Научная литература
booksshare.net -> Добавить материал -> Физика -> Глимм Дж. -> "Математические методы квантовой физики " -> 177

Математические методы квантовой физики - Глимм Дж.

Глимм Дж., Джаффе А. Математические методы квантовой физики — Меркурий , 2000. — 451 c.
Скачать (прямая ссылка): matmetodikvantovoyfiziki2000.pdf
Предыдущая << 1 .. 171 172 173 174 175 176 < 177 > 178 179 180 181 182 183 .. 187 >> Следующая

Phys,
36, 233-241.
RCed, M. and Rosen, L. (1974). Support properties of the free measure for
boson fields, Comm. Math. Phys. 36, 123-132.
*7-60 Reed, M. and Simon, B. (1972-1979). Methods of Modern Mathematical
Physics, Yols, I, II, III, IV, New York: Academic Press.
Литература
Renouard, P. (1977)! Analyticite et sommabilitie "de Borel" des fonctions
de Schwinger du modele de Yukawa en dimension J = 2, Г. Approximation "a
volume fini," Ann. Г Inst. Henri Poincare 27, 237-277.
Renouard, P. (1979). Analyticite et sommabilite "de Borel" des functions
de Schwinger du modele de Yukawa en dimension d = 2 II. La "Limite adia-
batique," Ann. Г Inst Henri Poincare, 31, 235-318.
Riedel, H. and Wcgner, F. (1У72). Tricri;ical exponents and scaling
fields, Phys. Rev. Lett. 29, 349-352.
Rivasseau, V. (1980). Lieb's correlation inequality for plane rotators,
Comm. Matji. Phys. 77, 145-148.
Roberts, J. (1976). Local cohomology and superselection structure, Comm.
Math. Phys. 51, 107-119.
Robinson, D. (1969). A proof of the existence of phase transitions in the
anisotropic Heisenberg model, Comm. Math. Phys. 14, 195 -204.
Robinson, G. de B. (1961). Representation of Symmetric Groups, Toronto:
University of Toronto Press..
Rosen, J. (1977). The Ising model limit of ф* lattice fields, Proc. AMS
66, 114-118. Rosen, J. (1980). Mass renormalization for the ?.ф*
Euclidean lattice field, Adv.
Appl. Math. 1, 37-49.
Rosen, L. (1970). A A<j>2" field theory without cutoffs, Comm. Math.
Phys. 16, 157-183.
Rosen, L. (1971). The (ф2") quantum field theory: higher order estimates,
Comm.
Pure Appl. Math. 24, 417-457.
Rosen, L. (1977). Construction of the Yukawa2 field theory with a large
external field, J. Math. Phys. 18, 894-897.
Rosen, L. and Simon, B. (1972). The (ф2")2 field Hamiltonian for complex
coupling constant, Trans. Amer. Math. Soc. 165< 365-379.
Ruelle, D. (1962). On the asymptotic condition in quantum field theory,
Helv. Phys.
Acta 35, 147-163.
Ruelle, D. (1969). Statistical Mechanics, New York: Benjamin.
Ruelle, D. (1971). Analyticity of Green's functions of dilute quantum
gases, J. Math, Phys. 12, 901-903.
Ruelle, D. (1972a). On the use of "small extremal fields" in the problem
of symmetry breakdown in statistical mechanics, Ann. Phys. 69, 364-374.
Ruelle, D. (1972b). Definition of Green's functions for dilute Fermi
gases, Helv. Phys. Acta 45, 215-219.
63 Sato, М., Miwa, T. and Jimbo, M. (1978-80). Holonomic quantum fields,
I V, Publ. RIMS, Kyoto University 14, 223-267; 15, 201 278; 15, 577 629:
RIMS preprint.
Scadron, M. (1979). Advanced Quantum Theory, New York: Springer.
Schor, R. (1978a). The instanton gas for the anharmonic oscillator,
Rockejeller University preprint.
Schor, R. (1978b). The particle structure in v-dimensional Ising models
at low temperature, Comm. Math. Phys. 59, 219- 233.
Литература
Schrader, R. (1971). A remark on Yukawa plus boson self interaction in
two space time dimensions, Comm. Math. Phys. 21, 164-170.
Schrader, R. (1972). A Yukawa quantum field theory in two spacetime
dimensions without cutoffs, Ann. Phys. 70, 412-457.
Schrader, R. (1974a). On the Euclidean version of Haag's theorem in
P(4>)i theories, Comm. Math. Phys. 36, 133 -136; 38, 81-82.
Schrader, R. (1974b). Local operator products and field equations in
Р(ф)г theories, Fort. Physik. 22, 611-631.
Schrader, R. (1976-7). A possible constructive approach to фI, II, III.
Comm. Math. Phys. 49, 131-153; 50, 97-102; Ann. rinst. Henri Poincare 26,
295-301.
Schrader, R. (1977). New correlation inequalities for the Ising model
arid Р(ф) theories, Phys. Rev. В 15, 2798-2803.
Schrader, R. (1978). Towards a constructive approach of a gauge
invariant, massive Р(ф)2 theory, Comm- Math. Phys. 58, 299-312.
Schrader, R. and Seiler, R. (1978). A uniform lower bound on the
renormalized scalar Euclidean functional determinant, Comm. Math. Phys.
61, 169-175.
Schwartz, L. (1950-1). Theory of Distributions I, II. Paris: Hermann, el
Schweber, S. (1961). Relativistic Quantum Field Theory, New York: Harper
and Row.
Schwinger, J. (1958). On the Euclidean structure of relativistic field
theory, Proc. N.A.S. 44, 956-965.
Schwinger, J. (1959). Euclidean quantum electrodynamics, Phys.'Rev. 115,
721-731.
Segal, I. (1963). Mathematical Problems of Relativistic Physics,
Providence: American Mathematical Society.
Segal, I. (1967). Notes toward (he construction of nonlinear relativistic
quantum fields. I: The Hamiltonian in two space-time dimensions as the
generator of a C*-automorphism group, Proc. Nat. Acad. Sci. U.S.A. 57,
1178-1183.
Segal, I. (1969). Nonlinear functions of weak processes I, J. Fund. Anal.
4, 404-456.
Segal, I. (1970). Construction of rionlinear local quantum processes:.I,
Ann. Math. 92,462-481.
Seiler, E. (1975). Schwinger functions for the Yukawa model in two
dimensions with space-time cutoff, Comm. Math. Phys. 42, 163-182.
Предыдущая << 1 .. 171 172 173 174 175 176 < 177 > 178 179 180 181 182 183 .. 187 >> Следующая

Реклама

c1c0fc952cf0704ad12d6af2ad3bf47e03017fed

Есть, чем поделиться? Отправьте
материал
нам
Авторские права © 2009 BooksShare.
Все права защищены.
Rambler's Top100

c1c0fc952cf0704ad12d6af2ad3bf47e03017fed