In many physical applications, bound states and/or resonances are observed, which raises the question whether these states are elementary or composite. Here we elaborate on several methods for calculating the compositeness X of bound states and resonances in Quantum Mechanics, and in Quantum Field Theory by introducing particle number operators. For resonances X is typically complex and we discuss how to get meaningful results by using certain phase transformations in the S matrix
We study the entanglement spectra of many particle systems in states which are closely related to p...
ABSTRACT The Fried-Jin derivation of the condition Z = 0 is re-examined making explicit use of the H...
We study the compositeness of near-threshold states to investigate the internal structure of exotic ...
We present an approach that allows one to obtain information on the compositeness of molecular state...
The compositeness X is defined as the probability to observe the composite structure such as the had...
In many physical applications, bound states and/or resonances are observed, which raises the questio...
Using the equal time Bethe·Salpeter amplitude, we show that the form factor of the charge distributi...
It is shown that the composite model of elementary particles proposed by Sakata can be formulated as...
Several methods for studying the nature of a resonance are applied to resonances recently discovered...
Systems containing simultaneously hadrons and their constituents are most easily described by treati...
Abstract. The Composite Operator Method (COM) is formulated, its internals illustrated in detail and...
We discuss a model-independent estimator of the likelihood of the compositeness of a shallow S-wave ...
The following result is proved: for two stable particles having the same quantum numbers, the vanish...
The Special Composition Question asks under what conditions a plurality of objects form another, com...
We obtain the exact spectrum and the unique ground state of two composite fermions (in a Rajaraman–S...
We study the entanglement spectra of many particle systems in states which are closely related to p...
ABSTRACT The Fried-Jin derivation of the condition Z = 0 is re-examined making explicit use of the H...
We study the compositeness of near-threshold states to investigate the internal structure of exotic ...
We present an approach that allows one to obtain information on the compositeness of molecular state...
The compositeness X is defined as the probability to observe the composite structure such as the had...
In many physical applications, bound states and/or resonances are observed, which raises the questio...
Using the equal time Bethe·Salpeter amplitude, we show that the form factor of the charge distributi...
It is shown that the composite model of elementary particles proposed by Sakata can be formulated as...
Several methods for studying the nature of a resonance are applied to resonances recently discovered...
Systems containing simultaneously hadrons and their constituents are most easily described by treati...
Abstract. The Composite Operator Method (COM) is formulated, its internals illustrated in detail and...
We discuss a model-independent estimator of the likelihood of the compositeness of a shallow S-wave ...
The following result is proved: for two stable particles having the same quantum numbers, the vanish...
The Special Composition Question asks under what conditions a plurality of objects form another, com...
We obtain the exact spectrum and the unique ground state of two composite fermions (in a Rajaraman–S...
We study the entanglement spectra of many particle systems in states which are closely related to p...
ABSTRACT The Fried-Jin derivation of the condition Z = 0 is re-examined making explicit use of the H...
We study the compositeness of near-threshold states to investigate the internal structure of exotic ...
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