Algebraic Structure
The study of algebraic structures is certainly one of the oldest endeavors in the world of mathematics. For example, with our current viewpoint many of the ancient problems of mathematics, such as the ruler-compass constructions of Euclidean geometry, are
- PDF / 56,378,594 Bytes
- 632 Pages / 439.37 x 666.142 pts Page_size
- 29 Downloads / 222 Views
Springer New York Berlin Heidelberg Barcelona Hong Kong London Milan Paris Singapore Tokyo
Applied Mathematical Sciences A SELECTION
78. Dacorogna: Direct Methods in the Calculus of Variations. 79. Hernimdez-Lenna: Adaptive Markov Processes. 80. Lowden: El\iptic Functions and Applications. 81. Bluman/Kumei: Symmetries and Differential Equations. 82. Kress: Linear Integral Equations, 2nd ed. 83. Bebernes/Eberly: Mathematical Problems from Combustion Theory. 84. Joseph: Fluid Dynamics of Viscoelastic Fluids. 85. Yang: Wave Packets and Their Bifurcations in Geophysical Fluid Dynamics. 86. Dendrinos/Sonis: Chaos and Socio-Spatial Dynamics. 87. Weder: Spectral and Scattering Theory for Wave Propagation in Perturbed Stratified Media. 88. Bogaevski/Povzner: Algebraic Methods in Nonlinear Perturbation Theory. 89. O'Malley: SingUlar Perturbation Methods for Ordinary Differential Equations. 90. Meyer/Hall: Introduction to Hamiltonian Dynamical Systems and the N-body Problem. 91. Straughan: The Energy Method, Stability, and Nonlinear Convection. 92. Naber: The Geometry ofMinkowski Spacetime. 93. ColtonlKress: Inverse Acoustic and Electromagnetic Scattering Theory. 2nd ed. 94. Hoppensteadt: Analysis and Simulation of Chaotic Systems, 2nd ed. 95 .. Hackbusch: Iterative Solution of Large Sparse Systems of Equatioos. 96. Marchioro/Pulvirenti: Mathematical Theory of Incompressible Nonviscous Fluids. 97. Lasota/Mackey: Chaos, Fractals, and Noise: Stochastic Aspects of Dynamics, 2nd ed. 98. de Boorflfollig/Riemenschneider: Box Splines. 99. Hale/Lunel: Introduction to Functional Differential Equations. 100. Sirovich (ed): Trends and Perspectives in Applied Mathematics. 101. NusseIYorke: Dynamics: Numerical Explorations, 2nded. 102. Chossatllooss: The Couette-Taylor Problem. 103. Chorin: Vorticity and Turbulence. 104. Farkas: Periodic Motions. 105. Wiggins: Normally Hyperbolic Invariant Manifolds in Dynamical Systems. 106. CercignanilIllner/Pulvirenti: The Mathematical Theory of Dilute Gases. 107. Antman: Nonlinear Problems of Elasticity. 108. Zeidler: Applied Functional Analysis: Applications to Mathematical Physics. 109. Zeidler: Applied Functional Analysis: Main Principles and Their Applications. 110. Die/anannlvan Gils/Verduyn LunellWalther:
Delay Equations: Functional-, Complex-, and Nonlinear Analysis.
III. Visintin: Differential Models of Hysteresis. 112. Kuznetsov: Elements of Applied Bifurcation Theory, 2nd ed 113. Hislop/Sigal: Introduction to Spectral Theory:
With Applications to Schrodinger Operators. 114. Kevorkian/Cole: Multiple Scale and Singular
Perturbation Methods. 115. Taylor: Partial Differential Equations I, Basic Theory. 116. Taylor: Partial Differential Equations II,
Qualitative Studies of Linear Equations. 117. Taylor: Partial Differential Equations III,
Nonlinear Equations. 118. GodlewskilRaviart: Numerical Approximation of
Hyperbolic Systems of Conservation Laws. 119. Wu: Theory and Applications of Partial
Functional Differential Equations. 120. Kirsch: An Introduction to the Mathematical
Theory o