New approach on the study of operator matrix
-
Ines Marzouk
Abstract
In the present paper, a new technique is presented to
study the problem of invertibility of unbounded block
References
[1] A.-M. Al-Izeri and K. Latrach, On the asymptotic spectrum of a transport operator with elastic and inelastic collision operators, Acta Math. Sci. Ser. B (Engl. Ed.) 40 (2020), no. 3, 805–823. 10.1007/s10473-020-0315-2Search in Google Scholar
[2] A. Bahloul and I. Walha, Generalized Drazin invertibility of operator matrices, Numer. Funct. Anal. Optim. 43 (2022), no. 16, 1836–1847. 10.1080/01630563.2022.2137811Search in Google Scholar
[3] A. Bátkai, P. Binding, A. Dijksma, R. Hryniv and H. Langer, Spectral problems for operator matrices, Math. Nachr. 278 (2005), no. 12–13, 1408–1429. 10.1002/mana.200310313Search in Google Scholar
[4] M. Borysiewicz and J. Mika, Time behavior of thermal neutrons in moderating media, J. Math. Anal. Appl. 26 (1969), 461–478. 10.1016/0022-247X(69)90193-0Search in Google Scholar
[5] J. A. Burns and R. H. Fabiano, Feedback control of a hyperbolic partial-differential equation with viscoelastic damping, Control Theory Adv. Tech. 5 (1989), no. 2, 157–188. 10.21236/ADA192896Search in Google Scholar
[6] S. L. Campbell, Singular Systems of Differential Equations, Res. Notes Math. 40, Pitman, Boston, 1980. Search in Google Scholar
[7] S. L. Campbell, Singular Systems of Differential Equations. II, Res. Notes Math. 61, Pitman, Boston, 1982. Search in Google Scholar
[8] S. Charfi, A. Elleuch and I. Walha, Spectral theory involving the concept of quasi-compact perturbations, Mediterr. J. Math. 17 (2020), no. 1, Paper No. 32. 10.1007/s00009-019-1468-xSearch in Google Scholar
[9] S. Charfi and I. Walha, On relative essential spectra of block operator matrices and application, Bull. Korean Math. Soc. 53 (2016), no. 3, 681–698. 10.4134/BKMS.b150233Search in Google Scholar
[10] D. E. Crabtree and E. V. Haynsworth, An identity for the Schur complement of a matrix, Proc. Amer. Math. Soc. 22 (1969), 364–366. 10.1090/S0002-9939-1969-0255573-1Search in Google Scholar
[11] K.-J. Engel, Spectral theory and generator property for one-sided coupled operator matrices, Semigroup Forum 58 (1999), no. 2, 267–295. 10.1007/s002339900020Search in Google Scholar
[12] K.-J. Engel and R. Nagel, One-Parameter Semigroups for Linear Evolution Equations, Grad. Texts in Math. 194, Springer, New York, 2000. Search in Google Scholar
[13] P. Ferrari, I. Furci, S. Hon, M. A. Mursaleen and S. Serra-Capizzano, The eigenvalue distribution of special 2-by-2 block matrix-sequences with applications to the case of symmetrized Toeplitz structures, SIAM J. Matrix Anal. Appl. 40 (2019), no. 3, 1066–1086. 10.1137/18M1207399Search in Google Scholar
[14] Z. Fuzhen, The Schur Complement and Its Applications, Numer. Methods Algorithms 4, Springer, New York, 2005. Search in Google Scholar
[15] A. Hassairi, F. Ktari and R. Zine, On the Gaussian representation of the Riesz probability distribution on symmetric matrices, AStA Adv. Stat. Anal. 106 (2022), no. 4, 609–632. 10.1007/s10182-022-00436-wSearch in Google Scholar
[16] E. V. Haynsworth, On the Schur complement, Basel Math. Notes 20 (1968), Paper No. 17. Search in Google Scholar
[17] B. Jacob and C. Trunk, Location of the spectrum of operator matrices which are associated to second order equations, Oper. Matrices 1 (2007), no. 1, 45–60. 10.7153/oam-01-03Search in Google Scholar
[18] A. Jeribi, N. Moalla and I. Walha, Spectra of some block operator matrices and application to transport operators, J. Math. Anal. Appl. 351 (2009), no. 1, 315–325. 10.1016/j.jmaa.2008.09.074Search in Google Scholar
[19] W. B. V. Kandasamy, K. Ilanthenral and F. Smarandache, Special Type of Fixed Points of MOD Matrix Operators, EuropaNova, Bruxelles, 2016. Search in Google Scholar
[20] H. G. Kaper, C. G. Lekkerkerker and J. Hejtmanek, Spectral Methods in Linear Transport Theory, Oper. Theory Adv. Appl. 5, Birkhäuser, Basel, 1982. Search in Google Scholar
[21] F. Kappel, K. Kunisch and W. Schappacher, Distributed Parameter Systems, Lect. Notes Control Inf. Sci. 75, Springer, Berlin, 1985. 10.1007/BFb0005641Search in Google Scholar
[22] S. Kessentini, M. Tounsi and R. Zine, The Riesz probability distribution: Generation and EM algorithm, Comm. Statist. Simulation Comput. 49 (2020), no. 8, 2114–2133. 10.1080/03610918.2018.1513139Search in Google Scholar
[23] K. Latrach, Essential spectra on spaces with the Dunford–Pettis property, J. Math. Anal. Appl. 233 (1999), no. 2, 607–622. 10.1006/jmaa.1999.6314Search in Google Scholar
[24] G. Leugering, A generation result for a class of linear thermoviscoelastic material, Dynamical Problems in Mathematical Physics (Oberwolfach 1982), Methoden Verfahren Math. Phys. 26, Peter Lang, Frankfurt am Main (1983), 107–117. Search in Google Scholar
[25] G. Mahoux, M. L. Mehta and J.-M. Normand, Matrices coupled in a chain. II. Spacing functions, J. Phys. A 31 (1998), no. 19, 4457–4464. 10.1088/0305-4470/31/19/011Search in Google Scholar
