Tudóstér: Molnár Lajos publikációi

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feltöltött közlemény: 121 Open Access: 15
2017
  1. Molnár, L.: Maps on the positive definite cone of a C*-algebra preserving certain quasi-entropies.
    J. Math. Anal. Appl. 447 (1), 206-221, 2017.
    Folyóirat-mutatók:
    Q2 Analysis
    Q1 Applied Mathematics
  2. Gaál, M., Molnár, L.: Transformations on density operators and on positive definite operators preserving the quantum Rényi divergence.
    Period. Math. Hung. 74 (1), 88-107, 2017.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
2016
  1. Molnár, L., Virosztek, D.: Continuous Jordan triple endomorphisms of P2.
    J. Math. Anal. Appl. 438 (2), 828-839, 2016.
    Folyóirat-mutatók:
    Q2 Analysis
    Q2 Applied Mathematics
  2. Hatori, O., Molnár, L.: Generalized isometries of the special unitary group.
    Arch. Math. 106 (2), 155-163, 2016.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
  3. Botelho, F., Molnár, L., Nagy, G.: Linear bijections on von Neumann factors commuting with (lambda)-Aluthge transform.
    Bull. London Math. Soc. 48 (1), 74-84, 2016.
    Folyóirat-mutatók:
    Q1 Mathematics (miscellaneous)
  4. Molnár, L., Pitrik, J., Virosztek, D.: Maps on positive definite matrices preserving Bregman and Jensen divergences.
    Linear Alg. Appl. 495 174-189, 2016.
    Folyóirat-mutatók:
    Q1 Algebra and Number Theory
    Q1 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q2 Numerical Analysis
  5. Molnár, L., Nagy, G.: Spectral Order Automorphisms on Hilbert Space Effects and Observables: The 2-Dimensional Case.
    Lett. Math. Phys. 106 (4), 535-544, 2016.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q2 Statistical and Nonlinear Physics
  6. Molnár, L.: The logarithmic function and trace zero elements in finite von Neumann factors.
    Bull. Aust. Math. Soc. 94 (2), 290-295, 2016.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
2015
  1. Molnár, L., Šemrl, P., Sourour, A.: Bilocal automorphisms.
    Oper. Matrices. 9 (1), 113-120, 2015.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
    Q3 Analysis
  2. Molnár, L.: Jordan triple endomorphisms and isometries of spaces of positive definite matrices.
    Linear Multilinear Algebra. 63 (1), 12-33, 2015.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
  3. Molnár, L., Virosztek, D.: On algebraic endomorphisms of the Einstein gyrogroup.
    J. Math. Phys. 56 (8), 1-7, 2015.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q2 Statistical and Nonlinear Physics
  4. Molnár, L.: On the Nonexistence of Order Isomorphisms between the Sets of All Self-Adjoint and All Positive Definite Operators.
    Abstract Appl. Anal. 2015 1-6, 2015.
    Folyóirat-mutatók:
    Q3 Analysis
    Q3 Applied Mathematics
  5. Molnár, L., Szokol, P.: Transformations on positive definite matrices preserving generalized distance measures.
    Linear Alg. Appl. 466 141-159, 2015.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q2 Numerical Analysis
  6. Molnár, L., Szokol, P.: Transformations Preserving Norms of Means of Positive Operators and Nonnegative Functions.
    Integr. Equ. Oper. Theory. 83 (2), 271-290, 2015.
    Folyóirat-mutatók:
    D1 Algebra and Number Theory
    Q1 Analysis
  7. Molnár, L.: Two characterizations of unitary-antiunitary similarity transformations of positive definite operators on a finite dimensional Hilbert space.
    Ann. Univ. Sci. Bp. Rolando Eötvös Nomin., Sect. comput. 58 83-93, 2015.
2014
  1. Molnár, L.: Bilocal *-automorphisms of B(H).
    Arch. Math. 102 (1), 83-89, 2014.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
  2. Hatori, O., Molnár, L.: Isometries of the unitary groups and Thompson isometries of the spaces of invertible positive elements in C*-algebras.
    J. Math. Anal. Appl. 409 (1), 158-167, 2014.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  3. Molnár, L., Szokol, P.: Kolmogorov-Smirnov isometries of the space of generalized distribution functions.
    Math. Slovaca. 64 (2), 433-444, 2014.
