Publications of Mihály Weiner

Publications

Last updated: 10/11/2019

Preprint / currently under peer-review:

S. Carpi, Y. Tanimoto and M. Weiner:
Unitary representations of the W₃-algebra with c≥2.
arXiv:1910.08334

S. Nietert, Zs. Szilágyi and M. Weiner:
Rigidity and a common framework for mutually unbiased bases and k-nets.
arXiv:1907.02469

Appeared or to appear in peer-reviewed international science journals:

M. Matolcsi and M. Weiner:
Character tables and the problem of existence of finite projective planes.
J. Comb. Des. 26 (2018), 540-546.

S. Carpi, Y. Kawahigashi, R. Longo and M. Weiner:
From vertex operator algebras to conformal nets and back.
Mem. Amer. Math. Soc. 254 (2018), 1213.

M. Kolountzakis, M. Matolcsi and M. Weiner:
An application of positive definite functions to the problem of MUBs.
Proc. Amer. Math. Soc. 146 (2018), 1143-1150.

V. Morinelli, Y. Tanimoto and M. Weiner:
Conformal covariance and the split property.
Commun. Math. Phys.357 (2018), 379-406.

M. Matolcsi and M. Weiner:
Finite projective planes and the Delsarte LP-bound.
Anal. Math. 44 (2018), 89-98.

T. Fülöp, T. Matolcsi and M. Weiner:
Second-order equation of motion for electromagnetic radiation back-reaction.
Modern Physics Letters A 32 (2017), 1750147.

M. Weiner:
Local equivalence of representations of Diff⁺(S¹) corresponding to different highest weights.
Commun. Math. Phys. 352 (2017), 759-772.

P. E. Frenkel and M. Weiner:
Classical information storage in an n-level quantum system.
Commun. Math. Phys. 340 (2015), 563-574.

M. Matolcsi and M. Weiner:
An improvement on the Delsarte-type LP bound with application to MUBs.
Open Syst. Inf. Dyn. 22 (2015), 1550001.

P. E. Frenkel and M. Weiner:
On vector configurations that can be realized in the cone of positive matrices.
Linear Alg. Appl. 459 (2014), 465-474.

M. Weiner:
A gap for the maximum number of mutually unbiased bases.
Proc. Amer. Math. Soc. 141 (2013), 1963-1969.

S. Carpi, R. Conti, R. Hillier and M. Weiner:
Representations of Conformal Nets, Universal C*-Algebras and K-Theory.
Commun. Math. Phys. 320 (2013), 275-300.

M. Matolcsi, I. Z. Ruzsa and M. Weiner:
Systems of mutually unbiased Hadamard matrices containing real and complex matrices.
Australas. J. Combin. 55 (2013), 35-47.

Gy. Farkas, N. Friedman, I. Hegedűs and M. Weiner:
On the snap-back behavior of a self-deploying antiprismatic column during packing.
Engineering Structures 50 (2013), 74-89.

P. Camassa, R. Longo, Y. Tanimoto and M. Weiner:
Thermal States in Conformal QFT. II
Commun. Math. Phys. 315 (2012), 771-802.

P. Camassa, R. Longo, Y. Tanimoto and M. Weiner:
Thermal States in Conformal QFT. I
Commun. Math. Phys. 309 (2012), 703-735.

M. Weiner:
An algebraic version of Haag's theorem.
Commun. Math. Phys. 305 (2011), 469-485.

M. Weiner:
On orthogonal systems of matrix algebras.
Linear Alg. Appl. 433 (2010), 520-533.

P. Jaming, M. Matolcsi, P. Móra, F. Szöllősi and M. Weiner:
A generalized Pauli problem and an infnite family of MUB-triplets in dimension 6.
J. Physics A: Mathematical and Theoretical, 42 (2009), 245305.

D. Petz, A. Szántó and M. Weiner:
Complementarity and the algebraic structure of 4-level quantum systems.
J. Infin. Dim. Anal. Quantum Probability and related Topics 12 (2009), 99-116.

M. Weiner:
Restricting Positive Energy Representations of Diff⁺(S¹) to the Stabilizer of n Points.
Commun. Math. Phys. 277 (2008), 555-571.

M. Weiner:
Conformal Covariance and Positivity of Energy in Charged Sectors.
Commun. Math. Phys. 265 (2006), 493-506.

S. Carpi and M. Weiner:
On the uniqueness of diffeomorphism symmetry in conformal field theory.
Commun. Math. Phys. 258 (2005), 203-221.

Sz. Farkas, Z. Kurucz and M. Weiner:
Poincaré covariance of relativistic quantum position.
Int. J. Theor. Phys. 41 (2002), 79-88.

S.V. Akkelin, T. Csörgő, B. Lukács, Yu.M. Sinyukov and M.Weiner:
Simple solutions of fireball hydrodynamics for selfsimilar elliptic flows.
Phys. Lett. B 505 (2001), 64-70.

Other publications (conference proceedings, etc.):

M. Weiner:
Conformal covariance and related properties of chiral QFT.
PhD Thesis in Pure Mathematics, University of Rome "Tor Vergata", 2005. arXiv:math/0703336

S. Carpi and M. Weiner:
Uniqueness of the Diff⁺(S¹) symmetry for local nets of von Neumann algebras.
In: "Advances in Operator Algebras and Mathematical Physics", pg. 43-46. Proceedings of the Conference held in Sinaia, Romania, June 2003, (Boca F. et al. eds.) Theta Series in Advanced Mathematics, Bucharest 2005.