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ORCIDMihály Kovács
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2020 – today
- 2024
[i10]Mihály Kovács, Mihály András Vághy:
Neumann-Neumann type domain decomposition of elliptic problems on metric graphs. CoRR abs/2402.05707 (2024)- 2023
- [j18]David Bolin, Mihály Kovács
, Vivek Kumar, Alexandre B. Simas:
Regularity and numerical approximation of fractional elliptic differential equations on compact metric graphs. Math. Comput. 93(349): 2439-2472 (2023) - [i9]David Bolin, Mihály Kovács, Vivek Kumar, Alexandre B. Simas:
Regularity and numerical approximation of fractional elliptic differential equations on compact metric graphs. CoRR abs/2302.03995 (2023) - 2022
- [j17]Erik Jansson, Mihály Kovács, Annika Lang:
Surface Finite Element Approximation of Spherical Whittle-Matérn Gaussian Random Fields. SIAM J. Sci. Comput. 44(2): 825- (2022) - 2021
- [i8]György Lipták, Mike Pereira, Balázs Kulcsár, Mihály Kovács, Gábor Szederkényi:
Traffic Reaction Model. CoRR abs/2101.10190 (2021) - [i7]Erika Hausenblas, Mihály Kovács:
Some approximation results for mild solutions of stochastic fractional order evolution equations driven by Gaussian noise. CoRR abs/2102.07434 (2021) - [i6]Erik Jansson, Mihály Kovács, Annika Lang:
Surface finite element approximation of spherical Whittle-Matérn Gaussian random fields. CoRR abs/2102.08822 (2021) - [i5]Mihály Kovács, Annika Lang, Andreas Petersson:
Hilbert-Schmidt regularity of symmetric integral operators on bounded domains with applications to SPDE approximations. CoRR abs/2107.10104 (2021) - [i4]Mihály Kovács, Annika Lang, Andreas Petersson:
Approximation of SPDE covariance operators by finite elements: A semigroup approach. CoRR abs/2107.10109 (2021) - [i3]Boris Baeumer, Mihály Kovács, Matthew Parry:
A Higher Order Resolvent-positive Finite Difference Approximation for Fractional Derivatives. CoRR abs/2112.08529 (2021) - 2020
- [j16]Mihály Kovács, Stig Larsson, Fardin Saedpanah:
Mittag-Leffler Euler Integrator for a Stochastic Fractional Order Equation with Additive Noise. SIAM J. Numer. Anal. 58(1): 66-85 (2020)
2010 – 2019
- 2019
- [j15]Monika Eisenmann, Mihály Kovács, Raphael Kruse, Stig Larsson:
On a Randomized Backward Euler Method for Nonlinear Evolution Equations with Time-Irregular Coefficients. Found. Comput. Math. 19(6): 1387-1430 (2019) - [i2]Monika Eisenmann, Mihály Kovács, Raphael Kruse, Stig Larsson:
Error estimates of the backward Euler-Maruyama method for multi-valued stochastic differential equations. CoRR abs/1906.11538 (2019) - [i1]Mihály Kovács, Annika Lang, Andreas Petersson:
Weak convergence of fully discrete finite element approximations of semilinear hyperbolic SPDE with additive noise. CoRR abs/1909.04571 (2019) - 2018
- [j14]Boris Baeumer, Mihály Kovács, Mark M. Meerschaert, Harish Sankaranarayanan:
Boundary conditions for fractional diffusion. J. Comput. Appl. Math. 336: 408-424 (2018) - [j13]Boris Baeumer, Mihály Kovács, Mark M. Meerschaert, Harish Sankaranarayanan:
Reprint of: Boundary conditions for fractional diffusion. J. Comput. Appl. Math. 339: 414-430 (2018) - [j12]Daisuke Furihata, Mihály Kovács, Stig Larsson, Fredrik Lindgren:
Strong Convergence of a Fully Discrete Finite Element Approximation of the Stochastic Cahn-Hilliard Equation. SIAM J. Numer. Anal. 56(2): 708-731 (2018) - 2015
- [j11]Mihály Kovács, Stig Larsson, Fredrik Lindgren:
On the Backward Euler Approximation of the Stochastic Allen-Cahn Equation. J. Appl. Probab. 52(2): 323-338 (2015) - [j10]Mihály Kovács, Felix Lindner, René L. Schilling:
Weak Convergence of Finite Element Approximations of Linear Stochastic Evolution Equations with Additive Lévy Noise. SIAM/ASA J. Uncertain. Quantification 3(1): 1159-1199 (2015) - 2014
- [j9]Mihály Kovács, Jacques Printems:
Strong order of convergence of a fully discrete approximation of a linear stochastic Volterra type evolution equation. Math. Comput. 83(289): 2325-2346 (2014) - [j8]Mihály Kovács, Stig Larsson, Ali Mesforush:
Erratum: Finite Element Approximation of the Cahn-Hilliard-Cook Equation. SIAM J. Numer. Anal. 52(5): 2594-2597 (2014) - 2012
- [j7]Boris Baeumer, Mihály Kovács:
Approximating Multivariate Tempered Stable Processes. J. Appl. Probab. 49(1): 167-183 (2012) - 2011
- [j6]Mihály Kovács, Fredrik Lindgren, Stig Larsson:
Spatial approximation of stochastic convolutions. J. Comput. Appl. Math. 235(12): 3554-3570 (2011) - [j5]Mihály Kovács, Stig Larsson, Ali Mesforush:
Finite Element Approximation of the Cahn-Hilliard-Cook Equation. SIAM J. Numer. Anal. 49(6): 2407-2429 (2011) - 2010
- [j4]Mihály Kovács, Stig Larsson, Fredrik Lindgren:
Strong convergence of the finite element method with truncated noise for semilinear parabolic stochastic equations with additive noise. Numer. Algorithms 53(2-3): 309-320 (2010) - [j3]Mihály Kovács, Stig Larsson, Fardin Saedpanah:
Finite Element Approximation of the Linear Stochastic Wave Equation with Additive Noise. SIAM J. Numer. Anal. 48(2): 408-427 (2010)
2000 – 2009
- 2008
- [j2]Boris Baeumer, Mihály Kovács, Mark M. Meerschaert:
Numerical solutions for fractional reaction-diffusion equations. Comput. Math. Appl. 55(10): 2212-2226 (2008) - 2007
- [j1]Mihály Kovács:
On the convergence of rational approximations of semigroups on intermediate spaces. Math. Comput. 76(257): 273-286 (2007)
Coauthor Index
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