| Análisis del Método de HALLEY y sus variantes para la resolución de ecuaciones no lineales |
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| EMCVV: Elaboración de Materiales de Cálculo en Varias Variables: Una experiencia interuniversitaria |
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| Estimación de los parámetros de forma y escala en una distribución Gamma |
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| LA ASIGNATURA DE CÁLCULO ANTE EL ESPACIO EUROPEO DE EDUCACIÓN SUPERIOR: UNA PROPUESTA EN LA ESCUELA POLITÉCNICA SUPERIOR DE ZAMORA |
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| Memoria del proyecto: e-MATE |
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| Metodos de derivación numérica |
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| Nuevas estrategias docentes en el área de matemática aplicada dentro del grado de ingenieŕıa informática |
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| Desarrollo de Materiales Docentes relativos a la Aplicación de las Matemáticas en la Ciencia y la Ingenieŕıa |
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| Utilización de nuevas tecnoloǵıas en la asignatura de Análisis Numérico en el Grado de Matemáticas |
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| Ecuaciones diferenciales ordinarias de segundo orden en la ingenieŕıa y los métodos anaĺıticos y numéricos para su resolución |
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| Elaboración de recursos didácticos para ingenieŕıa mediante el programa Mathematica |
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| Una experiencia de aplicación de rúbricas para la evaluación de trabajos de matemática aplicada en ingenieŕıa |
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| Fomento del uso del programa Mathematica en las asignaturas de Ingenieŕıa |
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| Un proyecto interdepartamental de promoción de herramientas tecnológicas en ingenieŕıa. El caso del sistema Mathematica |
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| Una estrategia para disminuir las respuestas en blanco en los exámenes de matemáticas de los primeros cursos de Ingenieŕıa |
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| Adecuación de las enseñanzas básicas del área de matemática aplicada en el Grado de Ingenieŕıa Mecánica de la EPS de Zamora a las directrices del EEES |
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| Actas de la 9ª Conferencia Ibérica de Sistemas y Tecnoloǵıas de Informacion Barcelona, España 18 al 21 de junio de 2014 |
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| An efficient fifth-order block method for solving third-order BVPs |
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| A robust iterative family for multiple roots of nonlinear equations: Enhancing accuracy and handling critical points |
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| Numerical integration of stiff problems using a new time-efficient hybrid block solver based on collocation and interpolation techniques |
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| Compact finite difference schemes with high resolution characteristics and their applications to solve Burgers equation |
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| A rapidly converging domain decomposition algorithm for a time delayed parabolic problem with mixed type boundary conditions exhibiting boundary layers |
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| Numerical scheme for singularly perturbed Fredholm integro-differential equations with non-local boundary conditions |
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| Robust numerical schemes for time delayed singularly perturbed parabolic problems with discontinuous convection and source terms |
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| A variable stepsize hybrid block optimized technique for integrating a class of singularly perturbed parabolic problems |
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| A coupled scheme based on uniform algebraic trigonometric tension B-spline and a hybrid block method for Camassa-Holm and Degasperis-Procesi equations |
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| Advanced numerical scheme and its convergence analysis for a class of two-point singular boundary value problems |
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| A new block method with variable stepsize implementation for solving third-order differential systems |
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| A conservative algorithm based on a hybrid block method and tension B-spline differential quadrature method for Rosenau–KdV–RLW equation |
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| Numerical Treatment of a Two-Parameter Singularly Perturbed Elliptic Problem with Discontinuous Convection and Source Terms |
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| New Conditions for Testing the Oscillation of Solutions of Second-Order Nonlinear Differential Equations with Damped Term |
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| A trigonometrically fitted intra-step block Falkner method for the direct integration of second-order delay differential equations with oscillatory solutions |
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| Numerical solution of time dependent nonlinear partial differential equations using a novel block method coupled with compact finite difference schemes |
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| Solving third-order Lane–Emden–Fowler equations using a variable stepsize formulation of a pair of block methods |
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| A New Phase-and Amplification-Fitted Sixth-Order Explicit RKN Method to Solve Oscillating Systems |
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| A functionally-fitted block hybrid Falkner method for Kepler equations and related problems |
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| Parameter independent scheme for singularly perturbed problems including a boundary turning point of multiplicity ≥ 1 |
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| A Tenth-Order Sixth-Derivative Block Method for Directly Solving Fifth-Order Initial Value Problems |
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| NEW APPROACH BASED ON COLLOCATION AND SHIFTED CHEBYSHEV POLYNOMIALS FOR A CLASS OF THREE-POINT SINGULAR BVPS |
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| AN EFFICIENT PARAMETER UNIFORM SPLINE-BASED TECHNIQUE FOR SINGULARLY PERTURBED WEAKLY COUPLED REACTION-DIFFUSION SYSTEMS |
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| A Pair of Optimized Nyström Methods with Symmetric Hybrid Points for the Numerical Solution of Second-Order Singular Boundary Value Problems |
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| A New Hybrid Block Method for Solving First-Order Differential System Models in Applied Sciences and Engineering |
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| A 14-Order Hybrid Block Method in Variable Step-Size Mode for Solving Second-Order Initial Value Problems |
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| Development of a Higher-Order 𝒜-Stable Block Approach with Symmetric Hybrid Points and an Adaptive Step-Size Strategy for Integrating Differential Systems Efficiently |
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| Second-Order Robust Numerical Method for a Partially Singularly Perturbed Time-Dependent Reaction–Diffusion System |
