dendrimer generations with n growth stages. LetThen

(1) First Zagreb Index

(2) Second Zagreb Index

(3) Modified Second Zagreb Index

(4) Generalized Randić Index

(5) Inverse Randić Index

(6) Symmetric Division Index

(7) Harmonic Index

(8) Inverse Sum Index

(9) Augmented Zagreb Index

Theorem 4. For the PAMAM dendrimers , we have

Proof. Let be the PAMAM dendrimers with different core generated by dendrimer generators with n growth stages. Then the edge set of has following four partitions: Now and

Theorem 5. For the PAMAM dendrimers , we have1..2..3..4..5..6..7..8..9..