Hamiltonian Renormalization Groups

D. Schmeltzer

arXiv:cond-mat/0211449·cond-mat.str-el·May 23, 2007

Hamiltonian Renormalization Groups

D. Schmeltzer

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Open Access

TL;DR

This paper introduces a Hamiltonian renormalization group approach, emphasizing its relevance for chiral systems and demonstrating its application to a one-dimensional system, offering an alternative to the traditional Lagrangian formalism.

Contribution

It presents a Hamiltonian formulation of the renormalization group, specifically tailored for chiral systems, and applies it to a one-dimensional model.

Findings

01

Effective for chiral systems

02

Applicable to 1D systems

03

Offers an alternative to Lagrangian formalism

Abstract

A Hamiltonian renormalization group is presented. Such a formulation is relevant for chiralic systems and more appropriate than the Lagrangian formalism. An application to 1D system is presented.

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Taxonomy

TopicsMolecular spectroscopy and chirality · Quantum chaos and dynamical systems · Advanced NMR Techniques and Applications