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| A Phase- and Amplification-Fitted 5(4) Diagonally Implicit Runge–Kutta–Nyström Pair for Oscillatory Systems |
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| An Improved Oscillation Result for a Class of Higher Order Non-canonical Delay Differential Equations |
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| Analytical and Numerical Solution for the Time Fractional Black-Scholes Model Under Jump-Diffusion |
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| Solving SIVPs of Lane–Emden–Fowler Type Using a Pair of Optimized Nyström Methods with a Variable Step Size |
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| An efficient technique based on Green’s function for solving two-point boundary value problems and its convergence analysis |
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| A new three-step fixed point iteration scheme with strong convergence and applications |
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| A fitted numerical method for a singularly perturbed Fredholm integro-differential equation with discontinuous source term |
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| Numerical treatment of a singularly perturbed 2-D convection-diffusion elliptic problem with Robin-type boundary conditions |
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| Second-Order Dynamic Equations with Noncanonical Operator: Oscillatory Behavior |
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| A Computational Block Method with Five Hybrid-Points for Differential Equations Containing a Piece-wise Constant Delay |
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| Time-efficient reformulation of the Lobatto III family of order eight |
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| Solving second order two-point boundary value problems accurately by a third derivative hybrid block integrator |
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| Development of a new iterative method and its convergence analysis for nonlinear fourth‐order boundary value problems arising in beam analysis |
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| Parameter-uniform convergence analysis of a domain decomposition method for singularly perturbed parabolic problems with Robin boundary conditions |
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| An adaptive optimized Nyström method for second‐order IVPs |
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| A computational approach for a two-parameter singularly perturbed system of partial differential equations with discontinuous coefficients |
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| A technique for generating adapted discretizations to solve partial differential equations with the generalized finite difference method |
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| Numerical solution of a fourth‐order singularly perturbed boundary value problem with discontinuities via Haar wavelets |
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| A computational method for a two-parameter singularly perturbed elliptic problem with boundary and interior layers |
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| Development of an Efficient Diagonally Implicit Runge–Kutta–Nyström 5(4) Pair for Special Second Order IVPs |
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| A new one-step method with three intermediate points in a variable step-size mode for stiff differential systems |
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| An efficient algorithm combining an optimized hybrid block method and the differential quadrature method for solving Hunter–Saxton equation |
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| Efficient Numerical Solutions to a SIR Epidemic Model |
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| Simplifying the variational iteration method: A new approach to obtain the Lagrange multiplier |
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| An efficient optimized adaptive step-size hybrid block method for integrating w′′=f(t,w,w′) directly |
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| An efficient hybrid numerical method based on an additive scheme for solving coupled systems of singularly perturbed linear parabolic problems |
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| A trigonometrically adapted 6(4) explicit Runge–Kutta–Nyström pair to solve oscillating systems |
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| A Family of A -Stable Optimized Hybrid Block Methods for Integrating Stiff Differential Systems |
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| A Positivity-Preserving Improved Nonstandard Finite Difference Method to Solve the Black-Scholes Equation |
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| New Monotonic Properties of the Class of Positive Solutions of Even-Order Neutral Differential Equations |
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| A variable step-size fourth-derivative hybrid block strategy for integrating third-order IVPs, with applications |
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| A two-step hybrid block method with fourth derivatives for solving third-order boundary value problems |
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| Using a cubic B-spline method in conjunction with a one-step optimized hybrid block approach to solve nonlinear partial differential equations |
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| Numerical integration of third-order singular boundary-value problems of Emden–Fowler type using hybrid block techniques |
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| A Nonstandard Finite Difference Method for a Generalized Black–Scholes Equation |
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| A uniformly convergent quadratic B-spline based scheme for singularly perturbed degenerate parabolic problems |
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| Adaptive step-size approach for Simpson’s-type block methods with time efficiency and order stars |
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| A second-derivative functionally fitted method of maximal order for oscillatory initial value problems |
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| A new nonlinear ninth-order root-finding method with error analysis and basins of attraction |
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| A high-order efficient optimised global hybrid method for singular two-point boundary value problems |
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| The generalized finite difference method with third- and fourth-order approximations and treatment of ill-conditioned stars |
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| A positive and elementary stable nonstandard explicit scheme for a mathematical model of the influenza disease |
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| Parameter-uniform approximation on equidistributed meshes for singularly perturbed parabolic reaction-diffusion problems with Robin boundary conditions |
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| Fourth derivative singularly P-stable method for the numerical solution of the Schrödinger equation |
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| A Functionally-Fitted Block Numerov Method for Solving Second-Order Initial-Value Problems with Oscillatory Solutions |
