References
- Abbati, M. and Cirelli, R. (1997). Metodi matematici per la fisica – Operatori lineari negli spazi di Hilbert. Città studi, Milan.
- Bartle, R. (1966). The Elements of Integration. John Wiley & Sons, Hoboken.
- Berberian, S. (1961). Introduction to Hilbert Spaces. Oxford University Press, Oxford.
- Boggess, A. and Narcowich, F. (2015). A First Course Wavelets with Fourier Analysis. John Wiley & Sons, Hoboken.
- Briane, M. and Pagè, G. (1998). Théorie de l’intégration – cours et exercices. Vuibert, Paris.
- Debnath, L. and Mikusinski, P. (2005). Introduction to Hilbert Spaces with Applications. Academic Press, Cambridge.
- Dunford, N. and Schwartz, J. (1958). Linear Operators, Part 1. Wiley Interscience, Hoboken.
- El Hage Hassan, N. (2011). Topologie générale et espaces normés : cours et exercices corrigés. Dunod, Paris.
- Frazier, M.W. (2001). Introduction to Wavelets through Linear Algebra. Springer, Berlin.
- Gasquet, C. and Witomski, P. (2013). Fourier Analysis and Applications: Filtering, Numerical Computation, Wavelets, vol. 30. Springer Science & Business Media, Berlin.
- Moretti, V. (2013). Spectral Theory and Quantum Mechanics, vol. 64. Springer, Berlin.
- Saxe, K. (2000). Beginning Functional Analysis. Springer, Berlin.
- Sondaz, D. (2010). Bien maîtriser les mathématiques : limites, applications continues, espaces complets. Cépaduès, Toulouse.
- Vretblad, A. (2003). Fourier Analysis and Its Applications. Springer, Berlin.
- Yosida, K. (1995). Functional Analysis. Springer-Verlag, Berlin-Heidelberg.
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