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6,756 results on '"Ramírez, José A."'

1. Differential equations in Ward's calculus

Author

Luzón, Ana, Morón, Manuel A., and Ramírez, José L.

Subjects
Mathematics - Combinatorics
Abstract

In this paper we solve some differential equations in the $D_h$ derivative in Ward's sense. We use a special metric in the formal power series ring $\K[[x]]$. The solutions of that equations are giving in terms of fixed points for certain contractive maps in our metric framework. Our main tools are Banach's Fixed Point Theorem, Fundamental Calculus Theorem and Barrow's rule for Ward's calculus. Later, we return to the usual differential calculus via Sheffer's expansion of some kind of operators. Finally, we give some examples related, in some sense, to combinatorics.

Published
2024

2. A Finite Volume scheme for the solution of discontinuous magnetic field distributions on non-orthogonal meshes

Author

Riedinger, Augusto, Saravia, Martín, and Ramírez, José

Subjects
Mathematics - Numerical Analysis
Abstract

We present a Finite Volume formulation for determining discontinuous distributions of magnetic fields within non-orthogonal and non-uniform meshes. The numerical approach is based on the discretization of the vector potential variant of the equations governing static magnetic field distribution in magnetized, permeable and current carrying media. After outlining the derivation of the magnetostatic balance equations and its associated boundary conditions, we propose a cell-centered Finite Volume framework for spatial discretization and a Block Gauss-Seidel multi-region scheme for solution. We discuss the structure of the solver, emphasizing its effectiveness and addressing stabilization and correction techniques to enhance computational robustness. We validate the accuracy and efficacy of the approach through numerical experiments and comparisons with the Finite Element method., Comment: 19 pages, 15 figures

Published
2024

3. Fibonacci--Theodorus Spiral and its properties

Author

Bacon, Michael R., Cook, Charles K., Flórez, Rigoberto, Higuita, Robinson A., Luca, Florian, and Ramírez, José L.

Subjects
Mathematics - General Mathematics
Abstract

Inspired by the ancient spiral constructed by the greek philosopher Theodorus which is based on concatenated right triangles, we have created a spiral. In this spiral, called \emph{Fibonacci--Theodorus}, the sides of the triangles have lengths corresponding to Fibonacci numbers. Towards the end of the paper, we present a generalized method applicable to second-order recurrence relations. Our exploration of the Fibonacci--Theodorus spiral aims to address a variety of questions, showcasing its unique properties and behaviors. For example, we study topics such as area, perimeter, and angles. Notably, we establish a relationship between the ratio of two consecutive areas and the golden ratio, a pattern that extends to angles sharing a common vertex. Furthermore, we present some asymptotic results. For instance, we demonstrate that the sum of the first $n$ areas comprising the spiral approaches a multiple of the sum of the initial $n$ Fibonacci numbers. Moreover, we provide a sequence of open problems related to all spiral worked in this paper. Finally, in his work Hahn, Hahn observed a potential connection between the golden ratio and the ratio of areas between spines of lengths $\sqrt{F_{n+1}}$ and $\sqrt{F_{n+2}-1}$ and the areas between spines of lengths $\sqrt{F_{n}}$ and $\sqrt{F_{n+1}-1}$ in the Theodorus spiral. However, no formal proof has been provided in his work. In this paper, we provide a proof for Hahn's conjecture., Comment: Accepted for publication by Proceedings of Fibonacci Quarterly

Published
2024

4. Counting Colored Tilings on Grids and Graphs

Author

Ramírez, José L. and Villamizar, Diego

Subjects
Computer Science - Discrete Mathematics, Mathematics - Combinatorics
Abstract

In this paper, we explore some generalizations of a counting problem related to tilings in grids of size 2xn, which was originally posed as a question on Mathematics Stack Exchange (Question 3972905). In particular, we consider this problem for the product of two graphs G and P(n), where P(n) is the path graph of n vertices. We give explicit bivariate generating functions for some specific cases., Comment: In Proceedings GASCom 2024, arXiv:2406.14588

Published
2024
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5. Flattened Catalan Words

Author

Baril, Jean-Luc, Harris, Pamela E., and Ramírez, José L.

Subjects
Mathematics - Combinatorics, 05A15, 05A19
Abstract

In this work, we define flattened Catalan words as Catalan words whose runs of weak ascents have leading terms that appear in weakly increasing order. We provide generating functions, formulas, and asymptotic expressions for the number of flattened Catalan words based on the number of runs of ascents (descents), runs of weak ascents (descents), $\ell$-valleys, valleys, symmetric valleys, $\ell$-peaks, peaks, and symmetric peaks., Comment: arXiv admin note: substantial text overlap with arXiv:2404.05672

Published
2024

7. Enumerating runs, valleys, and peaks in Catalan words

Author

Baril, Jean-Luc, Harris, Pamela E., Harry, Kimberly J., McClinton, Matt, and Ramírez, José L.

