References
- Whitaker E. On the functions which are represented by the expansion of interpolating theory. Proc Roy Soc Edinburgh. 1915;35:181–194.
- Ogura K. On a certain transcendental integral function in the theory of interpolation. Tôhoku Math J. 1920;17:64–72.
- Kotel'nikov VA. On the carrying capacity of the ‘either’ and wire in telecommunications. Material for the First All-Union Conference on Questions of Communication (Russian), Izd. Red. Upr. Svyzai RKKA, Moscow; 1933.
- Shannon CE. Communication in the presence of noise. Proc IRE. 1949;37(1):10–21.
- Jerri AJ. The Shannon sampling theorem – its various extensions and applications: a tutorial review. Proc IEEE. 1977;65(11):1565–1596.
- Higgins JR. Five short stories about the cardinal series. Bull Am Math Soc. 1985;12(1):45–89.
- Butzer PL, Stens RL. Sampling theory for not necessarily band-limited functions: a historical overview. SIAM Rev. 1992;34(1):40–53.
- Unser M. Sampling-50 years after Shannon. Proc IEEE. 2000;88(4):569–587.
- Levin BY. Lectures on entire functions, translations of mathematical monographs. Vol. 150. Providence, RI: American Mathematical Society; 1996.
- Rudin W. Functional analysis. Singapore: McGraw-Hill Book Co; 1991.
- Higgins JR. Sampling theory in Fourier and signal analysis: foundations. New York: Oxford University Press; 1996.
- Levin BY, Ostrovskii IV. On small perturbations of the set of zeros of functions of sine type. Izvestiya Rossiiskoi Akademii Nauk Seriya Matematicheskaya. 1979;43(1):87–110.
- Mönich UJ, Boche H. Non-equidistant sampling for bounded bandlimited signals. Signal Process. 2010;90(7):2212–2218.
- Higgins J. A sampling theorem for irregularly spaced sample points (corresp.). IEEE Trans Inf Theory. 1976;22(5):621–622.
- Seip K. An irregular sampling theorem for functions bandlimited in a generalized sense. SIAM J Appl Math. 1987;47(5):1112–1116.
- Paley REAC, Wiener N, Wiener N. Fourier transforms in the complex domain. Vol. 19. New York: American Mathematical Society; 1964.
- García A. The Paley–Wiener–Levinson theorem revisited. Int J Math Math Sci. 1997;20(2):229–234.
- Young RM. An introduction to non-harmonic Fourier series. Revised edition, 93. San Diego: Academic Press; 2001.
- Titchmarsh EC. The zeros of certain integral functions. Proc Lond Math Soc. 1926;2(1):283–302.
- Beurling A, Malliavin P. On the closure of characters and the zeros of entire functions. Acta Math. 1967;118(1):79–93.
- Katsnel'son V. Exponential bases in L2. Funct Anal Appl. 1971;5(1):31–38.