Proyecciones (Antofagasta, On line)

On the hereditary character of certain spectral properties and some applications

2020-05-16T00:50:36+00:00

In this paper we study the behavior of certain spectral properties of an operator T on a proper closed and T-invariant subspace W ⊆ X such that Tⁿ(X) ⊆ W, for some n ≥ 1, where T ∈ L(X) and X is an infinite-dimensional complex Banach space. We prove that for these subspaces a large number of spectral properties are transmitted from T to its restriction on W and vice-versa. As consequence of our results, we give conditions for which semiFredholm spectral properties, as well as Weyl type theorems, are equivalent for two given operators. Additionally, we give conditions under which an operator acting on a subspace can be extended on the entire space preserving the Weyl type theorems. In particular, we give some applications of these results for integral operators acting on certain functions spaces.

Infinitely many solutions for anisotropic elliptic equations with variable exponent

2020-04-02T12:08:09+00:00

In this article, we study the existence and multiplicity of solutions for a class of anisotropic elliptic equations

First we establisch that anisotropic space is separable and by using the Fountain theorem, and dual Fountain theorem we prove, under suitable conditions, that the problem (P) admits two sequences of weak solutions.

k-super cube root cube mean labeling of graphs

2020-06-14T11:19:24+00:00

Consider a graph G with |V (G)| = p and |E(G)| = q and let f : V (G) → {k, k + 1, k + 2, . . . p + q + k − 1}} be an injective function. The induced edge labeling f ∗ for a vertex labeling f is defined by f ∗ (e) =

for all e = uv ∈ E(G) is bijective. If f(V (G)) ∪ {f ∗ (e) : e ∈ E(G)} = {k, k + 1, k + 2, . . . , p + q + k − 1}, then f is called a k-super cube root cube mean labeling. If such labeling exists, then G is a k-super cube root cube mean graph. In this paper, I introduce k-super cube root cube mean labeling and prove the existence of this labeling to the graphs viz., triangular snake graph T_n, double triangular snake graph D(T_n), Quadrilateral snake graph Q_n, double quadrilateral snake graph D(Q_n), alternate triangular snake graph A(T_n), alternate double triangular snake graph AD(Tn), alternate quadrilateral snake graph A(Q_n), & alternate double quadrilateral snake graph AD(Q_n).

Existence of solutions of boundary value problems for nonlinear fractional differential equations with integral conditions

2020-06-18T18:46:32+00:00

In this work we investigate the existence and uniqueness of solutions of boundary value problems for fractional differential equations involving the Caputo fractional derivative with integral conditions and the nonlinear term depends on the fractional derivative of an unknown function. Our existence results are based on Banach contraction principle and Schauder fixed point theorem. Two examples are provided to illustrate our results.

Sequence spaces defined via Euler method and matrix transformations

2021-09-08T15:25:54+00:00

A blend of matrix summability and Euler summability transformation methods is used to define Lacunary sequence spaces defined over n-normed space. Then we present the properties of this space and finally, some inclusion relations are presented.

Vertex cover and Edge vertex domination in trees

2019-05-10T11:52:24+00:00

Let G = (V,E) be a simple graph. An edge e ∈ E(G) edge-vertex dominates a vertex v ∈ V (G) if e is incident with v or e is incident with a vertex adjacent to v. A subset D ⊆ E(G) is an edge-vertex dominating set of a graph G if every vertex of G is edge-vertex dominated by an edge of D. A vertex cover of G is a set C ⊆ V such that for each edge uv ∈ E at least one of u and v is in C. We characterize trees with edge-vertex domination number equals vertex covering number.

Some hyperstability results of a p-radical functional equation related to quartic mappings in non-archimedean Banach spaces

2019-08-11T18:38:13+00:00

The aim of this paper is to introduce and solve the following p-radical functional equation related to quartic mappings

where f is a mapping from R into a vector space X and p ≥ 3 is an odd natural number. Using an analogue version of Brzd¸ek’s fixed point theorem [13], we establish some hyperstability results for the considered equation in non-Archimedean Banach spaces. Also, we give some hyperstability results for the inhomogeneous p-radical functional equation related to quartic mapping.