  4. Beneduci, R., Molnár, L.: On the standard K-loop structure of positive invertible elements in a C*-algebra.
    J. Math. Anal. Appl. 420 (1), 551-562, 2014.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  5. Molnár, L., Nagy, G.: Transformations on Density Operators That Leave the Holevo Bound Invariant.
    Int. J. Theor. Phys. 53 (10), 3273-3278, 2014.
    Folyóirat-mutatók:
    Q3 Mathematics (miscellaneous)
    Q3 Physics and Astronomy (miscellaneous)
2013
  1. Botelho, F., Jamison, J., Molnár, L.: Algebraic reflexivity of isometry groups and automorphism groups of some operator structures.
    J. Math. Anal. Appl. 408 (1), 177-195, 2013.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  2. Dolinar, G., Molnár, L.: Automorphisms for the logarithmic product of positive semidefinite operators.
    Linear Multilinear Algebra. 61 (2), 161-169, 2013.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
  3. Molnár, L.: Jordan triple endomorphisms and isometries of unitary groups.
    Linear Alg. Appl. 439 (11), 3518-3531, 2013.
    Folyóirat-mutatók:
    Q1 Algebra and Number Theory
    Q1 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q2 Numerical Analysis
  4. Molnár, L., Nagy, G., Szokol, P.: Maps on density operators preserving quantum f -divergences.
    Quantum Inf Process. 12 (7), 2309-2323, 2013.
    Folyóirat-mutatók:
    Q1 Electrical and Electronic Engineering
    Q1 Electronic, Optical and Magnetic Materials
    Q1 Modeling and Simulation
    Q1 Signal Processing
    Q2 Statistical and Nonlinear Physics
    Q1 Theoretical Computer Science
  5. Botelho, F., Jamison, J., Molnár, L.: Surjective isometries on Grassmann spaces.
    J. Funct. Anal. 265 (10), 2226-2238, 2013.
    Folyóirat-mutatók:
    D1 Analysis
2012
  1. Hatori, O., Hirasawa, G., Miura, T., Molnár, L.: Isometries and maps compatible with inverted Jordan triple products on groups.
    Tokyo j. math. 35 (2), 385-410, 2012.
    Folyóirat-mutatók:
    Q4 Mathematics (miscellaneous)
  2. Molnár, L., Nagy, G.: Isometries and relative entropy preserving maps on density operators.
    Linear Multilinear Algebra. 60 (1), 93-108, 2012.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
  3. Hatori, O., Molnár, L.: Isometries of the unitary group.
    Proc. Amer. Math. Soc. 140 (6), 2127-2140, 2012.
    Folyóirat-mutatók:
    Q1 Applied Mathematics
    Q1 Mathematics (miscellaneous)
  4. Dolinar, G., Molnár, L.: Sequential endomorphisms of finite-dimensional Hilbert space effect algebras.
    J. Phys. A-Math. Theor. 45 (6), 11, 2012.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q1 Modeling and Simulation
    Q1 Physics and Astronomy (miscellaneous)
    Q2 Statistical and Nonlinear Physics
    Q2 Statistics and Probability
  5. Molnár, L., Šemrl, P.: Transformations of the unitary group on a Hilbert space.
    J. Math. Anal. Appl. 388 (2), 1205-1217, 2012.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
2011
  1. Molnár, L.: Continuous maps on matrices transforming geometric mean to arithmetic mean.
    Annales Univ. Sci. Budapest., Sect. Comp. 35 217-222, 2011.
  2. Molnár, L., Molnár, L.: Kolmogorov-Smirnov isometries and affine automorphisms of spaces of distribution functions.
    Cent. Eur. J. Math. 9 (4), 789-796, 2011.
  3. Molnár, L.: Lévy isometries of the space of probability distribution functions.
    J. Math. Anal. Appl. 380 (2), 847-852, 2011.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  4. Molnár, L.: Maps preserving general means of positive operators.
    Electron. J. Linear Algebra. 22 864-874, 2011.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
  5. Molnár, L.: Order automorphisms on positive definite operators and a few applications.
    Linear Alg. Appl. 434 (10), 2158-2169, 2011.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q2 Numerical Analysis
  6. Molnár, L., Timmermann, W.: Transformations on Bounded Observables Preserving Measure of Compatibility.
    Int. J. Theor. Phys. 50 (12), 3857-3863, 2011.