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| Some new discretizations of the Euler–Lagrange equation |
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| Improved criteria for oscillation of noncanonical neutral differential equations of even order |
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| A strategy to avoid ill‐conditioned stars in the generalized finite difference method for solving one‐dimensional problems |
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| An adaptive pair of one-step hybrid block Nyström methods for singular initial-value problems of Lane-Emden-Fowler type |
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| A finite-difference scheme for a coupled system of singularly perturbed time-dependent reaction-diffusion equations with discontinuous source terms |
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| Computational and Mathematical Methods in Science and Engineering |
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| An adaptive one-point second-derivative Lobatto-type hybrid method for solving efficiently differential systems |
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| A philos‐type criterion to determine the oscillatory character of a class of neutral delay differential equations |
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| Efficient adaptive step-size formulation of an optimized two-step hybrid block method for directly solving general second-order initial-value problems |
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| A Phase-Fitted and Amplification-Fitted Explicit Runge–Kutta–Nyström Pair for Oscillating Systems |
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| Numerical Solution for Singular Boundary Value Problems Using a Pair of Hybrid Nyström Techniques |
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| Development and Implementation of a Tenth-Order Hybrid Block Method for Solving Fifth-Order Boundary Value Problems |
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| More Effective Results for Testing Oscillation of Non-Canonical Neutral Delay Differential Equations |
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| Numerical solution of third‐order boundary value problems by using a two‐step hybrid block method with a fourth derivative |
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| A graded mesh refinement approach for boundary layer originated singularly perturbed time‐delayed parabolic convection diffusion problems |
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| A Family of Functionally-Fitted Third Derivative Block Falkner Methods for Solving Second-Order Initial-Value Problems with Oscillating Solutions |
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| Second-order Emden-Fowler neutral differential equations: A new precise criterion for oscillation |
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| Quadratic B‐spline collocation method for time dependent singularly perturbed differential‐difference equation arising in the modeling of neuronalactivity |
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| On the asymptotic and oscillatory behavior of the solutions of a class of higher-order differential equations with middle term |
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| Numerical solution of second-order singular problems arising in astrophysics by combining a pair of one-step hybrid block Nyström methods |
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| Some variants of Halley’s method with memory and their applications for solving several chemical problems |
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| Numerical solution of Bratu’s and related problems using a third derivative hybrid block method |
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| Block Hybrid Method for the Numerical solution of Fourth order Boundary Value Problems |
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| Efficient <i>k</i>-Step Linear Block Methods to Solve Second Order Initial Value Problems Directly |
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| Integrated neuro-evolution-based computing solver for dynamics of nonlinear corneal shape model numerically |
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| On the approximate solutions of a class of fractional order nonlinear Volterra integro-differential initial value problems and boundary value problems of first kind and their convergence analysis |
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| A stable finite difference scheme and error estimates for parabolic singularly perturbed PDEs with shift parameters |
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| One-Step Hybrid Block Method Containing Third Derivatives and Improving Strategies for Solving Bratu's and Troesch's Problems |
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| A non-uniform difference scheme for solving singularly perturbed 1D-parabolic reaction-convection-diffusion systems with two small parameters and discontinuous source terms |
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| An efficient optimized adaptive step-size hybrid block method for integrating differential systems |
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| A third-derivative two-step block Falkner-type method for solving general second-order boundary-value systems |
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| Discrete approximation for a two-parameter singularly perturbed boundary value problem having discontinuity in convection coefficient and source term |
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| Numerical solution of boundary value problems by using an optimized two-step block method |
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| A perturbation-based approach for solving fractional-order Volterra–Fredholm integro differential equations and its convergence analysis |
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| Homotopy perturbation method for solving Caputo?type fractional?order Volterra?Fredholm integro?differential equations |
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| Solving initial and boundary value problems of fractional ordinary differential equations by using collocation and fractional powers |
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| An Optimized Two-Step Hybrid Block Method Formulated in Variable Step-Size Mode for Integrating y '' = f (x, y, y ') Numerically |
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| A block hybrid integrator for numerically solving fourth-order Initial Value Problems |
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| Development of a new Runge?Kutta method and its economical implementation |
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| Extrapolating for attaining high precision solutions for fractional partial differential equations |
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| L-stable Explicit Nonlinear Method with Constant and Variable Step-size Formulation for Solving Initial Value Problems |
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| Numerical treatment of two-parameter singularly perturbed parabolic convection diffusion problems with non-smooth data |
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| Third derivative modification of k-step block Falkner methods for the numerical solution of second order initial-value problems |
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| How many k-step linear block methods exist and which of them is the most efficient and simplest one? |
