On Ev-Degree and Ve-Degree Topological Properties of Tickysim Spiking Neural Network

Topological indices are indispensable tools for analyzing networks to understand the underlying topology of these networks. Spiking neural network architecture (SpiNNaker or TSNN) is a million-core calculating engine which aims at simulating the behavior of aggregates of up to a billion neurons in real time. Tickysim is a timing-based simulator of the interchip interconnection network of the SpiNNaker architecture. Tickysim spiking neural network is considered to be highly symmetrical network classes. Classical degree-based topological properties of Tickysim spiking neural network have been recently determined. Ev-degree and ve-degree concepts are two novel degrees recently defined in graph theory. Ev-degree and ve-degree topological indices have been defined as parallel to their corresponding counterparts. In this study, we investigate the ev-degree and ve-degree topological properties of Tickysim spiking neural network. These calculations give the information about the underlying topology of Tickysim spiking neural network.


Introduction
Biological neurons use signals that are known as action potentials, membrane potentials, or spikes in short and sudden increments to transmit information to neighboring neurons. Spiking neural network (SNN), a special class of artificial neural networks, communicates with the spikes of the neuron models. Spiking neural network systems are a class of parallel neural-like computing and distributed models which are inspired from the way neurons communicate by means of spikes. Significant amounts of data can be processed by networks of spiking neurons, using relatively few spikes [1]. Spiking models that provide powerful tools for the analysis of basic operations, including neural information processing, plasticity, and learning in the brain, are very similar to biological neurons. In practical engineering, solutions for a wide variety of specific problems, such as fast signal processing, event detection, classification, speech recognition, spatial navigation, or motor control, are provided by spiking networks [2]. SNN has also been shown to be more computationally stronger than sensors and sigmoidal gates [3]. SNNs in neuromorphic hardware show positive characteristics such as low power consumption, rapid extraction, and eventbased information processing. is makes them interesting candidates for the efficient application of deep neural networks, the preferred method for many machine learning tasks [4].
Spiking neural network architecture (SpiNNaker or TSNN) is a million-core calculating engine which aims at simulating the behavior of aggregates of up to a billion neurons in real time. Tickysim is a timing-based simulator of the interchip interconnection network of the SpiNNaker (TSNN) architecture. Tickysim spiking neural network is considered to be highly symmetrical network classes. For an overview of the SpiNNaker system architecture, we refer the interested reader to reference [5]. Quaternary synapses network for memristor-based spiking convolutional neural networks has been investigated in [6]. Spiking neural p systems with learning functions have been proposed in [7]. Spiking neural networks for handwritten digit recognitionsupervised learning and network optimization has been investigated in [8]. Generalized matrix inverse on spiking neural substrate has been calculated in [9].
Neuromorphic computing is very important in view of the data processing, machine learning, and artificial intelligence.
is computing gives information about the underlying topology of neural networks. Among these computations, the computation of classical degree-based topological properties of the Tickysim spiking neural network has newly been investigated in [10]. In this study, we investigate the ev-degree and ve-degree topological properties of the Tickysim spiking neural network as a continuation of the study [10]. e graph of a Tickysim spiking neural network sheet is shown in Figure 1. e number of vertices in the Tickysim spiking neural network is represented as m × n.
Ev-degree and ve-degree concepts are two novel degrees recently defined in graph theory [11]. Ev-degree and vedegree topological indices have been defined as parallel to their corresponding counterparts [12][13][14][15].

Preliminaries
In this section, we give some basic and preliminary concepts which we shall use later. A graph G � (V, E) consists of two nonempty sets V and 2-element subsets of V, namely, E. e elements of V are called vertices, and the elements of E are called edges. For a vertex v, deg(v) shows the number of edges that is incident to v. e set of all vertices which is adjacent to v is called the open neighborhood of v and denoted by N(v). If we add the vertex v to N(v), then we get the closed neighborhood of v, N [v]. And now, we give the definitions of ev-degree and ve-degree concepts which were given in [11].
Definition 1 (ve-degree). Let G be a connected simple graph and v ∈ V(G). e ve-degree of the vertex v, deg ve (v), equals the number of different edges that is incident to any vertex from the closed neighborhood of v.
We also can restate Definition 1 as follows: Let G be a connected simple graph and v ∈ V(G). e ve-degree of the vertex v is the number of different edges between the other vertices with a maximum distance of two from the vertex v.
Definition 2 (ev-degree). Let G be a connected graph and e � uv ∈ E(G). e ev-degree of the edge e, deg ev (e), equals the number of vertices of the union of the closed neighborhoods of u and v. e authors in [11] also can give the Definition 2 as follows: Let G be a connected graph and e � uv ∈ E(G). e ev-degree of the edge e, deg uv (e) � degu + degv−n e , where n e means the number of triangles in which the edge e lies in.
Definition 3 (ev-degree Zagreb index). Let G be a connected graph and e � uv ∈ E(G). e ev-degree Zagreb index of the graph G defined as (1)

Definition 4 (the first ve-degree Zagreb alpha index).
Let G be a connected graph and v ∈ V(G). e first ve-degree Zagreb alpha index of the graph G defined as Definition 5 (the first ve-degree Zagreb beta index). Let G be a connected graph and uv ∈ E(G). e first ve-degree Zagreb beta index of the graph G defined as Definition 6 (the second ve-degree Zagreb index). Let G be a connected graph and uv ∈ E(G). e second ve-degree Zagreb index of the graph G defined as Definition 7 (ve-degree Randic index). Let G be a connected graph and uv ∈ E(G). e ve-degree Randic index of the graph G defined as Definition 8 (ev-degree Randic index). Let G be a connected graph and e � uv ∈ E(G). e ev-degree Randic index of the graph G defined as 2 Computational Intelligence and Neuroscience Definition 9 (ve-degree atom-bond connectivity index). e ve-degree atom-bond connectivity (ve-ABC) index for a connected graph G defined as Definition 10 (ve-degree geometric-arithmetic index). e ve-degree geometric-arithmetic (ve-GA index) for a connected graph G defined as Definition 11 (ve-degree harmonic index). e ve-degree harmonic (ve-H) index for a connected graph G defined as Definition 12 (ve-degree sum-connectivity index). e vedegree sum-connectivity (ve-χ) index for a connected graph G defined as

Results
We know that the Tickysim spiking neural network has m × n vertices and 3mn − 2m − 2n + 1 edges. With the help of Figure 1 and Table 1, we give the ev-degree partition of the edges of the Tickysim spiking neural network. And from Tables 2 and 3, we give the ve-degree partition of the vertices of the Tickysim spiking neural network. e ev-degree and ve-degree topological indices of the Tickysim spiking neural network are given in Table 4.

Conclusions
Neuromorphic computing is very important in view of the data processing, machine learning, and artificial intelligence.
is computing gives information about the underlying topology of neural networks. Among these computations, the computation of the ev-degree and vedegree topological properties of Tickysim spiking neural network provided the information about the underlying topology of the Tickysim spiking neural network. e other well-known topological indices values of the Tickysim Table 1: e ev-degree of the edges of the Tickysim spiking neural network.

Number of edges
Degrees of its end vertices Ev-degrees 4 (2, 4) 5 4 (3, 4)  And we begin to compute ev-degree and ve-degree topological indices.   spiking neural network are interesting for further studies. Also, the mathematical properties of ev-degree and vedegree topological indices have not been studied so far. In this regard, the mathematical properties are worth to investigate for future studies.