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Baris 16:
* {{cite book |author=Schulman|first= Larry S. |year=1981 |title=Techniques & Applications of Path Integration |place=New York |publisher=John Wiley & Sons |isbn=0-486-44528-3}}
* {{cite book |author=Ahmad|first= Ishfaq |authorlink=Ishfaq Ahmad |title=Mathematical Integrals in Quantum Nature |series=The Nucleus |year=1971 |pages=189–209}}
* {{cite book |last=Inomata|first= Akira|last2= Kuratsuji|first2= Hiroshi|last3= Gerry|first3= Christopher |title=Path Integrals and Coherent States of SU(2) and SU(1,1) |url=https://archive.org/details/pathintegralscoh0000aino|place=Singapore |publisher=World Scientific |year=1992 |isbn=981-02-0656-9}}
* {{cite book |author1=Grosche|first= Christian |author2=Steiner|first2= Frank |lastauthoramp=yes |year=1998 |title=Handbook of Feynman Path Integrals |url=https://archive.org/details/handbookoffeynma0000gros|series=Springer Tracts in Modern Physics 145 |publisher=Springer-Verlag |isbn=3-540-57135-3}}
*{{cite book |authorlink= Wolfgang A. Tomé |last=Tomé|first=Wolfgang A. |year=1998 |title=Path Integrals on Group Manifolds |url= https://archive.org/details/pathintegralsong0000tome |place=Singapore|publisher=World Scientific |isbn=981-02-3355-8}} Discusses the definition of Path Integrals for systems whose kinematical variables are the generators of a real separable, connected Lie group with irreducible, square integrable representations.
* {{cite book |authorlink=John R. Klauder |last=Klauder|first=John R.|title=A Modern Approach to Functional Integration |place=New York |publisher=Birkhäuser |year=2010 |isbn=978-0-8176-4790-2}}
* {{cite book |author=Ryder|first= Lewis H. |title=Quantum Field Theory |url=https://archive.org/details/quantumfieldtheo0000ryde|publisher=Cambridge University Press |year=1985 |isbn=0-521-33859-X}} Highly readable textbook; introduction to relativistic QFT for particle physics.
Baris 29:
* {{cite book|first=Harald J. W.|last=Müller-Kirsten|year=2012|title=Introduction to Quantum Mechanics: Schrödinger Equation and Path Integral| edition=2nd|place=Singapore|publisher=World Scientific}}
* {{cite web |author=Etingof|first= Pavel |title=Geometry and Quantum Field Theory |publisher=MIT OpenCourseWare |year=2002 |url=http://ocw.mit.edu/courses/mathematics/18-238-geometry-and-quantum-field-theory-fall-2002/index.htm}} This course, designed for mathematicians, is a rigorous introduction to perturbative quantum field theory, using the language of functional integrals.
* {{cite book |last=Zee |first=Anthony |authorlink=Anthony Zee |title=Quantum Field Theory in a Nutshell |year=2010 |url=https://archive.org/details/isbn_9780691140346 |edition=Second |publisher=Princeton University Press |location= |isbn=978-0-691-14034-6 }} A great introduction to Path Integrals (Chapter 1) and QFT in general.
* {{cite arXiv |last=Grosche |first=Christian |title=An Introduction into the Feynman Path Integral |year=1992 |eprint=hep-th/9302097}}
* {{cite arXiv |last=MacKenzie |first=Richard |year=2000 |title=Path Integral Methods and Applications |eprint=quant-ph/0004090}}
Baris 40:
* [https://www.youtube.com/watch?v=QTjmLBzAdAA A mathematically rigorous approach to perturbative path integrals] via animation on YouTube
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