Subjects
Mathematics - Combinatorics, 05A15, 05A19
Abstract

We provide generating functions, formulas, and asymptotic expressions for the number of Catalan words based on the number of runs of ascents (descents), runs of weak ascents (descents), $\ell$-valleys, valleys, symmetric valleys, $\ell$-peaks, peaks, and symmetric peaks. We also establish some bijections with restricted Dyck paths and ordered trees that transports some statistics.

Published
2024

8. Grand zigzag knight's paths

Author

Baril, Jean-Luc, Hassler, Nathanaël, Kirgizov, Sergey, and Ramírez, José L.

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We study the enumeration of different classes of grand knight's paths in the plane. In particular, we focus on the subsets of zigzag knight's paths subject to constraints. These constraints include ending at ordinate 0, bounded by a horizontal line, confined within a tube, among other considerations. We present our results using generating functions or direct closed-form expressions. We derive asymptotic results, finding approximations for quantities such as the probability that a zigzag knight's path stays in some area of the plane, or for the average of the final height of such a path. Additionally, we exhibit some bijections between grand zigzag knight's paths and some pairs of compositions., Comment: 21 pages, 9 figures

Published
2024

12. The Combinatorics of Motzkin Polyominoes

Author

Baril, Jean-Luc, Kirgizov, Sergey, Ramírez, José L., and Villamizar, Diego

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

A word $w=w_1\cdots w_n$ over the set of positive integers is a Motzkin word whenever $w_1=\texttt{1}$, $1\leq w_k\leq w_{k-1}+1$, and $w_{k-1}\neq w_{k}$ for $k=2, \dots, n$. It can be associated to a $n$-column Motzkin polyomino whose $i$-th column contains $w_i$ cells, and all columns are bottom-justified. We reveal bijective connections between Motzkin paths, restricted Catalan words, primitive \L{}ukasiewicz paths, and Motzkin polyominoes. Using the aforementioned bijections together with classical one-to-one correspondence with Dyck paths avoiding $UDU$s, we provide generating functions with respect to the length, area, semiperimeter, value of the last symbol, and number of interior points of Motzkin polyominoes. We give asymptotics and closed-form expressions for the total area, total semiperimeter, sum of the last symbol values, and total number of interior points over all Motzkin polyominoes of a given length. We also present and prove an engaging trinomial relation concerning the number of cells lying at different levels and first terms of the expanded $(1+x+x^2)^n$., Comment: 21 pages, 11 figures

Published
2024

13. Model to Early Detection of Autism Spectrum Disorder Through Opinion Mining Approach

Author

Grande-Ramírez, José Roberto, Roldán-Reyes, Eduardo, Delgado-Maciel, Jesús, Cortes-Robles, Guillermo, Meza-Palacios, Ramiro, Goos, Gerhard, Series Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Quintián, Héctor, editor, Corchado, Emilio, editor, Troncoso Lora, Alicia, editor, Pérez García, Hilde, editor, Jove Pérez, Esteban, editor, Calvo Rolle, José Luis, editor, Martínez de Pisón, Francisco Javier, editor, García Bringas, Pablo, editor, Martínez Álvarez, Francisco, editor, Herrero, Álvaro, editor, and Fosci, Paolo, editor

Published
2025
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16. Pattern Avoidance in Weak Ascent Sequences

Author

Bényi, Beáta, Mansour, Toufik, and Ramírez, José L.

Subjects
Mathematics - Combinatorics, 05A05, 05A15, 05A19
Abstract

In this paper, we study pattern avoidance in weak ascent sequences, giving some results for patterns of length 3. This is an analogous study to one given by Duncan and Steingr\'imsson (2011) for ascent sequences. More precisely, we provide systematically the generating functions for the number of weak ascent sequences avoiding the patterns $001, 011, 012, 021$, and $102$. Additionally, we establish bijective connections between pattern-avoiding weak ascent sequences and other combinatorial objects, such as compositions, upper triangular 01-matrices, and plane trees.