    Folyóirat-mutatók:
    Q3 Mathematics (miscellaneous)
    Q3 Physics and Astronomy (miscellaneous)
2010
  1. Molnár, L.: Linear maps on observables in von Neumann algebras preserving the maximal deviation.
    J. Lond. Math. Soc.-Second Ser. 81 (1), 161-174, 2010.
    Folyóirat-mutatók:
    D1 Mathematics (miscellaneous)
  2. Molnár, L., Szokol, P.: Maps on states preserving the relative entropy II.
    Linear Alg. Appl. 432 (12), 3343-3350, 2010.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q2 Numerical Analysis
  3. Molnár, L., Nagy, G.: Thompson isometries on positive operators: the 2-dimensional case.
    Electron. J. Linear Algebra. 20 79-89, 2010.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
2009
  1. Molnár, L., Timmermann, W.: A metric on the space of projections admitting nice isometries.
    Studia Math. 191 (3), 271-281, 2009.
  2. Molnár, L.: Linear maps on matrices preserving commutativity up to a factor.
    Linear and Multilinear Algebra. 57 (1), 13-18, 2009.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
  3. Molnár, L.: Maps on positive operators preserving Lebesgue decompositions.
    Electron. J. Linear Algebra. 18 222-232, 2009.
    Folyóirat-mutatók:
    Q1 Algebra and Number Theory
  4. Molnár, L., Timmermann, W.: Maps on quantum states preserving the Jensen-Shannon divergence.
    J. Phys. A. Math. Theor. 42 (1), 015301, 9, 2009.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q1 Modeling and Simulation
    Q2 Physics and Astronomy (miscellaneous)
    Q2 Statistical and Nonlinear Physics
    Q2 Statistics and Probability
  5. Molnár, L.: Maps preserving the geometric mean of positive operators.
    Proc. Amer. Math. Soc. 137 (5), 1763-1770, 2009.
    Folyóirat-mutatók:
    Q2 Applied Mathematics
    Q1 Mathematics (miscellaneous)
  6. Molnár, L.: Maps preserving the harmonic mean or the parallel sum of positive operators.
    Linear Alg. Appl. 430 (11-12), 3058-3065, 2009.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q2 Geometry and Topology
    Q3 Numerical Analysis
  7. Molnár, L.: Thompson isometries of the space of invertible positive operators.
    Proc. Amer. Math. Soc. 137 (11), 3849-3859, 2009.
    Folyóirat-mutatók:
    Q2 Applied Mathematics
    Q1 Mathematics (miscellaneous)
2008
  1. Dolinar, G., Molnár, L.: Isometries of the space of distribution functions with respect to the Kolmogorov-Smirnov metric.
    J. Math. Anal. Appl. 348 (1), 494-498, 2008.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  2. Molnár, L.: Isometries of the spaces of bounded frame functions.
    J. Math. Anal. Appl. 338 (1), 710-715, 2008.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  3. Molnár, L.: Maps on states preserving the relative entropy.
    J. math. phys. 49 (3), 1-4, 2008.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q3 Statistical and Nonlinear Physics
  4. Molnár, L.: Maps on the n-dimensional subspaces of a Hilbert space preserving principal angles.
    Proc. Amer. Math. Soc. 136 (9), 3205-3209, 2008.
    Folyóirat-mutatók:
    Q1 Applied Mathematics
    Q1 Mathematics (miscellaneous)
2007
  1. Molnár, L., Šemrl, P.: Elementary operators on self-adjoint operators.
    J. Math. Anal. Appl. 327 (1), 302-309, 2007.
    Folyóirat-mutatók:
    Q1 Analysis
    Q1 Applied Mathematics
  2. Dolinar, G., Molnár, L.: Maps on quantum observables preserving the Gudder order.
    Rep. math. phys. 60 (1), 159-166, 2007.
    Folyóirat-mutatók:
    Q3 Mathematical Physics
    Q3 Statistical and Nonlinear Physics
  3. Molnár, L., Timmermann, W.: Mixture preserving maps on von Neumann algebra effects.
    Lett. math. phys. 79 295-302, 2007.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q3 Statistical and Nonlinear Physics
  4. Molnár, L.: Selected preserver problems on algebraic structures of linear operators and on function spaces.
    Springer-Verlag, Berlin, 232 p., 2007. ISBN: 9783540399445
  5. Molnár, L., Šemrl, P.: Spectral order automorphisms of the spaces of Hilbert space effects and observables.
    Lett. math. phys. 80 239-255, 2007.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q3 Statistical and Nonlinear Physics
2006
  1. Molnár, L.: A remark to the Kochen-Specker theorem and some characterizations of the determinant on sets of Hermitian matrices.
