05924nam 22005055 450 991025745690332120200630040627.03-540-38252-610.1007/3-540-07789-8(CKB)1000000000229801(SSID)ssj0000323662(PQKBManifestationID)12132015(PQKBTitleCode)TC0000323662(PQKBWorkID)10303437(PQKB)11003377(DE-He213)978-3-540-38252-2(PPN)155216317(EXLCZ)99100000000022980120121227d1976 u| 0engurnn|008mamaatxtccrGroup Theoretical Methods in Physics[electronic resource] Fourth International Colloquium, Nijmegen 1975 /edited by A. Janner, T. Janssen, M. Boon1st ed. 1976.Berlin, Heidelberg :Springer Berlin Heidelberg :Imprint: Springer,1976.1 online resource (XIII, 635 p.) Lecture Notes in Physics,0075-8450 ;50Bibliographic Level Mode of Issuance: Monograph3-540-07789-8 Magnetic monopoles and non-abelian gauge groups -- Present status of supersymmetry -- Monopole theories with strings and their applications to meson states -- Quarks and the Poincare group SU(6) x SU(3) as a classification group for baryons -- Wave equations for extended hadrons -- Covariance principle and covariance group in presence of external E.M. Fields -- Dynamical SU(3) model for strong interactions and ? particles -- Local and global equivalence of projective representations -- Invariant e'quations on the fibre bundles -- Gauge groups in local field theory and superselection rules -- The algebraic method in representation theory -- Geometric quantization and graded Lie algebras -- Construction explicite de l'indice de Maslov. Applications -- Twistor theory and geometric quantization -- Quantisation as deformation theory, -- Relativistic canonical systems: A geometric approach to their space-time structure and symmetries -- Propagators in quantum mechanics on multiply connected spaces -- On the quantisation of the Kepler manifold -- On wave functions in geometric quantization -- Dynamical prequantization, spectrum-generating algebras and the classical Kepler and harmonic oscillator problems -- Weyl quantisation on a sphere -- Conformal group, quantization, and the Kepler problem -- Exceptional groups and elementary particles -- A propos des brisures spontanés de symétrie -- Geometry of generalized coherent states -- Coherent states for boson systems in quantum field theory and statistical mechanics -- Coherent states and Pippard networks -- The algebraic approach to nuclear structure problems -- Lie Groups and the Jahn-Teller Effect for a Color Center -- Symmetries and statistics in nuclear physics -- Group theory in polymer physics -- Group theoretical approach to bloch electrons in antiferromagnets -- U (5) ? O (5 )? o (3) and the exact solution for the problem of quadrupole vibrations of the nucleus -- Wave vector selection rules for space groups -- A chemist looks at the structure of symmetry groups -- Cacnonical transformations and gaussian integral kernels in nuclear physics -- Crystals as dynamical systems : A new class of models -- Non linear canonical transformations and their representations in quantum mechanics -- Invariance groups of young operators; pauling numbers -- Applications of Group Theory to Nuclear Reactions : A Critical Survey -- The canonical resolution of the multiplicity problem for U(3): An explicit and complete constructive solution -- On space-time groups -- Frame's conjugating representation and group extensions -- Symmetries of differential equations in mathematical physics -- On the determination of factor systems of PUA — representations -- Complex extension of the representation of the symplectic group associated with the canonical commutation relations -- Continuous unitary projective representations of Polish groups: The BMS-group -- The Hilbert space L2(SU(2)) as a representation space for the group (SU(2) × SU(2)) ? S2 -- Induction from a normal nilpotent subgroup -- Spinor representations -- Weight multiplicities for the classical groups -- Casimir operators of subalgebras of the Poincare Lie algebra and of real Lie algebras of low dimension -- The maximal solvable subalgebras of the real classical lie algebras. II -- Physics and deformation theory of finite and infinite Lie algebras -- Wigner 3j-symbols and the Lorentz group -- Description of symmetries in indefinite metric spaces -- Partial diagonalization of Bethe-Salpeter type equations -- Group structure for classical lattice systems of arbitrary spin -- Equivalent Lagrangians and quasicanonical transformations -- Group theory of massless Boson fields -- Some considerations about Nelson's derivation of Schroedinger equation -- The “Galilean” components of a position operator for the photon -- Group theoretic aspects of Gibbs space -- Approximate symmetry -- Cohomology of the action differential forms -- Correlation inequalities in a class of lattice systems in statistical mechanics -- What is so “special” about “relativity”?.Lecture Notes in Physics,0075-8450 ;50PhysicsPhysics, generalhttps://scigraph.springernature.com/ontologies/product-market-codes/P00002Physics.Physics, general.530Janner Aedthttp://id.loc.gov/vocabulary/relators/edtJanssen Tedthttp://id.loc.gov/vocabulary/relators/edtBoon Medthttp://id.loc.gov/vocabulary/relators/edtBOOK9910257456903321Group theoretical methods in physics335501UNINA03386nam 22005895 450 991076359440332120240313123808.03-031-45854-010.1007/978-3-031-45854-5(CKB)28853120900041(MiAaPQ)EBC30943653(Au-PeEL)EBL30943653(DE-He213)978-3-031-45854-5(EXLCZ)992885312090004120231114d2024 u| 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierElements of Mathematical Analysis An Informal Introduction for Physics and Engineering Students /by Costas J. Papachristou1st ed. 2024.Cham :Springer Nature Switzerland :Imprint: Springer,2024.1 online resource (127 pages)SpringerBriefs in Physics,2191-54319783031458538 1. Functions -- 2. Derivative and Differential -- 3. Some Applications of Derivatives -- 4. Indefinite Integral -- 5. Definite Integral -- 6. Series -- 7. An Elementary Introduction to Differential Equations -- 8. Introduction to Differentiation in Higher Dimensions -- 9. Complex Numbers -- 10. Introduction to Complex Analysis -- Appendix -- Answers to Selected Exercises -- Selected Bibliography -- Index.This book provides a comprehensive yet informal introduction to differentiating and integrating real functions with one variable. It also covers basic first-order differential equations and introduces higher-dimensional differentiation and integration. The focus is on significant theoretical proofs, accompanied by illustrative examples for clarity. A comprehensive bibliography aids deeper understanding. The concept of a function's differential is a central theme, relating to the "differential" within integrals. The discussion of indefinite integrals (collections of antiderivatives) precedes definite integrals, naturally connecting the two. The Appendix offers essential math formulas, exercise properties, and an in-depth exploration of continuity and differentiability. Select exercise solutions are provided. This book suits short introductory math courses for novice physics/engineering students. It equips them with vital differentialand integral calculus tools for real-world applications. It is also useful for first-year undergraduates, reinforcing advanced calculus foundations for better Physics comprehension.SpringerBriefs in Physics,2191-5431Mathematical physicsDifference equationsFunctional equationsEngineering mathematicsMathematical PhysicsDifference and Functional EquationsEngineering MathematicsMathematical physics.Difference equations.Functional equations.Engineering mathematics.Mathematical Physics.Difference and Functional Equations.Engineering Mathematics.780Papachristou Costas J.843154MiAaPQMiAaPQMiAaPQBOOK9910763594403321Elements of Mathematical Analysis3601287UNINA