Rahul Bhadani
@rahulbhadani.bsky.social
Assistant Professor, The University of Alabama in Huntsville.
Electrical and Computer Engineering.
PhD, UArizona
#AcademicSky #UAHuntsville
#UArizona
🚙🧬📡🎓🐾 🐾
Electrical and Computer Engineering.
PhD, UArizona
#AcademicSky #UAHuntsville
#UArizona
🚙🧬📡🎓🐾 🐾
arxiv.org
December 17, 2024 at 8:03 PM
5/5
Von Neumann projections connect to quantum logic, a generalization of classical logic in quantum mechanics. Projections represent propositions about physical systems, playing a role in #quantumcomputing, #quantuminformationscience, and #quantum#communication.
#qis #quantumlogic #logic #quantum
Von Neumann projections connect to quantum logic, a generalization of classical logic in quantum mechanics. Projections represent propositions about physical systems, playing a role in #quantumcomputing, #quantuminformationscience, and #quantum#communication.
#qis #quantumlogic #logic #quantum
December 13, 2024 at 9:46 PM
5/5
Von Neumann projections connect to quantum logic, a generalization of classical logic in quantum mechanics. Projections represent propositions about physical systems, playing a role in #quantumcomputing, #quantuminformationscience, and #quantum#communication.
#qis #quantumlogic #logic #quantum
Von Neumann projections connect to quantum logic, a generalization of classical logic in quantum mechanics. Projections represent propositions about physical systems, playing a role in #quantumcomputing, #quantuminformationscience, and #quantum#communication.
#qis #quantumlogic #logic #quantum
4/5
Murray and von Neumann introduced a theory of #equivalence for projections. Two projections are equivalent if a partial isometry maps one’s range to the other. This equivalence is foundational for the classification of von Neumann algebras.
Murray and von Neumann introduced a theory of #equivalence for projections. Two projections are equivalent if a partial isometry maps one’s range to the other. This equivalence is foundational for the classification of von Neumann algebras.
December 13, 2024 at 9:45 PM
4/5
Murray and von Neumann introduced a theory of #equivalence for projections. Two projections are equivalent if a partial isometry maps one’s range to the other. This equivalence is foundational for the classification of von Neumann algebras.
Murray and von Neumann introduced a theory of #equivalence for projections. Two projections are equivalent if a partial isometry maps one’s range to the other. This equivalence is foundational for the classification of von Neumann algebras.
3/5
Von Neumann algebras are generated by their projections, meaning any element can be approximated by linear combinations of projections. This is analogous to how simple
#functions
are dense in L∞ spaces in classical #measuretheory.
Von Neumann algebras are generated by their projections, meaning any element can be approximated by linear combinations of projections. This is analogous to how simple
#functions
are dense in L∞ spaces in classical #measuretheory.
December 13, 2024 at 9:45 PM
3/5
Von Neumann algebras are generated by their projections, meaning any element can be approximated by linear combinations of projections. This is analogous to how simple
#functions
are dense in L∞ spaces in classical #measuretheory.
Von Neumann algebras are generated by their projections, meaning any element can be approximated by linear combinations of projections. This is analogous to how simple
#functions
are dense in L∞ spaces in classical #measuretheory.
2/5
In a von Neumann algebra, a projection E satisfies two properties:
#Self-adjoint (E = E*).
#Idempotent (E = E²).
Geometrically, projections map vectors onto closed #subspaces of a #Hilbert space, with the subspace being the "range" of E.
In a von Neumann algebra, a projection E satisfies two properties:
#Self-adjoint (E = E*).
#Idempotent (E = E²).
Geometrically, projections map vectors onto closed #subspaces of a #Hilbert space, with the subspace being the "range" of E.
December 13, 2024 at 9:44 PM
2/5
In a von Neumann algebra, a projection E satisfies two properties:
#Self-adjoint (E = E*).
#Idempotent (E = E²).
Geometrically, projections map vectors onto closed #subspaces of a #Hilbert space, with the subspace being the "range" of E.
In a von Neumann algebra, a projection E satisfies two properties:
#Self-adjoint (E = E*).
#Idempotent (E = E²).
Geometrically, projections map vectors onto closed #subspaces of a #Hilbert space, with the subspace being the "range" of E.