My orders
How it works
Examples
Reviews
Blog
Homework Answers
Submit
Sign in
How it works
Examples
Reviews
Homework answers
Blog
Contact us
Submit
Fill in the order form to get the price
Subject
Select Subject
Programming & Computer Science
Math
Engineering
Economics
Physics
Other
Category
Statistics and Probability
Calculus
Differential Equations
Quantitative Methods
Discrete Mathematics
Financial Math
Real Analysis
Abstract Algebra
Linear Algebra
Complex Analysis
Functional Analysis
Differential Geometry | Topology
Combinatorics | Number Theory
Analytic Geometry
Operations Research
Other
Deadline
Timezone:
Title
*
Task
*
hi , I diagonalize hamiltonian H, then I found by chance , that this basis of eigenstates is also a basis of eigenstates of another operator let's call it "O" , which means that the Hamiltonian commute with that operator , before I diagonalizing in that basis , I have H (NxN matrix ) as will as (NxN) matrix for operator "O" , when I diagonalize the matrix of operator O I found that this operator have just two eigenvalues , two eigenstates as well (no matter what N ) , when I diagonalize H I found that it have N different eigenstates where part of them match the requirement of the first eigenstate of operator "O" and other part match the requirement of the second one , I want to understand mathematically how this match happens for example why would the ground state of the Hamiltonian match the requirement of the first eigenstate of operator O , . I wish that my question was clear , I am not a mathematician
I need basic explanations
Special Requirements
Upload files (if required)
Drop files here to upload
Add files...
Account info
Already have an account?
Create an account
Name
*
E-mail
*
Password
*
The password must be at least 6 characters.
I agree with
terms & conditions
Create account & Place an order
Please fix the following input errors:
dummy