    Proc. Amer. Math. Soc. 134 (10), 2839-2848, 2006.
    Folyóirat-mutatók:
    Q1 Applied Mathematics
    Q1 Mathematics (miscellaneous)
  2. Molnár, L.: Multiplicative Jordan triple isomorphisms on the self-adjoint elements of von Neumann algebras.
    Linear Alg. Appl. 419 (2-3), 586-600, 2006.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q3 Geometry and Topology
    Q3 Numerical Analysis
  3. Molnár, L.: Non-linear Jordan triple automorphisms of sets of self-adjoint matrices and operators.
    Studia Math. 173 (1), 39-48, 2006.
    Folyóirat-mutatók:
    Q1 Mathematics (miscellaneous)
  4. Molnár, L., Timmermann, W.: Transformations on the sets of states and density operators.
    Linear Alg. Appl. 418 (1), 75-84, 2006.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q3 Geometry and Topology
    Q3 Numerical Analysis
2005
  1. Molnár, L., Šemrl, P.: Nonlinear commutativity preserving maps on self-adjoint operators.
    Q. J. Math. 56 (4), 589-595, 2005.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
2003
  1. Molnár, L., Barczy, M.: Linear maps on the space of all bounded observables preserving maximal deviation.
    J. Funct. Anal. 205 (2), 380-400, 2003.
    Folyóirat-mutatók:
    D1 Analysis
  2. Molnár, L.: Sequential isomorphisms between the sets of von Neumann algebra effects.
    Acta Sci. Math. 69 (3-4), 755-772, 2003.
2002
  1. Molnár, L.: 2-local isometries of some operator algebras.
    Proc. Edinb. Math. Soc. 45 (2), 349-352, 2002.
  2. Molnár, L.: Conditionally multiplicative maps on the set of all bounded observables preserving compatibility.
    Linear Alg. Appl. 349 (1-3), 197-201, 2002.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q3 Discrete Mathematics and Combinatorics
    Q3 Geometry and Topology
    Q3 Numerical Analysis
  3. Šemrl, P., Molnár, L.: Elementary operators on standard operator algebras.
    Linear Multilinear Algebra. 50 (4), 315-319, 2002.
    Folyóirat-mutatók:
    Q3 Algebra and Number Theory
  4. Molnár, L.: Jordan Maps on Standard Operator Algebras.
    In: Functional Equations : Results and Advances. Ed.: Zoltán Daróczy, Zsolt Páles, Springer, Boston, 305-320, 2002, (Advances in Mathematics ; 3.) ISBN: 9781441952103
  5. Molnár, L.: On certain automorphisms of sets of partial isometries.
    Arch. Math. 78 (1), 43-50, 2002.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
  6. Molnár, L.: Orthogonality preserving transformations on indefinite inner product spaces: Generalization of Uhlhorn's version of Wigner's theorem.
    J. Funct. Anal. 194 (2), 248-262, 2002.
    Folyóirat-mutatók:
    Q1 Analysis
  7. Sánchez, F., Molnár, L.: Reflexivity of the isometry group of some classical spaces.
    Rev. Mat. Iberoam. 18 (2), 409-430, 2002.
    Folyóirat-mutatók:
    Q1 Mathematics (miscellaneous)
  8. Molnár, L.: Some characterizations of the automorphisms of B(H) and C(X).
    Proc. Amer. Math. Soc. 130 (1), 111-120, 2002.
2001
  1. Molnár, L., Páles, Z.: [ortho]-order automorphisms of Hilbert space effect algebras: the two-dimensional case.
    J. math. phys. 42 (4), 1907-1912, 2001.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q2 Statistical and Nonlinear Physics
  2. Molnár, L.: Characterizations of the Automorphisms of Hilbert Space Effect Algebras.
    Commun. Math. Phys. 223 (2), 437-450, 2001.
