This work presents a concrete model that modifies established theory and explores how Green’s functions, regularization, and functional integrals behave under these changes.

The discussion blends mathematical structure with physical intuition. It walks through axiomatic foundations, heuristic reasoning, and the construction of a finite space-time volume to illuminate key properties while remaining grounded in the broader goals of quantum field theory.

How Euclidean Green’s functions are defined and what they reveal about the theory’s structure
How regularization is implemented and what it implies for perturbation expansions
The role of Wiener-type integrals and functional measures in this modified setting
Comparisons to standard models and the impact on the behavior of generating functionals

Ideal for readers of advanced theoretical physics and mathematical physics who want a clear, self-contained account of a modified approach to EQFT.

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