REFERENCES
- L. Angeloni ( 2013 ). Approximation results with respect to multidimensional ϕ-variation for nonlinear integral operators . Zeitschrift fur Analysis und ihre Anwendung 32 ( 1 ): 103 – 128 .
- L. Angeloni and G. Vinti ( 2009 ). Convergence and rate of approximation for linear integral operators in BV ϕ-spaces in multidimensional setting . J. Mathematical Analysis and Applications 349 ( 2 ): 317 – 334 .
- L. Angeloni and G. Vinti ( 2010 ). Approximation with respect to Goffman-Serrin variation by means of non-convolution type integral operators . Numerical Functional Analysis and Optimization 31 ( 5 ): 519 – 548 .
- L. Angeloni and G. Vinti ( 2013 ). Approximation in variation by homothetic operators in multidimensional setting . Differential and Integral Equations 26 ( 5–6 ): 655 – 674 .
- L. Angeloni , G. Vinti ( 2013 ). A sufficient condition for the convergence of a certain modulus of smoothness in multidimensional setting. Communications on Applied Nonlinear Analysis 20(1): 1–20.
- L. Angeloni and G. Vinti ( 2014 ). Convergence and rate of approximation in for a class of Mellin integral operators . Atti dell'Accademia Nazionale dei Lincei, Classe di Scienze Fisiche, Matematiche e Naturali, Rendiconti Lincei Matematica e Applicazioni 25 ( 3 ): 217232 .
- L. Angeloni and G. Vinti (2005). Rate of approximation for nonlinear integral operators with applications to signal processing. Differential and Integral Equations 18(8):855–890.
- C. Bardaro , P. L. Butzer , R. L. Stens , and G. Vinti ( 2006 ). Approximation of the Whittaker sampling series in terms of an average modulus of smoothness covering discontinuous signals . J. Math. Anal. Appl. 316 : 269 – 306 .
- C. Bardaro , P. L. Butzer , R. L. Stens , and G. Vinti ( 2007 ). Kantorovich-type generalized sampling series in the setting of Orlicz spaces . Sampling Theory in Signal and Image Processing 6 ( 1 ): 29 – 52 .
- C. Bardaro , P. L. Butzer , R. L. Stens , and G. Vinti ( 2010 ). Prediction by samples from the past with error estimates covering discontinuous signals . IEEE, Transaction on Information Theory 56 ( 1 ): 614 – 633 .
- C. Bardaro and I. Mantellini ( 2012 ). On convergence properties for a class of Kantorovich discrete operators . Numer. Funct. Anal. Optim. 33 ( 4 ): 374 – 396 .
- C. Bardaro , J. Musielak , and G. Vinti ( 2003 ). Nonlinear Integral Operators and Applications, De Gruyter Series in Nonlinear Analysis and Applications 9. Walter de Gruyter, Berlin.
- C. Bardaro and G. Vinti ( 1997 ). A general approach to the convergence theorems of generalized sampling series . Applicable Analysis 64 : 203 – 217 .
- C. Bardaro and G. Vinti ( 1998 ). Uniform convergence and rate of approximation for a nonlinear version of the generalized sampling operator. Results in Mathematics, Special volume dedicated to Prof. P. L. Butzer, 34(3,4):224–240.
- C. Bardaro and G. Vinti ( 1998 ). On the order of modular approximation for nets of integral operators in modular Lipschitz classes. Funct. Approx. Comment. Math., Special issue dedicated to Prof. Julian Musielak, 26:139–154.
- C. Bardaro and G. Vinti ( 2004 ). An abstract approach to sampling type operators inspired by the work of P. L. Butzer: Part II . Nonlinear Operators, Sampling Theory in Signal and Image Processing 3 ( 1 ): 29 – 44 .
- L. Bezuglaya and V. Katsnelson ( 1993 ). The sampling theorem for functions with limited multi-band spectrum I . Zeitschrift für Analysis und ihre Anwendungen 12 : 511 – 534 .
- A. Boccuto , D. Candeloro , and A. R. Sambucini ( 2014 ). Vitali-type theorems for filter convergence related to vector lattice-valued modulars and applications to stochastic processes . J. Mathematical Analysis and Applications 419 ( 2 ): 818 – 838 .
- P. L. Butzer ( 1983 ). A survey of the Whittaker-Shannon sampling theorem and some of its extensions . J. Math. Res. Exposition 3 : 185 – 212 .
- P. L. Butzer , A. Fisher , and R. L. Stens ( 1990 ). Generalized sampling approximation of multivariate signals: Theory and applications . Note di Matematica 10 ( 1 ): 173 – 191 .
- P. L. Butzer and R. J. Nessel ( 1971 ). Fourier Analysis and Approximation I . Academic Press , New York .
- P. L. Butzer , S. Ries , and R. L. Stens ( 1987 ). Approximation of continuous and discountinuous functions by generalized sampling series . J. Approx. Theory 50 : 25 – 39 .
- F. Cluni , D. Costarelli , A. M. Minotti , and G. Vinti ( 2013 ). Multivariate sampling Kantorovich operators: Approximation and applications to civil engineering. EURASIP Open Library. Proceedings of SampTA 2013, 10th International Conference on Sampling Theory and Applications, July 1–5, 2013. Jacobs University, Bremen, pp. 400–403.
- F. Cluni , D. Costarelli , A. M. Minotti , and G. Vinti ( 2015 ). Applications of sampling Kantorovich operators to thermographic images for seismic engineering . J. Computational Analysis and Applications 19 ( 4 ): 602 – 617 .
- F. Cluni , D. Costarelli , A. M. Minotti , and G. Vinti ( 2015 ). Enhancement of thermographic images as tool for structural analysis in earthquake engineering. NDT & E International. 70: 60–72.
