What is he best known for?
The fields of study he is best known for:
- Mathematical analysis
- Metric space
- Topology
The scientist’s investigation covers issues in Metric space, Discrete mathematics, Pure mathematics, Convex metric space and Fixed point.
His primary area of study in Metric space is in the field of Coincidence point.
Calogero Vetro studies Banach space which is a part of Discrete mathematics.
In his research on the topic of Pure mathematics, Boundary value problem and Proximity problems is strongly related with Uniqueness.
His research in Convex metric space intersects with topics in Product metric, T-norm and Injective metric space.
He has included themes like Differential geometry and Ordinary differential equation in his Fixed point study.
His most cited work include:
- Fixed point theorems for α–ψ-contractive type mappings (487 citations)
- Best proximity points for cyclic Meir–Keeler contractions (202 citations)
- Common fixed points of generalized contractions on partial metric spaces and an application (135 citations)
What are the main themes of his work throughout his whole career to date?
Calogero Vetro mostly deals with Discrete mathematics, Pure mathematics, Metric space, Fixed-point theorem and Fixed point.
As part of his studies on Discrete mathematics, Calogero Vetro frequently links adjacent subjects like T-norm.
As part of the same scientific family, he usually focuses on Pure mathematics, concentrating on Uniqueness and intersecting with Point.
His work in the fields of Metric space, such as Coincidence point, overlaps with other areas such as Fréchet space.
His Fixed-point theorem research integrates issues from Partially ordered set and Algebra.
The concepts of his Fixed point study are interwoven with issues in Type, Differential geometry, Fuzzy logic, Generalization and Integral equation.
He most often published in these fields:
- Discrete mathematics (34.40%)
- Pure mathematics (32.11%)
- Metric space (28.44%)
What were the highlights of his more recent work (between 2019-2021)?
- Parametric statistics (9.17%)
- Mathematical analysis (22.48%)
- Laplace operator (10.55%)
In recent papers he was focusing on the following fields of study:
His primary areas of study are Parametric statistics, Mathematical analysis, Laplace operator, Pure mathematics and Term.
The Boundary value problem research Calogero Vetro does as part of his general Mathematical analysis study is frequently linked to other disciplines of science, such as Critical exponent and Homoclinic orbit, therefore creating a link between diverse domains of science.
His research in Laplace operator focuses on subjects like Dirichlet problem, which are connected to Truncation.
His Pure mathematics research is multidisciplinary, incorporating elements of Multiplicity, Operator, Robin boundary condition, Weak solution and Monotonic function.
Calogero Vetro combines subjects such as Function and Laplace transform with his study of Applied mathematics.
His Convection research is multidisciplinary, incorporating perspectives in Flow and Type.
Between 2019 and 2021, his most popular works were:
- Multiple solutions with sign information for a (p,2)-equation with combined nonlinearities (9 citations)
- Solutions for parametric double phase Robin problems (8 citations)
- On Problems Driven by the $$(p(\cdot ),q(\cdot ))$$(p(·),q(·)) -Laplace Operator (8 citations)
In his most recent research, the most cited papers focused on:
- Mathematical analysis
- Topology
- Algebra
His primary scientific interests are in Parametric statistics, Laplace operator, Applied mathematics, Mathematical analysis and Term.
His studies deal with areas such as Function, Eigenvalues and eigenvectors and Pure mathematics as well as Laplace operator.
His Pure mathematics study combines topics from a wide range of disciplines, such as Weak solution and Operator.
In general Applied mathematics, his work in Asymptotic analysis is often linked to Double phase and Nonparametric statistics linking many areas of study.
His Critical point and Neumann boundary condition investigations are all subjects of Mathematical analysis research.
His biological study spans a wide range of topics, including Truncation, Sublinear function and Regular polygon.
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