Solution of linear and non-linear partial differential equation of fractional order

2020-08-08T13:38:38+00:00

We know that the solution of partial differential equations by analytical method is better than the solution by approximate or series solution method. In this paper, we discuss the solution of linear and non-linear fractional partial differential equations involving derivatives with respect to time or space variables by converting them into the partial differential equations of integer order. Also we develop an analytical formulation to solve such fractional partial differential equations. Moreover, we discuss the method to solve the fractional partial differential equations in space as well as time variables simultaneously with the help of some examples.

A new generalized refinements of Young’s inequality

2021-01-05T14:53:28+00:00

In this paper, we show a new generalized refinement of Young's inequality. As applications we give some new generalized refinements of Young type inequalities for the traces, determinants, and norms of positive definite matrices.

Extended study of biological networks using graph theory

2020-11-10T20:59:49+00:00

We represent biological networks by a function that maps the structure of a network to a number called topological index. Topological indices have been studied for biological networks in which a person transmits a virus to two other people, and a person having the virus is in contact with exactly one other person who got the virus from someone else. We extend research in this area by studying biological networks in which a person transmits a virus to n other people, where n ≥ 2, and a person having the virus is in contact with p other people (0 ≤ p ≤ n-2) who got the virus from some other person.

On ideal convergence of triple sequences in intuitionistic Fuzzy normed space defined by compact operator

2020-10-28T05:58:25+00:00

The main purpose of this article is to introduce and study some new spaces of I-convergence of triple sequences in intuitionistic fuzzy normed space defined by compact operator i.e ₃S^I _(μ,ν)(T ) and ₃S^I_0(μ,ν)(T ) and examine some fundamental properties, fuzzy topology and verify inclusion relations lying under these spaces.

Separation axioms of αm-contra-open maps and b-ω-open sets in generalized topological spaces

2020-01-06T16:59:00+00:00

In this paper, we introduce T_αm-Super-Spaces, α^m-contra-closed maps, α^m-contra-open maps, α^m-contra-continuous maps, α^m-contrairresolute maps, b-ω-open sets and Continuity via b-ω-open sets and studied some of their properties

On the total irregularity strength of convex polytope graphs

2020-09-03T22:32:08+00:00

A vertex (edge) irregular total k-labeling ? of a graph G is a labeling of the vertices and edges of G with labels from the set {1,2,...,k} in such a way that any two different vertices (edges) have distinct weights. Here, the weight of a vertex x in G is the sum of the label of x and the labels of all edges incident with the vertex x, whereas the weight of an edge is the sum of label of the edge and the vertices incident to that edge. The minimum k for which the graph G has a vertex (edge) irregular total k-labeling is called the total vertex (edge) irregularity strength of G. In this paper, we are dealing with infinite classes of convex polytopes generated by prism graph and antiprism graph. We have determined the exact value of their total vertex irregularity strength and total edge irregularity strength.

On a fuzzy metric space and fuzzy convergence

2021-02-20T08:39:00+00:00

In this paper we introduce a new type of fuzzy metric space and obtain several properties of it. Also some topological properties and boundedness are investigated. The notion of convergence of fuzzy sequences together with the notion of fuzzy cauchy sequences in a fuzzy metric space are discussed and some basic results related to these notions are investigated.

The distribution of zeros of solutions for a class of third order differential equation

2020-04-29T04:32:49+00:00

For third order linear differential equations of the form

r(t)x'(t)''+ p(t)x'(t) + q(t)x(t) = 0;
we will establish lower bounds for the distance between zeros of a solution and/or its derivatives. The main results will be proved by making use of Hardyís inequality, some generalizations of Opialís inequality and Boydís inequality.

On degree of approximation of Fourier series of functions in Besov space using Nörlund mean

2020-04-12T19:17:14+00:00

In the present article, we have established a result on degree of approximation of function in the Besov space by (N; r_n)- mean of Trigonometric Fourier series

Unit groups of group algebras of Abelian groups of order 32

2021-02-03T21:40:56+00:00

Let F be a finite field of characteristic p > 0 with q = pⁿ elements. In this paper, a complete characterization of the unit groups U(F G) of group algebras F G for the abelian groups of order 32, over finite field of characteristic p > 0 has been obtained.