We provide several new results on quantum state space, on lattice of subspaces of an infinite dimensional Hilbert space, and on infinite dimensional Hilbert space equations as well as on connections between them. In particular we obtain an $n$-variable generalized orthoarguesian equation which holds in any infinite dimensional Hilbert space. Then we strengthen Godowski's result by showing that in an ortholattice on which strong states are defined Godowski's equations as well as the orthomodularity hold. We also prove that all 6- and 4-variable orthoarguesian equations presented in the literature can be reduced to new 4- and 3-variable ones, respectively and that Mayet's examples follow from Godowski's equations. To make a breakthrough in te...
In this paper we adopt an operational approach to quantum mechanics in which a physical entity is de...
AbstractThe (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Qu...
We show that Hilbert spaces should not be considered the ``correct'' spaces to represent quantum sta...
We provide several new results on quantum state space, on the lattice of subspaces of an infinite-di...
Several new results in the field of Hilbert lattice equations based on states defined on the lattice...
A few recent innovations of the applicability of standard textbook Quantum Theory are reviewed. The ...
Beginning with Birkhoff and von Neumann [4], a central theme in quantum logic is to consider general...
We consider the manifold of all quantum many-body states that can be generated by arbitrary time-dep...
Field theories place one or more degrees of freedom at every point in space. Hilbert spaces describi...
We present a generalization of quantum error correction to infinite-dimensional Hilbert spaces. We f...
Quantum theory’s Hilbert space apparatus in its finite-dimensional version is nearly reconstructed ...
A set of statements about the properties of a quantum system is looked at as at a partially ordered ...
summary:In the logico-algebraic foundation of quantum mechanics one often deals with the orthomodula...
The (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Quantum lo...
Using a graph approach to quantum systems, we prove that descriptions of 3-dim Kochen-Specker (KS) ...
In this paper we adopt an operational approach to quantum mechanics in which a physical entity is de...
AbstractThe (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Qu...
We show that Hilbert spaces should not be considered the ``correct'' spaces to represent quantum sta...
We provide several new results on quantum state space, on the lattice of subspaces of an infinite-di...
Several new results in the field of Hilbert lattice equations based on states defined on the lattice...
A few recent innovations of the applicability of standard textbook Quantum Theory are reviewed. The ...
Beginning with Birkhoff and von Neumann [4], a central theme in quantum logic is to consider general...
We consider the manifold of all quantum many-body states that can be generated by arbitrary time-dep...
Field theories place one or more degrees of freedom at every point in space. Hilbert spaces describi...
We present a generalization of quantum error correction to infinite-dimensional Hilbert spaces. We f...
Quantum theory’s Hilbert space apparatus in its finite-dimensional version is nearly reconstructed ...
A set of statements about the properties of a quantum system is looked at as at a partially ordered ...
summary:In the logico-algebraic foundation of quantum mechanics one often deals with the orthomodula...
The (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Quantum lo...
Using a graph approach to quantum systems, we prove that descriptions of 3-dim Kochen-Specker (KS) ...
In this paper we adopt an operational approach to quantum mechanics in which a physical entity is de...
AbstractThe (meta)logic underlying classical theory of computation is Boolean (two-valued) logic. Qu...
We show that Hilbert spaces should not be considered the ``correct'' spaces to represent quantum sta...