Relevant bibliographies by topics / Nonlinearità

Contents

  1. Journal articles
  2. Dissertations / Theses
  3. Books
  4. Book chapters
  5. Conference papers
  6. Reports

Academic literature on the topic 'Nonlinearità'

Author: Grafiati
Published: 4 June 2021
Last updated: 1 April 2023

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Journal articles on the topic "Nonlinearità"

1

Śliwiński, Przemysław. "On-line wavelet estimation of Hammerstein system nonlinearity." International Journal of Applied Mathematics and Computer Science 20, no. 3 (September 1, 2010): 513–23. http://dx.doi.org/10.2478/v10006-010-0038-y.

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On-line wavelet estimation of Hammerstein system nonlinearityA new algorithm for nonparametric wavelet estimation of Hammerstein system nonlinearity is proposed. The algorithm works in the on-line regime (viz., past measurements are not available) and offers a convenient uniform routine for nonlinearity estimation at an arbitrary point and at any moment of the identification process. The pointwise convergence of the estimate to locally bounded nonlinearities and the rate of this convergence are both established.
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Bаzhanova, А. Yu, M. G. Suryaninov, and G. B. Shotadze. "Finite elements mathematical model of geometric nonlinearity." Odes’kyi Politechnichnyi Universytet. Pratsi, no. 2 (June 15, 2015): 138–44. http://dx.doi.org/10.15276/opu.2.46.2015.25.

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Shi, Yujiao, and Zhenhui Zhang. "Nonlinear photoacoustic imaging dedicated to thermal-nonlinearity characterization." Chinese Optics Letters 19, no. 7 (2021): 071702. http://dx.doi.org/10.3788/col202119.071702.

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Mehl, Steffen. "Forward Model Nonlinearity versus Inverse Model Nonlinearity." Ground Water 45, no. 6 (November 2007): 791–94. http://dx.doi.org/10.1111/j.1745-6584.2007.00372.x.

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Zagirnyak, M., D. Mosiundz, and D. Rodkin. "USE OF POWER METHOD FOR IDENTIFICATION OF NONLINEARITY PARAMETERS." Tekhnichna Elektrodynamika 2017, no. 1 (January 18, 2017): 3–9. http://dx.doi.org/10.15407/techned2017.01.003.

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OBIKAWA, Toshiyuki, Hiroyuki SASAHARA, and Takahiro SHIRAKASHI. "Basic Nonlinearity of Tool Chatter Vibration(Advanced machining technology)." Proceedings of International Conference on Leading Edge Manufacturing in 21st century : LEM21 2005.1 (2005): 169–72. http://dx.doi.org/10.1299/jsmelem.2005.1.169.

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Shuai Yuan, Shuai Yuan, Lirong Wang Lirong Wang, Fengjiang Liu Fengjiang Liu, Fengquan Zhou Fengquan Zhou, Min Li Min Li, Hui Xu Hui Xu, Yuan Nie Yuan Nie, Junyi Nan Junyi Nan, and Heping Zeng Heping Zeng. "Enhanced nonlinearity for filamentation in gold-nanoparticle-doped water." Chinese Optics Letters 17, no. 3 (2019): 032601. http://dx.doi.org/10.3788/col201917.032601.

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Kirchmair, Gerhard. "Designing nonlinearity." Nature Physics 16, no. 2 (November 18, 2019): 127–28. http://dx.doi.org/10.1038/s41567-019-0710-6.

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Won, Rachel. "Enhanced nonlinearity." Nature Photonics 9, no. 5 (April 29, 2015): 283. http://dx.doi.org/10.1038/nphoton.2015.73.

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Pile, David. "Giant nonlinearity." Nature Photonics 10, no. 6 (May 31, 2016): 359. http://dx.doi.org/10.1038/nphoton.2016.116.

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Dissertations / Theses on the topic "Nonlinearità"

1

ANGELICI, Marco. "Vibrazioni non lineari in mezzi piezoelettrici finiti." Doctoral thesis, La Sapienza, 2004. http://hdl.handle.net/11573/916891.

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Albarelli, Francesco. "Nonlinearity as a resource for nonclassicality." Master's thesis, Alma Mater Studiorum - Università di Bologna, 2015. http://amslaurea.unibo.it/8300/.

