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Title: | SPECTRAL THEORY OF OPERATORS AND TS APPLICATIONS |
Authors: | SAREEN, RUCHITA DHULL, SUMIT |
Keywords: | SPECTRAL THEORY OPERATORS SPARTIAL DIFFERENTIAL EQUATION (PDE) |
Issue Date: | Jun-2024 |
Series/Report no.: | TD-7120; |
Abstract: | A key idea in both mathematics and physics, spectral theory investigates the characteristics of self-adjoint operators and the eigenvalues and eigenfunctions that go along with them. There are several uses for this theory in partial differential equation (PDE) solving as well as quantum problems. A self-adjoint operators represent observables like momentum and energy, which are crucial for understanding the behavior of quantum systems and the results of measurements. They are crucial for solving the Schrödinger equations, as they reveal the energy sataes of vari ous particles, such as the electrons in a hydrogen atom. However, in the field of PDEs, spectral theory makes it easier to break down complicated equations into more manageable eigenvalue issues, which leads to effective solutions. As illustrated by examples like the heat equation and Laplace’s equation in different geometries, spectral theory provides a methodical way to comprehend the behaviour of solutions to PDEs by splitting variables and using eigenfunctions and eigenvalues. All in all, spectrum theory offers a fundamental framework with a wide range of applications in mathematical physics, providing understanding of both quantum and spatial events that are represented by partial differential equations. |
URI: | http://dspace.dtu.ac.in:8080/jspui/handle/repository/20673 |
Appears in Collections: | M Sc Applied Maths |
Files in This Item:
File | Description | Size | Format | |
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RUCHITA & Sumit M.Sc..pdf | 322.01 kB | Adobe PDF | View/Open |
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