Publikacje i konferencje

J. Tosiek, L. Campobasso, The continuity equation in the phase space quantum mechanics, Ann. Phys-new. York. 460, 169564, 2024

M. Dobrski, M. Przanowski, J. Tosiek, F. J. Turrubiates, Construction of a photon position operator with commuting components from natural axioms, Phys. Rev. A 107(4), 042208, 2023

M. Dobrski, M. Przanowski, J. Tosiek, F. J. Turrubiates, Geometrical interpretation of the photon position operator with commuting components, Phys. Rev. A 104(4), 042206, 2021

J. Tosiek, M. Przanowski, The Phase Space Model of Nonrelativistic Quantum Mechanics, Entropy-switz. 23(5), 581, 2021

M. Przanowski, J. Tosiek, F. J. Turrubiates, The Weyl – Wigner – Moyal Formalism on a Discrete Phase Space. II. The Photon Wigner Function, Fortschr. Physik 69(1), 2000061, 2020

M. Przanowski, J. Tosiek, F. J. Turrubiates, The Weyl‐Wigner‐Moyal Formalism on a Discrete Phase Space. I. A Wigner Function for a Nonrelativistic Particle with Spin, Fortschr. Physik 67(12), 1900080, 2019

J. Tosiek, M. Dobrski, Formal series of generalized functions and their application to deformation quantization, J. Math. Phys. 60(10), 102106, 2019

M. Przanowski, J. Tosiek, From the discrete Weyl–Wigner formalism for symmetric ordering to a number–phase Wigner function, J. Math. Phys. 58(10), 102106, 2017

M. Przanowski, H. Garcia-Compean, J. Tosiek, F. J. Turrubiates, Uncertainty relations in quantum optics. Is the photon intelligent?, Ann. Phys-new. York. 373, 123-144, 2016

J. Tosiek, R. Cordero, F. J. Turrubiates, The Wentzel–Kramers–Brillouin approximation method applied to the Wigner function, J. Math. Phys. 57(6), 062103, 2016

M. Przanowski, H. Garcia-Compean, J. Tosiek, F. J. Turrubiates, Uncertainty relations in quantum optics. Is the photon intelligent?, Ann. Phys-new. York. 373, 123 - 144, 2016

M. Przanowski, P. Brzykcy, J. Tosiek, Corrigendum to “From the Weyl quantization of a particle on the circle to number–phase Wigner functions” [Ann. Physics 351 (2014) 919–934], Ann. Phys-new. York. 363, 559-560, 2015

M. Przanowski, P. Brzykcy, J. Tosiek, From the Weyl quantization of a particle on the circle to number–phase Wigner functions, Ann. Phys-new. York. 351, 919-934, 2014

J. Tosiek, The eigenvalue equation for a 1-D Hamilton function in deformation quantization, Phys. Lett. A 376(28-29), 2023-2031, 2012

J. Tosiek, P. Brzykcy, States in the Hilbert space formulation and in the phase space formulation of quantum mechanics, Ann. Phys-new. York. 332, 1-15, 2012

J. Tosiek, The eigenvalue equation for a 1-D Hamilton function in deformation quantization, Phys. Lett. A 376(28-29), 2023-2031, 2012

M. Przanowski, J. Tosiek, Notes on thermodynamics in special relativity, Phys. Scr. 84(5), 055008, 2011

J. Tosiek, Compatible symplectic connections on a cotangent bundle and the Fedosov quantization, J. Math. Phys. 52(2), 022107, 2011

M. Przanowski, J. Tosiek, Notes on thermodynamics in special relativity, Phys. Scr. 84, 055008 (11 stron), 2011

J. Tosiek, Compatible symplectic connections on a cotangent bundle and the Fedosov quantization, J. Math. Phys., 2011

J. Tosiek, The Fedosov ∗-product in Mathematica, Comput. Phys. Commun. 181(3), 704, 2010

J. Tosiek, The Fedosov ∗-product in Mathematica, Comput. Phys. Commun. 181(3), 704, 2010

J. Tosiek, The Fedosov ∗-product in Mathematica, Comput. Phys. Commun. 179(12), 924-930, 2008

J. Tosiek, The Fedosov deformation quantization with the induced symplectic connection, Journal of Physics: Conference Series 128, 012024, 2008

J. Tosiek, Abelian Connection in Fedosov Deformation Quantization, Journal of Geometry and Symmetry in Physics 10, 93–102, 2007

J. Tosiek, Abelian connection in Fedosov deformation quantization. I. The 2-dimensional phase space., Acta Physica Polonica, Series B. 38 No. 10, 3069-3086, 2007

J. Negro, M. A. d. Olmo, J. Tosiek, Anyons, group theory and planar physics, J. Math. Phys. 47(3), 033508, 2006

J. Negro, O. M. del, J. Tosiek, Anyons, group theory and planar physics., J. Math. Phys. 47, 0335081-19, 2006

M. Gadella, M. A. d. Olmo, J. Tosiek, Geometrical origin of the -product in the Fedosov formalism, J. Geom. Phys. 55(3), 316-352, 2005

J. Tosiek, The Weyl bundle as a differentiable manifold, J. Phys. A - Math. Gen. 38(23), 5193-5216, 2005

M. Gadella, O. M. del, J. Tosiek, Geometrical origin of the *-product in the Fedosov formalism., J. Geom. Phys. 55, 316-352, 2005

J. Tosiek, The Weyl bundle as a differentiable manifold., J. Phys. A - Math. Gen. 38, 5193-5216, 2005

M. Gadella, M. A. d. Olmo, J. Tosiek, Quantization on a two-dimensional phase space with a constant curvature tensor, Ann. Phys-new. York. 307(2), 272-307, 2003

J. A. G. lez, M. A. d. Olmo, J. Tosiek, Quantum mechanics on the cylinder, str. S306-S315, Czerwiec 2003