Prof. Emanuel Chetcuti

Prof. Emanuel Chetcuti

Prof. Emanuel Chetcuti

  B.Sc.(Hons)(Melit.),M.Sc.(Melit.),Ph.D.(S.A.V.)

Professor

Room 304
Maths & Physics Building
University of Malta
Msida
  +356 2340 2279
__Biography
__ResearchInterests

CHETCUTI, E. and HAMHALTER, J., 2020. The order topology on duals of C*-algebras and von Neumann algebras. Studia Mathematica, 254, pp. 219-236.

BUHAGIAR, D., CHETCUTI, E. and WEBER, H., 2018. Order topology on orthocomplemented posets of linear subspaces of a pre-Hilbert space. Annali di Matematica Pura ed Applicata (1923-), , pp. 1-18.

CHETCUTI, E., HAMHALTER, J. and WEBER, H., 2015. The order topology for a von Neumann algebra. Studia Mathematica, 230, pp. 95-120.

CHETCUTI, E. and HAMHALTER, J., 2009. Non-Commutative Vitali–hahn–saks Theorem Holds Precisely for Finite W*-Algebras. The Quarterly Journal of Mathematics, 60(1), pp. 45-51.

BUHAGIAR, D. and CHETCUTI, E., 2008. Only ‘free’measures are admissable on ???? (????) when the inner product space ???? is incomplete. Proceedings of the American Mathematical Society, 136(3), pp. 919-922.

BUHAGIAR, D., CHETCUTI, E. and WEBER, H., 2008. Orthonormal bases and quasi-splitting subspaces in pre-Hilbert spaces. Journal of mathematical analysis and applications, 345(2), pp. 725-730.

BUHAGIAR, D. and CHETCUTI, E., 2007. Quasi‐splitting subspaces in a pre‐Hilbert space. Mathematische Nachrichten, 280(5), pp. 479-484.

BUHAGIAR, D., CHETCUTI, E. and DVUREČENSKIJ, A., 2007. Algebraic and measure-theoretic properties of classes of subspaces of an inner product space. Elsevier Science BV, pp. 75-120.

CHETCUTI, E., DE LUCIA, P. and DVUREČENSKIJ, A., 2006. Sequential convergence of regular measures on prehilbert space logics. Journal of mathematical analysis and applications, 318(1), pp. 199-210.

CHETCUTI, E. and HAMHALTER, J., 2006. Vitali–Hahn–Saks Theorem for vector measures on operator algebras. Quarterly Journal of Mathematics, 57(4), pp. 479-493.

CHETCUTI, E. and DVUREČENSKIJ, A., 2005. The state-space of the lattice of orthogonally closed subspaces. Glasgow Mathematical Journal, 47(1), pp. 213-220.

CHETCUTI, E. and DVUREČENSKIJ, A., 2004. The existence of finitely additive states on orthogonally closed subspaces of incomplete inner product spaces. Letters in Mathematical Physics, 67(1), pp. 75-80.

__Other

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