The spectra of matching polynomials which are useful in the computations of resonance energy and grand canonical partition functions of molecular's. It also present other properties for certain classes of graphs a...The spectra of matching polynomials which are useful in the computations of resonance energy and grand canonical partition functions of molecular's. It also present other properties for certain classes of graphs and lattices. In [1] Balasubramanian calculates several matching polynomials and matching roots of several molecular graphs. He found that the matching polynomial of C_6, C_(10), C_(14), C_(18) and C_(22) are divided by x^2-2. In this note,we prove that x^2-2 divides MC_(4k+2)(x), k = 1, 2,..., n and obtain some other properties of matching polynomials of paths and cycles.展开更多
In the paper, we give a necessary and sufficient condition of matching equivalence of two graphs with the maximum matching root less than or equal to 2.
For two graphs <em>G</em> and<em> H</em>, if <em>G</em> and <em>H</em> have the same matching polynomial, then <em>G</em> and <em>H</em> are said...For two graphs <em>G</em> and<em> H</em>, if <em>G</em> and <em>H</em> have the same matching polynomial, then <em>G</em> and <em>H</em> are said to be matching equivalent. We denote by <em>δ </em>(<em>G</em>), the number of the matching equivalent graphs of <em>G</em>. In this paper, we give <em>δ </em>(<em>sK</em><sub>1</sub> ∪ <em>t</em><sub>1</sub><em>C</em><sub>9</sub> ∪ <em>t</em><sub>2</sub><em>C</em><sub>15</sub>), which is a generation of the results of in <a href="#ref1">[1]</a>.展开更多
Let be a graph with n vertices and m edges. The sum of absolute value of all coefficients of matching polynomial is called Hosoya index. In this paper, we determine 2<sup>nd</sup> to 4<sup>th</sup...Let be a graph with n vertices and m edges. The sum of absolute value of all coefficients of matching polynomial is called Hosoya index. In this paper, we determine 2<sup>nd</sup> to 4<sup>th</sup> minimum Hosoya index of a kind of tetracyclic graph, with m = n +3.展开更多
A supertree is a connected and acyclic hypergraph.We investigate the supertrees with the extremal spectral radii among several kinds of r-uniform supertrees.First,by using the matching polynomials of supertrees,a new ...A supertree is a connected and acyclic hypergraph.We investigate the supertrees with the extremal spectral radii among several kinds of r-uniform supertrees.First,by using the matching polynomials of supertrees,a new and useful grafting operation is proposed for comparing the spectral radii of supertrees,and its applications are shown to obtain the supertrees with the extremal spectral radi among some kinds of r-uniform supertrees.Second,the supertree with the third smallest spectral radius among the r-uniform supertrees is deduced.Third,among the r-uniform supertrees with a given maximum degree,the supertree with the smallest spectral radius is derived.At last,among the r-uniform starlike supert rees,the supertrees with the smallest and the largest spectral radii are characterized.展开更多
In this note a theorem concerning the coincidence between the characteristic polynomial of a cycle and the polynomial of Kekule structure count of a primitive coronoid is presented which implies a complete solution of...In this note a theorem concerning the coincidence between the characteristic polynomial of a cycle and the polynomial of Kekule structure count of a primitive coronoid is presented which implies a complete solution of Hosoya's mystery.展开更多
Van der Pauw's function is often used in the measurement of a semiconductor's resistivity. However, it is difficult to obtain its value from voltage measurements because it has an implicit form. If it can be express...Van der Pauw's function is often used in the measurement of a semiconductor's resistivity. However, it is difficult to obtain its value from voltage measurements because it has an implicit form. If it can be expressed as a polynomial, a semiconductor's resistivity can be obtained from such measurements. Normally, five orders of the abscissa can provide sufficient precision during the expression of any non-linear function. Therefore, the key is to determine the coefficients of the polynomial. By taking five coefficients as weights to construct a neuronetwork, neurocomputing has been used to solve this problem. Finally, the polynomial expression for van der Pauw's function is obtained.展开更多
基金Supported by the Natural Science Foundation of the People’s Republic of China under Grant(11571252)
文摘The spectra of matching polynomials which are useful in the computations of resonance energy and grand canonical partition functions of molecular's. It also present other properties for certain classes of graphs and lattices. In [1] Balasubramanian calculates several matching polynomials and matching roots of several molecular graphs. He found that the matching polynomial of C_6, C_(10), C_(14), C_(18) and C_(22) are divided by x^2-2. In this note,we prove that x^2-2 divides MC_(4k+2)(x), k = 1, 2,..., n and obtain some other properties of matching polynomials of paths and cycles.
文摘In the paper, we give a necessary and sufficient condition of matching equivalence of two graphs with the maximum matching root less than or equal to 2.
文摘For two graphs <em>G</em> and<em> H</em>, if <em>G</em> and <em>H</em> have the same matching polynomial, then <em>G</em> and <em>H</em> are said to be matching equivalent. We denote by <em>δ </em>(<em>G</em>), the number of the matching equivalent graphs of <em>G</em>. In this paper, we give <em>δ </em>(<em>sK</em><sub>1</sub> ∪ <em>t</em><sub>1</sub><em>C</em><sub>9</sub> ∪ <em>t</em><sub>2</sub><em>C</em><sub>15</sub>), which is a generation of the results of in <a href="#ref1">[1]</a>.
文摘Let be a graph with n vertices and m edges. The sum of absolute value of all coefficients of matching polynomial is called Hosoya index. In this paper, we determine 2<sup>nd</sup> to 4<sup>th</sup> minimum Hosoya index of a kind of tetracyclic graph, with m = n +3.
基金supported by the National Natural Science Foundation of China(Grant Nos.11871040,11001166).
文摘A supertree is a connected and acyclic hypergraph.We investigate the supertrees with the extremal spectral radii among several kinds of r-uniform supertrees.First,by using the matching polynomials of supertrees,a new and useful grafting operation is proposed for comparing the spectral radii of supertrees,and its applications are shown to obtain the supertrees with the extremal spectral radi among some kinds of r-uniform supertrees.Second,the supertree with the third smallest spectral radius among the r-uniform supertrees is deduced.Third,among the r-uniform supertrees with a given maximum degree,the supertree with the smallest spectral radius is derived.At last,among the r-uniform starlike supert rees,the supertrees with the smallest and the largest spectral radii are characterized.
文摘In this note a theorem concerning the coincidence between the characteristic polynomial of a cycle and the polynomial of Kekule structure count of a primitive coronoid is presented which implies a complete solution of Hosoya's mystery.
文摘Van der Pauw's function is often used in the measurement of a semiconductor's resistivity. However, it is difficult to obtain its value from voltage measurements because it has an implicit form. If it can be expressed as a polynomial, a semiconductor's resistivity can be obtained from such measurements. Normally, five orders of the abscissa can provide sufficient precision during the expression of any non-linear function. Therefore, the key is to determine the coefficients of the polynomial. By taking five coefficients as weights to construct a neuronetwork, neurocomputing has been used to solve this problem. Finally, the polynomial expression for van der Pauw's function is obtained.