Published
2023
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17. Some Connections Between Restricted Dyck Paths, Polyominoes, and Non-Crossing Partitions

Author

Flórez, Rigoberto, Ramírez, José L., Velandia, Fabio A., and Villamizar, Diego

Subjects
Mathematics - Combinatorics
Abstract

A \emph{Dyck path} is a lattice path in the first quadrant of the $xy$-plane that starts at the origin, ends on the $x$-axis, and consists of the same number of North-East steps $U$ and South-East steps $D$. A \emph{valley} is a subpath of the form $DU$. A Dyck path is called \emph{restricted $d$-Dyck} if the difference between any two consecutive valleys is at least $d$ (right-hand side minus left-hand side) or if it has at most one valley. In this paper we give some connections between restricted $d$-Dyck paths and both, the non-crossing partitions of $[n]$ and some subfamilies of polyominoes. We also give generating functions to count several aspects of these combinatorial objects., Comment: This paper has been accepter for publication in Proceedings of the 52nd Southeastern International Conference on Combinatorics, Graph Theory, and Computing

Published
2023

18. Frontmatter

Author

Ramírez, José A.

Published
2009

19. Cover

Author

Ramírez, José A.

Published
2009

20. Index

Author

Ramírez, José A.

Published
2009

25. Notes

Author

Ramírez, José A.

Published
2009

34. Current Status of Cancer Rehabilitation in Latin America

Author

Villalobos, Vanessa Uclés, Silva, Ana Carolina Méndez, Belmonte, Gema Herrera, del Rosario Bermúdez Ruiz, Judith, Mojica, Yudi Milena Rodríguez, de Brito, Christina May Moran, Figueiredo, Victor, Merida, Patricia Rosales, Santander, Blanca Irene Acuña, Flores, Jonathan Ortiz, Luciani, Mónica, Sierra, Leonardo, Tagle, Maritza Martínez, Mónchez, Georgina Granados, Martínez, Licellot, Jiménez, Merly Mónica Rivero, Flores, Every Nataly Casas, Sato, Koyi, De León, Erika Lissette Pérez, Gómez, Juan Carlos Leal, Sincal, Edin Geovanny Xicay, de María Pérez Ponce, Flor, de Quan, Martha Lolany Pérez Ramírez, Duarte, Claudia Morales, Ramírez, José Emilio Albizures, and Chavez, Sigrid Yerena Lémus

Published
2024
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35. Descent distribution on Catalan words avoiding ordered pairs of Relations

Author

Baril, Jean-Luc and Ramírez, José Luis

Subjects
Mathematics - Combinatorics
Abstract

This work is a continuation of some recent articles presenting enumerative results for Catalan words avoiding one or a pair of consecutive or classical patterns of length $3$. More precisely, we provide systematically the bivariate generating function for the number of Catalan words avoiding a given pair of relations with respect to the length and the number of descents. We also present several constructive bijections preserving the number of descents. As a byproduct, we deduce the generating function for the total number of descents on all Catalan words of a given length and avoiding a pair of ordered relations.

Published
2023

36. Rotation curve of the Milky Way and the mass of Sagittarius A*

Author

Ramírez, José Enrique Hernández

Subjects
Astrophysics - Astrophysics of Galaxies
Abstract

In the present work we derive an analytical expression for the mass density of an object with spherical symmetry, whose corresponding potential allows obtaining a circular velocity around it that is in agreement with the observed rotation curve of galaxies. The rotation curve of our galaxy is analyzed, determining the properties of the central object, its radius and mass whose value obtained is very close to that reported in the literature., Comment: 6 pages, 4 figures

Published
2023

37. Design and Validation of an Assessment Rubric of Relevant Competencies for Employability

Author

Sánchez-Ramírez, José Manuel, Íñigo-Mendoza, Victoria, Marcano, Beatriz, and Romero-García, Carmen

Abstract

This article highlights the importance of promoting relevant competencies for employability in vocational training students, while considering the demands of the globalized world. The objective was to design and validate an assessment rubric of relevant competencies for employability. Seven competencies were selected: problem-solving, teamwork, adaptive capacity, communication, creativity, leadership and decision-making. A rubric was designed in which three command levels were established: low, medium and high, along with their respective indicators. A content validation process was also used by means of expert judgement. Ten (10) expert judges were selected to carry out a quantitative and qualitative validation in three stages and the indicators were modified until Aiken's V coefficients of [greater than or equal to] 0.80 (p = 0.05) were obtained for all indicators of the established competencies. It is concluded that the rubric is valid enough to assess relevant competencies for employability in vocational training students.

