In this article, we demonstrate the closed formulas for atom-bond connectivity index, geometric arithmetic first K Banhatti second hyper modified index and harmonic via M-polynomial. We recover these topological indices H-Naphtalenic nanotube.

By utilizing the degree of vertex graphs, M-polynomials book graph obtained and examined in this paper. The various dependent indices can be calculated readily by using proposed M-Polynomials graph. We also give graphical representation topological indices.

The numerical encoding of chemical structure with topological indices is currently growing in graph theory. An important aspect these related the prediction characteristic given by molecule. This paper utilizing a specific developed method, named M-polynomial, to calculate silicate network. We also plot indices.

Abstract Chemical graph theory is a subfield of that studies the topological indices for chemical graphs have good correlation with properties molecule. In this study, we computed M-polynomial zigzag edge coronoid fused by starphene. We also investigate various related to using their M-polynomial.

In this article, we provide new formulas to compute the reduced reciprocal randi ć index, Arithmetic geometric 1 SK 2 edge version of first zagreb sum connectivity general and forgotten index using M-polynomial finding these topological indices for a boron triangular nanotube. We also elaborate results with graphical representations.

he current discovery of different types nanostructures has inspired the researcher to study applications these structures in fields. In this study, we have analyzed boron triangular nanotube through topological indices. M-polynomial a capability recover indices which are dependent on degree vertex. We presented results graphical form.

Graph theory provides an effective tool such as graph polynomial and topological indices (TIs) to the chemist analyze different chemical structures. TIs are numerical entity deducted from molecular structure. TI helps study relationship between physicochemical properties structure of compound. In this article, we investigate boron α ‐nanotube by computing its M‐polynomial then deducing TI. Results also shown plotting graphs.

The study of molecular structure having size less than 100 nm is called nanotechnology. Nano-materials have vast applications in different fields. Boron α-nanotube very famous Nano-science. In this article, we computed some important topological indices using their M-polynomial along with plotting the results.

Algebraic polynomials play an important role in theoretical chemistry because these can reflect the properties of chemical compound. M-polynomial is also algebraic polynomial that used to find expressions several degree dependent topological indices. These indices have ability explore information store molecule. In this work, we computed and then obtained degree-based for benzene ring embedded P-type-surface 2D network. We explored results graphically.

Coronavirus is able to cause illnesses ranging from the common flu severe respiratory disease. Today there great competition among researchers and physcisians cure COVID-19. Remdesivir being studied for COVID-19 treatment In this article, we presented topological analysis of remdesivir with help M-polynomial. Proofs closed form some indices via M-polynomial are also included in article. [GRAPHICS] .

Nowadays, all scientists are in the race to find a cure for COVID-19. This is viral disease that due severe acute respiratory syndrome coronavirus 2 (SARS-CoV-2). Different antiviral drugs under investigation. Dexamethasone being used treatment of In this article, chemical structure dexamethasone explored using computational techniques such as topological indices. Proofs few closed formulas describe degree-dependent indices calculated from M-polynomial graphs also given article.

Chemical graph theory provides a link between molecular properties and graph. The M‐polynomial is emerging as an efficient tool to recover the degree‐based topological indices in chemical theory. In this work, we give closed formulas of redefined first second Zagreb indices, modified index, nano‐Zagreb hyper‐Zagreb Randić reciprocal Gourava product connectivity index via M‐polynomial. We also present silicate network then are applied on network.

M-polynomial is introduced as a graph polynomial to re-cover closed formulas of degree based topological indices by using some suitable operators. These have predicting ability about the properties organic molecules. Silicate network (phyllosilicates) belonging an important group minerals that includes talc, micas, serpentine, clay, and chlorite minerals. much importance in chemical industry. The aim this paper explore silicate through degree-based indices. Results are also elaborated...