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Lo scopo di questo lavoro è cercare un'evidenza quantitativa a supporto dell'idea idea che la nonlinearità sia una risorsa per generare nonclassicità. Ci si concentrerà su sistemi unidimensionali bosonici, cercando soprattutto di connettere la nonlinearità di un oscillatore anarmonico, definito dalla forma del suo potenziale, alla nonclassicità del relativo ground state. Tra le numerose misure di nonclassicità esistenti, verranno impiegate il volume della parte negativa della funzione di Wigner e l'entanglement potential, ovvero la misura dell'entanglement prodotto dallo stato dopo il passaggio attraverso un beam splitter bilanciato avente come altro stato in ingresso il vuoto. La nonlinearità di un potenziale verrà invece caratterizzata studiando alcune proprietà del suo ground state, in particolare se ne misurerà la non-Gaussianità e la distanza di Bures rispetto al ground state di un oscillatore armonico di riferimento. Come principale misura di non-Gaussianità verrà utilizzata l'entropia relativa fra lo stato e il corrispettivo stato di riferimento Gaussiano, avente la medesima matrice di covarianza. Il primo caso che considereremo sarà quello di un potenziale armonico con due termini polinomiali aggiuntivi e il ground state ottenuto con la teoria perturbativa. Si analizzeranno poi alcuni potenziali il cui ground state è ottenibile analiticamente: l'oscillatore armonico modificato, il potenziale di Morse e il potenziale di Posch-Teller. Si andrà infine a studiare l'effetto della nonlinearità in un contesto dinamico, considerando l'evoluzione unitaria di uno stato in ingresso in un mezzo che presenta una nonlinearità di tipo Kerr. Nell'insieme, i risultati ottenuti con tutti i potenziali analizzati forniscono una forte evidenza quantitativa a supporto dell'idea iniziale. Anche i risultati del caso dinamico, dove la nonlinearità costituisce una risorsa utile per generare nonclassicità solo se lo stato iniziale è classico, confermano la pittura complessiva. Si sono inoltre studiate in dettaglio le differenze nel comportamento delle due misure di nonclassicità.
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Trovarello, Simone. "Selezione automatica di rettificatori a RF SIMO mediante autopolarizzazione di HEMT." Master's thesis, Alma Mater Studiorum - Università di Bologna, 2020. http://amslaurea.unibo.it/21835/.

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Nella tesi viene proposto un sistema innovativo di Energy Harvesting per radiofrequenze a 2.45 GHz. Si tratta di un sistema single-input multiple-output ad ampissimo range dinamico di potenza in ingresso che sfrutta il fenomeno di autopolarizzazione di dispositivi non lineari come gli HEMT per selezionare autonomamente, e senza alcun controllo esterno, il ramo di rettificazione più adeguato al fine di ottenere la massima RF-to-DC conversion efficiency possibile. Inoltre il sistema garantisce il massimo isolamento fra i rami che compongono il circuito sfruttando l'ottimizzazione dei Large Signal S-Parameters dei singoli stadi del sistema.
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Iiritano, Valeria. "Solutions of minimal energy for elliptic problems." Doctoral thesis, Università di Catania, 2018. http://hdl.handle.net/10761/3915.

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Questa tesi di Dottorato riguarda lo studio dell'esistenza di soluzioni di minima energia e soluzioni nodali di minima energia per problemi ellittici non lineari in presenza di una nonlinearità con condizioni di crescita subcritica. La tesi è divisa in tre capitoli. Nel primo capitolo vengono richiamati nozioni e risultati di base, che saranno necessari per dimostrare i nostri risultati principali. Infatti, in molti problemi di calcolo variazionali, non è sufficiente parlare di soluzioni classiche delle equazioni differenziali, ma è necessario introdurre la nozione di soluzione debole e lavorare nei cosiddetti spazi di Sobolev. Nel secondo capitolo, proviamo un risultato generale di esistenza di soluzioni di minima energia e soluzioni nodali di minima energia per un particolare problema problema di Dirichlet, caratterizzato da una funzione di Carathéodory. L'ultimo capitolo riguarda la generalizzazione di alcuni risultati precedenti ralativi a casi speciali di f. Infini, saranno proposti alcuni problemi aperti, riguardanti la restrizione alla varietà di Nehari del funzionale dell'energia associato al problema di Dirichlet, quando la non linearità è del tipo $f(x; u) = \lambda |u|^{s-2} u - \mu|u|^{r-2} u$ con $s, r \in (1; 2)$ and $\lambda ; \mu> 0$.
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Sertkaya, Isa. "Nonlinearity Preserving Post-transformations." Master's thesis, METU, 2004. http://etd.lib.metu.edu.tr/upload/12605183/index.pdf.