    Folyóirat-mutatók:
    D1 Mathematical Physics
    Q1 Statistical and Nonlinear Physics
  3. Molnár, L.: Transformations on the Set of All n-Dimensional Subspaces of a Hilbert Space Preserving Principal Angles.
    Commun. Math. Phys. 217 (2), 409-421, 2001.
    Folyóirat-mutatók:
    D1 Mathematical Physics
    Q1 Statistical and Nonlinear Physics
2000
  1. Molnár, L.: Automatic surjectivity of ring homomorphisms on H*-algebras and algebraic differences among some group algebras of compact groups.
    Proc. Amer. Math. Soc. 128 (1), 125-134, 2000.
    Folyóirat-mutatók:
    Q2 Applied Mathematics
    Q2 Mathematics (miscellaneous)
  2. Bresar, M., Molnár, L., Šemrl, P.: Elementary operators II.
    Acta Sci. Math. 66 (3-4), 769-791, 2000.
  3. Molnár, L.: Generalization of Wigner's Unitary-Antiunitary Theorem for Indefinite Inner Product Spaces.
    Commun. Math. Phys. 210 (3), 785-791, 2000.
    Folyóirat-mutatók:
    D1 Mathematical Physics
    D1 Statistical and Nonlinear Physics
  4. Molnár, L., Šemrl, P.: Local automorphisms of the unitary group and the general linear group on a Hilbert space.
    Expo. Math. 18 231-238, 2000.
  5. Molnár, L.: On isomorphisms of standard operator algebras.
    Studia Math. 142 (3), 295-302, 2000.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
  6. Molnár, L., Zalar, B.: On local automorphisms of group algebras of compact groups.
    Proc. Amer. Math. Soc. 128 (1), 93-99, 2000.
    Folyóirat-mutatók:
    Q2 Applied Mathematics
    Q2 Mathematics (miscellaneous)
  7. Molnár, L.: On some automorphisms of the set of effects on Hilbert space.
    Lett. Math. Phys. 51 (1), 37-45, 2000.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q2 Statistical and Nonlinear Physics
  8. Molnár, L.: Reflexivity of the automorphism and isometry groups of C*-algebras in BDF theory.
    Arch. Math. 74 (2), 120-128, 2000.
    Folyóirat-mutatók:
    Q2 Mathematics (miscellaneous)
  9. Molnár, L.: Wigner-type theorem on symmetry transformations in type II factors.
    Int. J. Theor. Phys. 39 (6), 1463-1466, 2000.
    Folyóirat-mutatók:
    Q3 Mathematics (miscellaneous)
    Q3 Physics and Astronomy (miscellaneous)
1999
  1. Molnár, L.: A generalization of Wigner's unitary-antiunitary theorem to Hilbert modules.
    J. Math. Phys. 40 (11), 5544-5554, 1999.
    Folyóirat-mutatók:
    Q2 Mathematical Physics
    Q2 Statistical and Nonlinear Physics
  2. Molnár, L.: Multiplicative maps on ideals of operations which are local automorphisms.
    Acta Sci. Math. (Szeged). 651999.
  3. Molnár, L., Zalar, B.: Reflexivity of the group of surjective isometries on some Banach spaces.
    P. Edinburgh Mat. Soc. Ser. 2. 42 (1), 17-36, 1999.
    Folyóirat-mutatók:
    Q3 Mathematics (miscellaneous)
  4. Molnár, L.: Some linear preserver problems on B(H) concerning rank and corank.
    Linear Alg. Appl. 286 (1-3), 311-321, 1999.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q3 Geometry and Topology
    Q2 Numerical Analysis
  5. Molnár, L.: Some multiplicative preservers on B(H).
    Linear Alg. Appl. 301 (1-3), 1-13, 1999.
    Folyóirat-mutatók:
    Q2 Algebra and Number Theory
    Q2 Discrete Mathematics and Combinatorics
    Q3 Geometry and Topology
    Q2 Numerical Analysis
1998
  1. Molnár, L.: A proper standard C*-algebra whose automorphism and isometry groups are topologically reflexive.
    Publ. Math. Debr. 52 (3-4), 563-574, 1998.
  2. Molnár, L.: Characterization of additive *-homomorphisms and Jordan *-homomorphisms on operator ideals.
    Aequ. Math. 55 (3), 259-272, 1998.
  3. Győry, M., Molnár, L.: Diameter preserving linear bijections of C(X).
    Arch. Math. 71 (4), 301-310, 1998.
