TL;DR
This paper reviews QCD inequalities, exploring both Hamiltonian variational and Euclidean path integral methods to understand fundamental constraints in quantum chromodynamics.
Contribution
It provides a comprehensive comparison of Hamiltonian and Euclidean approaches to QCD inequalities, highlighting their theoretical foundations and implications.
Findings
Clarified the relationship between different QCD inequality methods
Demonstrated the application of inequalities in bounding hadron masses
Reviewed rigorous mathematical foundations of QCD inequalities
Abstract
We review the subject of QCD inequalities, using both a Hamiltonian variational approach, and a rigorous Euclidean path integral approach.
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