Quantum field theory marries the ideas of other quantum ... Paul Dirac started the ball rolling in the late 1920s with his equation describing how relativistic electrons – and with it most ...

Quantum Field Theory (QFT) is a fundamental framework ... Schwarzschild Black Hole: A solution to the Einstein field equations that describes the gravitational field outside a spherical mass ...

A type of scalar field described by the Klein-Gordon equation, which is fundamental in quantum field theory. Boundary Conditions: Constraints applied to a field at the boundaries of its domain ...

This equation mathematically proved that the Einstein Field Equation related to the theory of relativity is equal to the ...

We were pushing our equations to arbitrarily short distances ... So this is the subject of normalization in quantum field theory and that was a breakthrough that allowed us get things like ...

Quantum physics is a very diverse field: it describes ... almost impossible to derive these equations. "The so-called Hamilton operator is crucial in quantum theory," says Ott.

When quantum electrodynamics, the quantum field theory of electrons and photons ... and Dirac's relativistic Schrödinger equation (naturally called the Dirac equation) did not have such a ...

Modern mathematical physics was born from the attempts to gain mathematical understanding of quantum field theory and statistical ... including turbulence and stochastic differential equations, ...