  4. Győry, M., Molnár, L., Šemrl, P.: Linear rank and corank preserving maps on B(H) and an application to *-semigroup isomorphisms of operator ideals.
    Linear Alg. Appl. 280 (2-3), 253-266, 1998.
  5. Molnár, L., Győry, M.: Reflexivity of the automorphism and isometry groups of the suspension of B(H).
    J. Funct. Anal. 159 (2), 568-586, 1998.
  6. Molnár, L.: Stability of the surjectivity of endomorphisms and isometries of B(H).
    Proc. Amer. Math. Soc. 126 (3), 853-861, 1998.
  7. Molnár, L.: The automorphism and isometry groups of l[infinity](N, B(H)) are topologically reflexive.
    Acta Sci. Math. 64 (3-4), 671-680, 1998.
1997
  1. Molnár, L.: Jordan *-derivation pairs on a complex *-algebra.
    Aequ. Math. 54 (1-2), 44-55, 1997.
  2. Molnár, L., Šemrl, P.: Local Jordan *-derivations of standard operator algebras.
  3. Molnár, L., Šemrl, P.: Order isomorphisms and triple isomorphisms of operator ideals and their reflexivity.
    Arch. Math. 69 (6), 497-506, 1997.
  4. Molnár, L.: The set of automorphisms of B(H) is topologically reflexive in B(B(H)).
  5. Molnár, L., Zalar, B.: Three-variables *-identities and homomorphisms of Schatten classes.
1996
  1. Molnár, L.: A condition for a subspace of B(H) to be an ideal.
    Linear Alg. Appl. 235 229-234, 1996.
  2. Molnár, L.: Algebraic difference between p-classes of an H*-algebra.
  3. Molnár, L.: Bijectivity of *-endomorphisms of B(H) and the unilateral shift.
    Monatsh. Math. 122 (4), 1996.
  4. Molnár, L.: Locally inner derivations of standard operator algebras.
    Math. Bohem. 121 1-7, 1996.
  5. Molnár, L.: On rings of differentiable functions.
    Grazer math. Ber. 327 13-16, 1996.
  6. Batty, C., Molnár, L.: On topological reflexivity of the groups of *-automorphisms and surjective isometrics of B(H).
    Arch. Math. 67 (5), 415-421, 1996.
  7. Molnár, L.: The range of a Jordan *-derivation.
    Math. Jpn. 44 (2), 353-356, 1996.
  8. Molnár, L.: The range of a Jordan *-derivation on an H*-algebra.
  9. Molnár, L.: The range of a ring homonorphism from a commutative C*-algebra.
  10. Molnár, L.: Two characterications of additive *-automorphisms of B(H).
    Bulletin. Australian Mathematical Society 53 391-400, 1996.
  11. Molnár, L.: Wigner's unitary-antiunitary theorem via Herstein's theorem on Jordan homomorphisms.
1995
  1. Molnár, L.: Conditions for a function to be a centralizer on an H*-algebra.
  2. Molnár, L.: On centralizers of an H*-algebra.
1994
  1. Molnár, L.: On the range of a normal Jordan *-derivation, Comment.
    Comment. math. Univ. Carolinae. 35 691-695, 1994.
1993
  1. Molnár, L.: A condition for a function to be a bounded linear operator.
    Indian j. math. 35 1-4, 1993.
  2. Molnár, L.: On A-linear operators on a Hilbert A-module.
    Period. Math. Hung. 26 (3), 219-222, 1993.
  3. Molnár, L.: On Saworotnow's Hilbert A-modules.
    Glas. Mat. 28 (2), 259-267, 1993.
  4. Molnár, L.: p-classes of an H·-algebra and their representations.
    Acta scientiarum mathematicarum 58 411-423, 1993.
  5. Molnár, L.: Reproducing kernel Hilbert A-modules.
    Glas. Mat. 25 (2), 335-345, 1993.
1990
  1. Molnár, L., Yuichiro, K.: A remark on HS operator valued c.a.g.o.s. measures.
  2. Molnár, L.: Two applications of the theory of weakly stationary stochastic processes to harmonic analysis.
    Glas. Mat. 25 (1), 209-219, 1990.
1989
  1. Molnár, L.: HS operátor értékű c.a.g.o.s. mértékek és reprodukáló magú Hilbert A-modulusok.
    Nyiregyháza,, 1989.
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