Summary
The functional integral descriptions of a system of bosons or fermions are derived by means of a general costructive principle from the Liouville space attached to the system.
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References
R. P. Feynman andA. R. Hibbs:Quantum Mechanics and Path Integrals (New York, N.Y., 1965).
L. S. Schulman:Techniques and Applications of Path Integration (New York, N.Y., 1981).
F. A. Berezin:The Method of Second Quantization (New York, N.Y., 1966).
F. A. Berezin:Theor. Math. Phys.,6, 141 (1971).
D. E. Soper:Phys. Rev. D,18, 4590 (1978).
M. B. Halpern, A. Jevicki andP. Senjanovič:Phys. Rev. D,16, 2476 (1977).
R. Casalbuoni:Nuovo Cimento A,33, 289 (1976).
Y. Ohnuki andT. Kashiwa:Prog. Theor. Phys.,60, 548 (1978).
M. Schmutz:Z. Phys. B,30, 97 (1978).
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Schmutz, M. Construction of functional integrals for bosons and fermions from liouville space. Lett. Nuovo Cimento 37, 161–164 (1983). https://doi.org/10.1007/BF02752247
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DOI: https://doi.org/10.1007/BF02752247