We prove general reflection positivity results for both scalar fields and Dirac fields on a Riemannian manifold, and comment on applications to quantum field theory. As another application, we prove the inequality \(C_D \leq C_N\) between Dirichlet and Neumann covariance operators on a manifold with a reflection.Mathematic
We consider a general statistical mechanics model on a product of local spaces and prove that, if th...
AbstractThe manifold of trace one positive complex n×n-matrices represents the space of faithful mix...
Crossing symmetry (CS) is the main tool in the bootstrap program applied to CFT. This consists in an...
Abstract. We prove general reflection positivity results for both scalar fields and Dirac fields on ...
Here we introduce reflection positive doubles, a general framework for reflection positivity, coveri...
The concept of reflection positivity has its origins in the work of Osterwalder–Schrader on construc...
A simple construction of Euclidean invariant and reflection positive measures on the cylindrical com...
At the heart of constructive quantum field theory lies reflection positivity. Through its use one ma...
In this note we characterize those unitary one-parameter groups (Utc)t∈R which admit euclidean reali...
In this article we specialize a construction of a reflection positive Hilbert space due to Dimock an...
We explore a framework for complex classical fields, appropriate for describing quantum field theori...
The requirement of reflection positivity (RP) for Euclidean field theories is considered. This is do...
Reflection positivity has several applications in both mathematics and physics. For example, reflect...
Reflection positivity originates from one of the Osterwalder-Schrader axioms for constructive quantu...
Rindler positivity is a property that holds in any relativistic Quantum Field Theory and implies an ...
We consider a general statistical mechanics model on a product of local spaces and prove that, if th...
AbstractThe manifold of trace one positive complex n×n-matrices represents the space of faithful mix...
Crossing symmetry (CS) is the main tool in the bootstrap program applied to CFT. This consists in an...
Abstract. We prove general reflection positivity results for both scalar fields and Dirac fields on ...
Here we introduce reflection positive doubles, a general framework for reflection positivity, coveri...
The concept of reflection positivity has its origins in the work of Osterwalder–Schrader on construc...
A simple construction of Euclidean invariant and reflection positive measures on the cylindrical com...
At the heart of constructive quantum field theory lies reflection positivity. Through its use one ma...
In this note we characterize those unitary one-parameter groups (Utc)t∈R which admit euclidean reali...
In this article we specialize a construction of a reflection positive Hilbert space due to Dimock an...
We explore a framework for complex classical fields, appropriate for describing quantum field theori...
The requirement of reflection positivity (RP) for Euclidean field theories is considered. This is do...
Reflection positivity has several applications in both mathematics and physics. For example, reflect...
Reflection positivity originates from one of the Osterwalder-Schrader axioms for constructive quantu...
Rindler positivity is a property that holds in any relativistic Quantum Field Theory and implies an ...
We consider a general statistical mechanics model on a product of local spaces and prove that, if th...
AbstractThe manifold of trace one positive complex n×n-matrices represents the space of faithful mix...
Crossing symmetry (CS) is the main tool in the bootstrap program applied to CFT. This consists in an...
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