Latest revision as of 11:32, 22 May 2026

← Back to Wavefunctions and modes Book I

Eigenstates and eigenvalues quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. Quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. In quantum mechanics, observables are represented by operators acting on wavefunctions. This equation means that applying the operator does not change the form of the state, only its magnitude. Eigenstates correspond to states with definite measurement outcomes:

@@ Line 1: / Line 1: @@
 {{Short description|Quantum Collection topic on Quantum Eigenstates and eigenvalues}}
 {{Quantum book backlink|Wavefunctions and modes}}
+{{Quantum article nav|previous=Physics:Quantum Superposition principle|previous label=Superposition principle|next=Physics:Quantum Boundary conditions and quantization|next label=Boundary conditions and quantization}}
 <div style="display:flex; gap:24px; align-items:flex-start; max-width:1200px;">
@@ Line 10: / Line 9: @@
 <div style="flex:1; line-height:1.45; color:#006b45; column-count:2; column-gap:32px; column-rule:1px solid #b8d8c8;">
-'''Eigenstates and eigenvalues''' is a Book I topic in the Quantum Collection. Quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. Quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. In quantum mechanics, observables are represented by operators acting on wavefunctions. An eigenstate \psi satisfies: This equation means that applying the operator does not change the form of the state, only its magnitude. Eigenstates correspond to states with definite measurement outcomes: * Measuring observable A in eigenstate \psi yields a with certainty * After measurement, the system remains in that eigenstate * General states can be expressed as superpositions of eigenstates This is a central postulate of quantum mechanics.
+'''Eigenstates and eigenvalues''' quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. Quantum eigenstates and eigenvalues describe the states of a quantum system that yield definite results when a physical observable is measured. Each observable is represented by an operator, whose eigenvalues correspond to measurable quantities. In quantum mechanics, observables are represented by operators acting on wavefunctions. This equation means that applying the operator does not change the form of the state, only its magnitude. Eigenstates correspond to states with definite measurement outcomes:
 </div>

Physics:Quantum Eigenstates and eigenvalues: Difference between revisions

Latest revision as of 11:32, 22 May 2026

Mathematical formulation

Physical interpretation

Energy eigenstates

Orthogonality and completeness

Applications

See also

Table of contents (217 articles)

Index

Full contents

References

Navigation menu

Search