Self-adjointness in Quantum Mechanics: a pedagogical path
- URL: http://arxiv.org/abs/2012.14490v3
- Date: Sat, 15 May 2021 10:30:42 GMT
- Title: Self-adjointness in Quantum Mechanics: a pedagogical path
- Authors: Andrea Cintio and Alessandro Michelangeli
- Abstract summary: This paper aims to make quantum observables emerge as necessarily self-adjoint, and not merely hermitian operators.
Next to the central core of our line of reasoning, the necessity of a non-trivial declaration of a domain to associate with the formal action of an observable.
- Score: 77.34726150561087
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Observables in quantum mechanics are represented by self-adjoint operators on
Hilbert space. Such ubiquitous, well-known, and very foundational fact,
however, is traditionally subtle to be explained in typical first classes in
quantum mechanics, as well as to senior physicists who have grown up with the
lesson that self-adjointness is "just technical". The usual difficulties are to
clarify the connection between the demand for certain physical features in the
theory and the corresponding mathematical requirement of self-adjointness, and
to distinguish between self-adjoint and hermitian operator not just at the
level of the mathematical definition but most importantly from the perspective
that mere hermiticity, without self-adjointness, does not ensure the desired
physical requirements and leaves the theory inconsistent. In this work we
organise an amount of standard facts on the physical role of self-adjointness
into a coherent pedagogical path aimed at making quantum observables emerge as
necessarily self-adjoint, and not merely hermitian operators. Next to the
central core of our line of reasoning -- the necessity of a non-trivial
declaration of a domain to associate with the formal action of an observable,
and the emergence of self-adjointness as a consequence of fundamental physical
requirements -- we include some complementary materials consisting of a few
instructive mathematical proofs and a short retrospective, ranging from the
past decades to the current research agenda, on the self-adjointness problem
for quantum Hamiltonians of relevance in applications.
Related papers
- Relaxation of first-class constraints and the quantization of gauge theories: from "matter without matter" to the reappearance of time in quantum gravity [72.27323884094953]
We make a conceptual overview of an approach to the initial-value problem in canonical gauge theories.
We stress how the first-class phase-space constraints may be relaxed if we interpret them as fixing the values of new degrees of freedom.
arXiv Detail & Related papers (2024-02-19T19:00:02Z) - The Measurement Problem Is a Feature, Not a Bug--Schematising the
Observer and the Concept of an Open System on an Informational, or
(Neo-)Bohrian, Approach [0.0]
I argue that quantum mechanics represents what Bohr called a natural generalisation of the ordinary causal description''
I show how the quantum generalisation of the concept of an open system may be used to assuage Einstein's complaint.
arXiv Detail & Related papers (2023-08-31T00:19:04Z) - Step-by-step derivation of the algebraic structure of quantum mechanics
(or from nondisturbing to quantum correlations by connecting incompatible
observables) [0.0]
This paper provides a step-by-step derivation of the quantum formalism.
It helps us to understand why this formalism is as it is.
arXiv Detail & Related papers (2023-03-08T19:27:24Z) - Self-adjoint extension schemes and modern applications to quantum
Hamiltonians [55.2480439325792]
monograph contains revised and enlarged materials from previous lecture notes of undergraduate and graduate courses and seminars delivered by both authors over the last years on a subject that is central both in abstract operator theory and in applications to quantum mechanics.
A number of models are discussed, which are receiving today new or renewed interest in mathematical physics, in particular from the point of view of realising certain operators of interests self-adjointly.
arXiv Detail & Related papers (2022-01-25T09:45:16Z) - Quantum realism: axiomatization and quantification [77.34726150561087]
We build an axiomatization for quantum realism -- a notion of realism compatible with quantum theory.
We explicitly construct some classes of entropic quantifiers that are shown to satisfy almost all of the proposed axioms.
arXiv Detail & Related papers (2021-10-10T18:08:42Z) - Non-equilibrium stationary states of quantum non-Hermitian lattice
models [68.8204255655161]
We show how generic non-Hermitian tight-binding lattice models can be realized in an unconditional, quantum-mechanically consistent manner.
We focus on the quantum steady states of such models for both fermionic and bosonic systems.
arXiv Detail & Related papers (2021-03-02T18:56:44Z) - Observables in Quantum Mechanics and the Importance of Self-adjointness [0.0]
We are focused on the idea that observables in quantum physics are a bit more than just hermitian operators.
The origin of this idea comes from the fact that there is a subtle difference between symmetric, hermitian, and self-adjoint operators.
arXiv Detail & Related papers (2021-03-01T15:48:19Z) - Preferred basis, decoherence and a quantum state of the Universe [77.34726150561087]
We review a number of issues in foundations of quantum theory and quantum cosmology.
These issues can be considered as a part of the scientific legacy of H.D. Zeh.
arXiv Detail & Related papers (2020-06-28T18:07:59Z) - Quantum Incompatibility of a Physical Context [0.0]
We characterize quantum incompatibility as a resource encoded in a physical context, involving both the quantum state and observables.
We derive a measurement-incompatibility quantifier that is easily computable, admits a geometrical interpretation, and is maximum only if the eigenbases of the involved observables are mutually unbiased.
arXiv Detail & Related papers (2020-04-02T14:00:39Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.