| Книга | Страницы для поиска |
| Bartle R.G. — The Elements of Integration | 65 |
| Hunter J.K., Nachtergaele B. — Applied Analysis | 343 |
| Falconer K. — Fractal Geometry: Mathematical Foundations and Applications | 10 |
| Apostol T.M. — Mathematical Analysis | 218 |
| Gray R.M., Davisson L.D. — Introduction to statistical signal processing | 240 |
| Porter D., Stirling D.S.G. — Integral equations: a practical treatment, from spectral theory to applications | 124 |
| Weinberger H.F. — First course in partial defferential equations with complex variables and transform methods | 70 |
| Benson D. — Mathematics and music | 42, 44 |
| Williamson R.E., Crowell R.H., Trotter H.F. — Calculus of vector functions | 278 |
| Debnath L., Mikusinski P. — Introduction to Hilbert Spaces with Applications | 12 |
| Estep D.J. — Practical Analysis in One Variable | 464 |
| Monk P. — Finite Element Methods for Maxwell's Equations | 178 |
| Dudley R.M., Fulton W. (Ed) — Real Analysis and Probability | 24, 42 |
| Debnath L. — Linear Partial Differential Equations for Scientists and Engineers | 173 |
| James I.M. — Topological and Uniform Spaces | 112 |
| Searcid M. — Metric Spaces | 112 |
| Strauss W.A. — Partial Differential Equations: An Introduction | 121, 125, 132, 388 |
| Banaszczyk W. — Additive Subgroups of Topological Vector Spaces | 2 |
| Szkelyhidi L. — Discrete Spectral Synthesis and Its Applications | 40 |
| Pugh C.C. — Real Mathematical Analysis | 201 |
| Royden H.L. — Real Analysis | 46, 72, 115, 151, 179 (37) |
| Lang S.A. — Undergraduate Analysis | 179, 317 |
| Royden H.L. — Real Analysis | 46, 72, 115, 151, 179 (37) |
| Boas R.P. — A Primer of Real Functions | 108—109, 123—126 |
| Weir A.J. — Lebesgue Integration and Measure | 168—171, 202—214 |
| Strichartz R.S. — The way of analysis | 263, 274 |
| Köthe G. — Topological vector spaces I | 323 |
| Berinde V. — Iterative Approximation of Fixed Points | 173, 174 |
| Grimmett G., Stirzaker D. — Probability and Random Processes | 306 |
| Hanna J.R., Rowland J.H. — Fourier Series, Transforms, and Boundary Value Problems | 59 |
| Asmar N.H. — Partial Differential Equations with fourier series and boundary value problems | 85 |
| Hazewinkel M. — Handbook of Algebra (part 2) | 156 |
| Axellson O., Barker V.A. — Finite Element Solution of Boundary Value Problems. Theory and Computation | 104 |
| Simmons G.F. — Introduction to topology and modern analysis | 83 |
| Ash R.B. — Real Variables with Basic Metric Space Topology | 117—120 |
| Aliprantis C. — Principles of real analysis | 68 |
| Abramovich Y.A., Aliprantis C.D. — An Invitation to Operator Theory | 53 |
| Dembo A., Zeitouni O. — Large deviations techniques and applications | 144, 153, 156, 166, 268, 289, 306 |
| Lang S. — Undergraduate analysis | 179, 317 |
| Gierz G. — Bundles of Topological Vector Spaces and Their Duality | 114 |
| James I.M. (ed.) — Topological and Uniform Spaces | 112 |
| Hubbard B. — The World According to Wavelets: The Story of a Mathematical Technique in the Making | 106 |
| Cheney W. — Analysis for Applied Mathematics | 11 |
| Falconer K. — Fractal geometry: mathematical foundations and applications | 10 |
| Abramovich Y., Aliprantis C. — An Invitation to Operator Theory (Graduate Studies in Mathematics, V. 50) | 53 |
| Apostol T. — Mathematical Analysis, Second Edition | 218 |
| Vretblad A. — Fourier Analysis and Its Applications (Graduate Texts in Mathematics) | 86, 87, 117 |
| Jorgensen P.E.T. — Analysis and Probability: Wavelets, Signals, Fractals | see "convergence, pointwise" |
| Constanda C. (ed.), Potapenko S.S. (ed.) — Integral Methods in Science and Engineering: Techniques and Applications | 210 |
| Constanda C., Potapenko S. — Integral Methods in Science and Engineering: Techniques and Applications | 210 |
| Constanda C. (ed.), Potapenko S. (ed.) — Integral methods in science and engineering | 210 |
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