Published
2022

38. Division and new multiplication between vectors

Author

Ramírez, José E H and Oria, E R

Subjects
Mathematics - General Mathematics, 15A03 (Primary) 11R52 (Secondary)
Abstract

The division between two vectors belonging to the same vector space is obtained by elementary procedures of vector algebra and is defined by a matrix. This representation is obtained for two and three dimensional vector spaces. A new vector multiplication is defined and an the inverse vector. Through this multiplication we can obtain the division previously defined.The meaning of vector division and multiplication are analyzed., Comment: 6 pages and 1 figure

Published
2023

39. Partial Motzkin paths with air pockets of the first kind avoiding peaks, valleys or double rises

Author

Baril, Jean-Luc and Ramírez, José Luis

Subjects
Mathematics - Combinatorics
Abstract

Motzkin paths with air pockets (MAP) of the first kind are defined as a generalization of Dyck paths with air pockets. They are lattice paths in $\mathbb{N}^2$ starting at the origin made of steps $U=(1,1)$, $D_k=(1,-k)$, $k\geq 1$ and $H=(1,0)$, where two down-steps cannot be consecutive. We enumerate MAP and their prefixes avoiding peaks (resp. valleys, resp. double rise) according to the length, the type of the last step, and the height of its end-point. We express our results using Riordan arrays. Finally, we provide constructive bijections between these paths and restricted Dyck and Motzkin paths., Comment: arXiv admin note: substantial text overlap with arXiv:2212.12404

Published
2023

40. Polyominoes and graphs built from Fibonacci words

Author

Kirgizov, Sergey and Ramírez, José Luis

Subjects
Mathematics - Combinatorics, Computer Science - Discrete Mathematics
Abstract

We introduce the $k$-bonacci polyominoes, a new family of polyominoes associated with the binary words avoiding $k$ consecutive $1$'s, also called generalized $k$-bonacci words. The polyominoes are very entrancing objects, considered in combinatorics and computer science. The study of polyominoes generates a rich source of combinatorial ideas. In this paper we study some properties of $k$-bonacci polyominoes. Specifically, we determine their recursive structure and, using this structure, we enumerate them according to their area, semiperimeter, and length of the corresponding words. We also introduce the $k$-bonacci graphs, then we obtain the generating functions for the total number of vertices and edges, the distribution of the degrees, and the total number of $k$-bonacci graphs that have a Hamiltonian cycle., Comment: 16 pages, 8 figures

Published
2022

45. The Taste of Textures : Artificial Intelligence Driven Gastronomic Design and Crossmodal Correspondences in Living Art

Author

Carrillo Andrada, José Antonio, de la Rosa Morón, José, Oliver Ramírez, José Luis, di Prisco, Marco, Series Editor, Chen, Sheng-Hong, Series Editor, Vayas, Ioannis, Series Editor, Kumar Shukla, Sanjay, Series Editor, Sharma, Anuj, Series Editor, Kumar, Nagesh, Series Editor, Wang, Chien Ming, Series Editor, Cui, Zhen-Dong, Series Editor, Di Marco, Giancarlo, editor, Lombardi, Davide, editor, and Tedjosaputro, Mia, editor

Published
2024
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46. MinimalAI: Brain Hemorrhage Detection in Images Through Minimalist Machine Learning Approach

Author

Solorio-Ramírez, José-Luis, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Hernández Heredia, Yanio, editor, Milián Núñez, Vladimir, editor, and Ruiz Shulcloper, José, editor

Published
2024
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49. Equilibrium points and their linear stability in the planar equilateral restricted four-body problem: A review and new results

Author

Ramírez, José Alejandro Zepeda and Alvarez-Ramírez, Martha

Subjects
Mathematics - Dynamical Systems, Mathematical Physics, 70F10, 37N05
Abstract

In this work, we revisit the planar restricted four-body problem to study the dynamics of an infinitesimal mass under the gravitational force produced by three heavy bodies with unequal masses, forming an equilateral triangle configuration. We unify known results about the existence and linear stability of equilibrium points of this problem which have been obtained earlier, either as relative equilibria or a central configuration of the planar restricted $(3 + 1)$-body problem. It is the first attempt in this direction. A systematic numerical investigation is performed to obtain the resonance curves in the mass space. We use these curves to answer the question about the existing boundary between the domains of linear stability and instability. The characterization of the total number of stable points found inside the stability domain is discussed.

Published
2022
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50. Knight's paths towards Catalan numbers

Author

Baril, Jean-Luc and Ramirez, José Luis

Subjects
Mathematics - Combinatorics, 05A15, 05A19
Abstract

We provide enumerating results for partial knight's paths of a given size. We prove algebraically that zigzag knight's paths of a given size ending on the $x$-axis are enumerated by the generalized Catalan numbers, and we give a constructive bijection with peakless Motzkin paths of a given length. After enumerating partial knight's paths of a given length, we prove that zigzag knight's paths of a given length ending on the $x$-axis are counted by the Catalan numbers. Finally, we give a constructive bijection with Dyck paths of a given length.

Published
2022

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