Gauge Integral Structures for Stochastic Calculus and Quantum Electrodynamics. Patrick Muldowney

      1  Cover

      2  Title Page

      3  Copyright

      4  Preface

      5  Reading this BooknotesSet Note

      6  Introduction Notes

      7  Part I: Stochastic Calculus Chapter 1: Stochastic Integration Notes Chapter 2: Random Variation 2.1 What is Random Variation? 2.2 Probability and Riemann Sums 2.3 A Basic Stochastic Integral 2.4 Choosing a Sample Space 2.5 More on Basic Stochastic Integral Notes Chapter 3: Integration and Probability 3.1 ‐Complete Integration 3.2 Burkill‐complete Stochastic Integral 3.3 The Henstock Integral 3.4 Riemann Approach to Random Variation 3.5 Riemann Approach to Stochastic Integrals Notes Chapter 4: Stochastic Processes 4.1 From

to

6.5 Introduction to

      8  Part II: Field Theory Chapter 7: Gauges for Product Spaces 7.1 Introduction 7.2 Three‐dimensional Brownian Motion 7.3 A Structured Cartesian Product Space 7.4 Gauges for Product Spaces 7.5 Gauges for Infinite‐dimensional Spaces 7.6 Higher‐dimensional Brownian Motion 7.7 Infinite Products of Infinite Products Notes Chapter 8: Quantum Field Theory 8.1 Overview of Feynman Integrals 8.2 Path Integral for Particle Motion 8.3 Action Waves 8.4 Interpretation of Action Waves 8.5 Calculus of Variations 8.6 Integration Issues 8.7 Numerical Estimate of Path Integral 8.8