- D. Costarelli ( 2014 ). Interpolation by neural network operators activated by ramp functions . J. Mathematical Analysis and Application 419 ( 1 ): 574 – 582 .
- D. Costarelli ( 2015 ). Neural network operators: Constructive interpolation of multivariate functions . Neural Networks 67 : 28 – 36 .
- D. Costarelli and R. Spigler ( 2013 ). Approximation results for neural network operators activated by sigmoidal functions . Neural Networks 44 : 101 – 106 .
- D. Costarelli and R. Spigler ( 2013 ). Multivariate neural network operators with sigmoidal activation functions . Neural Networks 48 : 72 – 77 .
- D. Costarelli and R. Spigler (2014). Convergence of a family of neural network operators of the Kantorovich type. J. Approx. Theory 185:80–90.
- D. Costarelli and R. Spigler ( 2015 ). How sharp is Jensen's inequality? J. Inequalities and Applications 69 : 1 – 10 .
- D. Costarelli and G. Vinti ( 2011 ). Approximation by multivariate generalized sampling kantorovich operators in the setting of Orlicz spaces. Bollettino U.M.I., Special volume dedicated to Prof. Giovanni Prodi, 9(4):445–468.
- D. Costarelli and G. Vinti ( 2013 ). Approximation by nonlinear multivariate sampling Kantorovich type operators and applications to image processing . Numerical Functional Analysis and Optimization 34 ( 8 ): 819 – 844 .
- D. Costarelli and G. Vinti ( 2013 ). Order of approximation for nonlinear sampling Kantorovich operators in Orlicz spaces. Commentationes Mathematicae, Special issue dedicated to Prof. Julian Musielak, 5(2):171–192.
- D. Costarelli and G. Vinti ( 2014 ). Order of approximation for sampling Kantorovich operators . J. Integral Equations and Applications 26 ( 3 ): 345 – 368 .
- D. Costarelli and G. Vinti ( 2014 ). Rate of approximation for multivariate sampling Kantorovich operators on some functions spaces . J. Integral Equations and Applications 26 ( 4 ): 455 – 481 .
- M. M. Dodson and A. M. Silva ( 1985 ). Fourier analysis and the sampling theorem . Proc. Ir. Acad. 86 ( A ): 81 – 108 .
- C. Donnini and G. Vinti ( 2008 ). Approximation by means of Kantorovich generalized sampling operators in Musielak-Orlicz spaces . PanAmerican Mathematical Journal 18 ( 2 ): 1 – 18 .
- J. R. Higgins and R. L. Stens ( 1999 ). Sampling Theory in Fourier and Signal Analysis: Advanced Topics . Oxford Science Publications, Oxford Univ. Press , Oxford
- W. M. Kozlowski ( 1988 ). Modular Function Spaces . (Pure Appl. Math.) Marcel Dekker , New York .
- M. A. Krasnosel'skiĭ and Y. B. Rutickiĭ ( 1961 ). Convex Functions and Orlicz Spaces . P. Noordhoff Ltd. , Groningen , The Netherlands
- I. Mantellini and G. Vinti ( 2003 ). Approximation results for nonlinear integral operators in modular spaces and applications . Ann. Polon. Math. 81 ( 1 ): 55 – 71 .
- J. Musielak ( 1983 ). Orlicz Spaces and Modular Spaces, Lecture Notes in Math., 1034. Springer-Verlag, Berlin.
- J. Musielak and W. Orlicz ( 1959 ). On modular spaces . Studia Math. 28 : 49 – 65 .
- M. M. Rao and Z. D. Ren ( 1991 ). Theory of Orlicz Spaces, Monographs and Textbooks in Pure and Applied Mathematics, 146. Marcel Dekker Inc., New York.
- M. M. Rao and Z. D. Ren ( 2002 ). Applications of Orlicz Spaces . Monographs and Textbooks in Pure and Applied Mathematics, Vol. 250. Marcel Dekker Inc., New York.
- S. Ries and R. L. Stens ( 1984 ). Approximation by generalized sampling series. Constructive Theory of Functions’ 84. Sofia 746–756.
- F. Ventriglia and G. Vinti ( 2014 ). A unified approach for the convergence of nonlinear Kantorovich-type operators . Communications on Applied Nonlinear Analysis 21 ( 2 ): 45 – 74 .
- C. Vinti ( 1998 ). A survey on recent results of the mathematical seminar in Perugia, inspired by the work of Professor P. L. Butzer . Result. Math. 34 : 32 – 55 .
- G. Vinti ( 2001 ). A general approximation result for nonlinear integral operators and applications to signal processing . Applicable Analysis 79 : 217 – 238 .
- G. Vinti ( 2005 ). Approximation in Orlicz spaces for linear integral operators and applications . Rendiconti del Circolo Matematico di Palermo, Serie II 76 : 103 – 127 .
- G. Vinti and L. Zampogni ( 2009 ). Approximation by means of nonlinear Kantorovich sampling type operators in Orlicz spaces . J. Approximation Theory 161 : 511 – 528 .
- G. Vinti and L. Zampogni ( 2011 ). A unifying approach to convergence of linear sampling type operators in Orlicz spaces . Advances in Differential Equations 16 ( 5–6 ): 573 – 600 .
- G. Vinti and L. Zampogni ( 2014 ). A unified approach for the convergence of linear Kantorovich-type operators . Advanced Nonlinear Studies 14 : 991 – 1011 .
- F. Ventriglia and G. Vinti ( 2013 ). A unified approach for nonlinear Kantorovich-type operators . Bollettino dell'Unione Matematica Italiana 6 ( 3 ): 715 – 724 .