[26] A. Majorana, Space homogeneous solutions of the Boltzmann equation describing electron-phonon interactions in semiconductors, Transport Theory Statist. Phys. 20 (1991), no. 4, 261–279. 10.1080/00411459108203906Search in Google Scholar
[27] A. Matsumura and T. Nishida, The initial value problem for the equations of motion of compressible viscous and heat-conductive fluids, Proc. Japan Acad. Ser. A Math. Sci. 55 (1979), no. 9, 337–342. 10.3792/pjaa.55.337Search in Google Scholar
[28] M. L. Mehta, Random matrices, 3rd ed., Pure Appl. Math. (Amsterdam) 142, Elsevier/Academic, Amsterdam, 2004. Search in Google Scholar
[29] M. Mokhtar-Kharroubi, Mathematical Topics in Neutron Transport Theory, Ser. Adv. Math. Appl. Sci. 46, World Scientific, River Edge, 1997. 10.1142/3288Search in Google Scholar
[30] R. Nagel, Well-posedness and positivity for systems of linear evolution equations, Confer. Sem. Mat. Univ. Bari (1985), no. 203, 29. Search in Google Scholar
[31] R. Nagel, Towards a “matrix theory” for unbounded operator matrices, Math. Z. 201 (1989), no. 1, 57–68. 10.1007/BF01161994Search in Google Scholar
[32] R. Nagel, Characteristic equations for the spectrum of generators, Ann. Sc. Norm. Super. Pisa Cl. Sci. (4) 24 (1997), no. 4, 703–717. Search in Google Scholar
[33] M. Z. Nashed, Generalized inverses, normal solvability, and iteration for singular operator equations, Nonlinear Functional Analysis and Applications (Madison 1970), Academic Press, New York (1971), 311–359. 10.1016/B978-0-12-576350-9.50007-2Search in Google Scholar
[34] M. Sbihi, Spectral theory of neutron transport semigroups with partly elastic collision operators, J. Math. Phys. 47 (2006), no. 12, Article ID 123502. 10.1063/1.2397557Search in Google Scholar
[35] M. Schechter, Invariance of the essential spectrum, Bull. Amer. Math. Soc. 71 (1965), 365–367. 10.1090/S0002-9904-1965-11296-4Search in Google Scholar
[36] C. Tretter, Spectral Theory of Block Operator Matrices and Applications, Imperial College, London, 2008. 10.1142/p493Search in Google Scholar
[37] I. Walha, On the M-essential spectra of two-group transport equations, Math. Methods Appl. Sci. 37 (2014), no. 14, 2135–2149. 10.1002/mma.2961Search in Google Scholar
[38] H. Zguitti, A note on Drazin invertibility for upper triangular block operators, Mediterr. J. Math. 10 (2013), no. 3, 1497–1507. 10.1007/s00009-013-0275-zSearch in Google Scholar
© 2023 Walter de Gruyter GmbH, Berlin/Boston
Articles in the same Issue
- Frontmatter
- On skew derivations and antiautomorphisms in prime rings
- On the non-triviality of anisotropic Roumieu Gelfand–Shilov spaces and inclusion between them
- Solution of generalized fractional kinetic equations with generalized Mathieu series
- The generalized Drazin inverse of an operator matrix with commuting entries
- Asymptotic analysis of fundamental solutions of hypoelliptic operators
- Calculation of Reynolds equation for the generalized non-Newtonian fluids and its asymptotic behavior in a thin domain
- Double lacunary statistical convergence of Δ-measurable functions on product time scales
- On ρ-statistical convergence in neutrosophic normed spaces
- On the comparison of translation invariant convex differentiation bases
- The quasi-Zariski topology on the graded quasi-primary spectrum of a graded module over a graded commutative ring
- Some classes of topological spaces and the space of G-permutation degree
- BV capacity and perimeter in abstract Wiener spaces and applications
- New approach on the study of operator matrix
- Comparison of several numerical solvers for a discretized nonlinear diffusion model with source terms
- Localization operators and inversion formulas for the Dunkl–Weinstein–Stockwell transform
Articles in the same Issue
- Frontmatter
- On skew derivations and antiautomorphisms in prime rings
- On the non-triviality of anisotropic Roumieu Gelfand–Shilov spaces and inclusion between them
- Solution of generalized fractional kinetic equations with generalized Mathieu series
- The generalized Drazin inverse of an operator matrix with commuting entries
- Asymptotic analysis of fundamental solutions of hypoelliptic operators
- Calculation of Reynolds equation for the generalized non-Newtonian fluids and its asymptotic behavior in a thin domain
- Double lacunary statistical convergence of Δ-measurable functions on product time scales
- On ρ-statistical convergence in neutrosophic normed spaces
- On the comparison of translation invariant convex differentiation bases
- The quasi-Zariski topology on the graded quasi-primary spectrum of a graded module over a graded commutative ring
- Some classes of topological spaces and the space of G-permutation degree
- BV capacity and perimeter in abstract Wiener spaces and applications
- New approach on the study of operator matrix
- Comparison of several numerical solvers for a discretized nonlinear diffusion model with source terms
- Localization operators and inversion formulas for the Dunkl–Weinstein–Stockwell transform