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| A tenth order A-stable two-step hybrid block method for solving initial value problems of ODEs |
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| Effcient formulas for the exact integration of products of polynomials, exponentials and trigonometric functions |
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| Modified two-step hybrid methods for the numerical integration of oscillatory problems |
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| Recent mathematical–computational techniques and models in chemistry |
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| A unified approach for the development of k-step block Falkner-type methods for solving general second-order initial-value problems in ODEs |
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| An embedded 3(2) pair of nonlinear methods for solving first order initial-value ordinary differential systems |
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| A new approach based on the Newton's method to solve systems of nonlinear equations |
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| A first approach in solving initial-value problems in ODEs by elliptic fitting methods |
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| Use of a Symbolic Computation Program to Reinforce the Spatial Abilities of Engineering Students |
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| A note on variable step-size formulation of a Simpson's-type second derivative block method for solving stiff systems |
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| Fourth International Conference on Technological Ecosystems for Enhancing Multiculturality |
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| A new approach on the construction of trigonometrically fitted two step hybrid methods |
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| An efficient variable step-size rational Falkner-type method for solving the special second-order IVP |
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| A new approach on the construction of trigonometrically fitted two step hybrid methods |
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| An optimized two-step hybrid block method for solving general second order initial-value problems |
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| Recent trends on Computational and Mathematical Methods in Science and Engineering (CMMSE) |
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| Recent trends on Computational and Mathematical Methods in Science and Engineering (CMMSE) |
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| Solving first-order initial-value problems by using an explicit non-standard A-stable one-step method in variable step-size formulation |
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| Recent trends on Computational and Mathematical Methods in Science and Engineering (CMMSE) |
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| On the choice of the frequency in trigonometrically-fitted methods for periodic problems |
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| Mathematical and computational tools in chemistry: CMMSE-2014 |
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| Recent trends on Computational and Mathematical Methods in Science and Engineering (CMMSE) |
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| The application of Newton’s method in vector form for solving nonlinear scalar equations where the classical Newton method fails |
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| Some new implicit two-step multiderivative methods for solving special second-order IVP’s |
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| Improving mathematical competencies of students accessing to higher education from vocational training modules |
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| A trigonometrically-fitted method with two frequencies, one for the solution and another one for the derivative |
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| A strategy for selecting the frequency in trigonometrically-fitted methods based on the minimization of the local truncation errors and the total energy error |
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| Métodos de Falkner en modo predictor-corrector para la resolución de problemas de valor inicial de segundo orden (análisis e implementación) |
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| Uso de los errores como estrategia didáctica en el aprendizaje de las matemáticas en el nivel universitario |
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| Diseño y evaluación de material de apoyo en matemáticas básicas para alumnos procedentes de ciclos formativos en la escuela politécnica superior de Zamora |
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| Topics of contemporary computational mathematics |
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| El canon de Simón Garćıa. Entre el rito y la geometŕıa |
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| Innovación docente para las asignaturas de Métodos Númericos en Finanzas del Grado de Matemáticas |
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| Analysis of a Chebyshev-based backward differentiation formulae and relation with Runge–Kutta collocation methods |
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| A numerical ODE solver that preserves the fixed points and their stability |
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| Review of explicit Falkner methods and its modifications for solving special second-order IVPs |
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| On the frequency choice in trigonometrically fitted methods |
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| Contributions to the development of differential systems exactly solved by multistep finite-difference schemes |
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| Numerical solution of nonlinear singularly perturbed problems by using a non-standard algorithm on variable stepsize implementation (CMMSE-2009) |
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| Exponential fitting BDF-Runge-Kutta algorithms |
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| A family of A-stable Runge-Kutta collocation methods of higher order for initial-value problems |
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| An almost L-stable BDF-type method for the numerical solution of stiff ODEs arising from the Method of Lines |
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| Variable-stepsize Chebyshev-type methods for the integration of second-order I.V.P.'s |
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| A fourth-order Runge-Kutta method based on BDF-type Chebyshev approximations |
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| A non-standard explicit integration scheme for initial-value problems |
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| A new eighth-order A-stable method for solving differential systems arising in chemical reactions |
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| Variable stepsize störmer-cowell methods |
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| A variable-step Numerov method for the numerical solution of the Schrodinger equation |
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| A note on step-size selection in the Störmer--Cowell methods |
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