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Boolean functions are accepted to be cryptographically strong if they satisfy some common pre-determined criteria. It is expected that any design criteria should remain invariant under a large group of transformations due to the theory of similarity of secrecy systems proposed by Shannon. One of the most important design criteria for cryptographically strong Boolean functions is the nonlinearity criterion. Meier and Staffelbach studied nonlinearity preserving transformations, by considering the invertible transformations acting on the arguments of Boolean functions, namely the pre-transformations. In this thesis, first, the results obtained by Meier and Staffelbach are presented. Then, the invertible transformations acting on the truth tables of Boolean functions, namely the post-transformations, are studied in order to determine whether they keep the nonlinearity criterion invariant. The equivalent counterparts of Meier and Staffelbach&rsquo
s results are obtained in terms of the post-transformations. In addition, the existence of nonlinearity preserving post-transformations, which are not equivalent to pre-transformations, is proved. The necessary and sufficient conditions for an affine post-transformation to preserve nonlinearity are proposed and proved. Moreover, the sufficient conditions for an non-affine post-transformation to keep nonlinearity invariant are proposed. Furthermore, it is proved that the smart hill climbing method, which is introduced to improve nonlinearity of Boolean functions by Millan et. al., is equivalent to applying a post-transformation to a single Boolean function. Finally, the necessary and sufficient condition for an affine pre-transformation to preserve the strict avalanche criterion is proposed and proved.
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Wu, Meng-Chou. "Nonlinearity parameters of polymers." W&M ScholarWorks, 1989. https://scholarworks.wm.edu/etd/1539623784.

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Three types of acoustic nonlinearity parameters for solids are discussed. The results of measurements of these parameters for three polymers--polymethyl methacrylate, Polystyrene, and polysulfone--are presented.;The author has developed a new technique, using piezoelectric transducers directly bonded to the specimens, which allows the measurements of fundamental and second harmonics generated in the solids, and thereby the determination of nonlinearity parameter {dollar}\beta\sb3{dollar}, which is the ratio of a linear combination of second- and third-order elastic coefficients to the second-order elastic coefficient.;The second nonlinearity parameter, B/A can be determined from the temperature and pressure derivatives of the sound velocity. We derive its exact relationship for the case of solids. The results from the two techniques are shown to be consistent.;The pressure derivative of the sound velocity is also related to the Gruneisen parameter, which can be used to describe the anharmonicity of interactions in polymer molecules, especially of interchain vibrations. The interchain specific heat for these polymers is then calculated from the Gruneisen parameters; and the characterization of polymers by using these thermoacoustic parameters is discussed.
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Kulig, Gabriel, and Gustav Wallin. "R/2R DAC Nonlinearity Compensation." Thesis, Linköpings universitet, Elektroniksystem, 2012. http://urn.kb.se/resolve?urn=urn:nbn:se:liu:diva-84481.

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The resistor ladder (R/2R) digital-to-analogue converter (DAC) architecture is often used in high performance audio solutions due to its low-noise performance. Even high-end R/2R DACs suffer from static nonlinearity distortions. It was suspected that compensating for these nonlinearities would be possible. It was also suspected that this could improve audio quality in audio systems using R/2R DACs for digital-to-analogue (A/D) conversion. Through the use of models of the resistor ladder architecture a way of characterizing and measuring the faults in the R/2R DAC was created. A compensation algorithm was developed in order to compensate for the nonlinearities. The performance of the algorithm was simulated and an implementation of it was evaluated using an audio evaluation instrument. The results presented show that it is possible to increase linearity in R/2R DACs by compensating for static nonlinearity distortions. The increase in linearity can be quite significant and audible for the trained ear.
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Biswas, Tapan Kanti. "Analysis of semiconductor laser nonlinearity." Thesis, University of Ottawa (Canada), 1991. http://hdl.handle.net/10393/7648.

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In this thesis a theoretical model of laser nonlinearity is analysed and the intermodulation noise is calculated. The large-signal-model of the laser rate equations is used in the analysis. An output-to-input approach is used to obtain a general system equation for the laser and then Volterra series expansion is applied to the system equation to obtain system transfer functions. First, the nth-order Volterra transfer functions, $G\sb{n}$($w\sb1$, ...,$w\sb{n}$), from output to input are calculated. Then, based on harmonic balance the forward Volterra transfer functions, $F\sb{n}$($w\sb1$, ...,$w\sb{n}$), are calculated from $G\sb{n}$($w\sb1$, ...,$w\sb{n}$), and these $F\sb{n}$($w\sb1$, ...,$w\sb{n}$), are used to model the frequency dependent form input-to-output nonlinearities of the laser. The theoretical models for second harmonic (2HD), third harmonic (3HD) and third-order intermodulation (IMD) distortions are expressed in terms of signal frequency, optical modulation depth and laser parameters. Using the Mircea-Sinnreich equations, intermodulation spectra are computed. Harmonic distortions and third-order intermodulation distortion for various carrier (C) levels have been computed and variations of 2HD/C, 3HD/C and IMD/C with frequency and D.C. bias are shown graphically. This system analysis are compared with previously published results and a good agreement is found. (Abstract shortened by UMI.)
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Xiong, Chunle. "Nonlinearity in photonic crystal fibres." Thesis, University of Bath, 2008. https://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.512286.

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This thesis introduces the linear and nonlinear properties of photonic crystal fibre (PCF), describes the fabrication and characterisation of different PCFs, and demonstrates their applications to supercontinuum (SC) generation and single-photon sources. The linear properties of PCF include endlessly single-mode transmission, highly controllable dispersion and birefringence. These unique properties have made PCFs the best media to demonstrate all kinds of nonlinear effects such as self-phase modulation (SPM), cross-phase modulation (XPM), Raman effects, four-wave mixing and modulation instability (FWM and MI), and soliton effects. The combination of these nonlinear effects has led to impressive spectral broadening known as SC generation in PCFs. The intrinsic correlation of signal and idler photons from FWM has brought PCF to the application of single-photon generation. Four projects about SC generation were demonstrated. The first was visible continuum generation in a monolithic PCF device, which gave a compact, bright (-20 dBm/nm), flat and single-mode visible continuum source extending to short wavelength at 400 nm. The second was polarised SC generation in a highly bire-fringent PCF. A well linearly polarised continuum source spanning 450-1750 nm was achieved with >99% power kept in a single linear polarisation. This polarised continuum source was then applied to tuneable visible/UV generation in a BIBO crystal. The third was residual pump peak removal for SC generation in PCFs. The fourth was to design an all-fibre dual-wavelength pumping for spectrally localised continuum generation. Two projects about photon pair generation using FWM were then demonstrated. One was an all-fibre photon pair source designed in the telecom band for quantum communication. This source achieved >50% heralding efficiency which is the highest in fibre photon pair sources reported so far. Another one was to design birefringent PCFs for naturally narrow band photon pair generation in the Si SPAD high detection efficiency range. 0.122 nm bandwidth signal photons at 596.8 nm were generated through cross polarisation phase matched FWM in a weakly birefringent PCF pumped by a picosecond Ti:Sapphire laser at 705 nm in the normal dispersion regime.
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Ye, Yufeng S. M. Massachusetts Institute of Technology. "Nonlinearity engineering with the Quarton." Thesis, Massachusetts Institute of Technology, 2020. https://hdl.handle.net/1721.1/127318.

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Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Computer Science, May, 2020
Cataloged from the official PDF of thesis.
Includes bibliographical references (pages 59-62).
In this thesis, we show the principles and applications of a new technique we call "nonlinearity engineering" using a recent superconducting qubit, the Quarton. In traditional nonlinear optics, nonlinear effects are usually weak perturbations to linear interactions. Similarly, microwave quantum optics with superconducting circuits relies on the Josephson junction for a negative Kerr nonlinearity that is much weaker than its associated linear energy. Recently, a new superconducting qubit known as the "Quarton" can offer non-perturbatively strong nonlinearity. Here, we demonstrate the general principle of using the Quarton's positive Kerr and zero linear energy to perform nonlinearity engineering, i.e. the selective design of the nonlinear properties of microwave artificial atoms, metamaterials, and photons in a manner that (to the best of our knowledge) has no optical analog. We show that for Quarton mediated light-matter coupling, the Quarton can erase or amplify the nonlinearity of artificial atoms and metamaterials. Without nonlinearity, matter behaves light-like and we find (to our best knowledge) the first theoretical demonstration of cross-Kerr between linear microwave photon modes. We extend these fundamental results and provide a practical application by designing a Josephson traveling wave photon detector
by Yufeng Ye.
S.M.
S.M. Massachusetts Institute of Technology, Department of Electrical Engineering and Computer Science
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Books on the topic "Nonlinearità"

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Institute of Physics (Great Britain). Nonlinearity. Bristol, England: Institute of Physics and the London Mathematical Society, 1988.

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Ivancevic, Vladimir G., and Tijana T. Ivancevic. Complex Nonlinearity. Berlin, Heidelberg: Springer Berlin Heidelberg, 2008. http://dx.doi.org/10.1007/978-3-540-79357-1.

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Sengupta, A., ed. Chaos, Nonlinearity, Complexity. Berlin, Heidelberg: Springer Berlin Heidelberg, 2006. http://dx.doi.org/10.1007/3-540-31757-0.

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Abdullaev, Fatkulla, Alan R. Bishop, and Stephanos Pnevmatikos, eds. Nonlinearity with Disorder. Berlin, Heidelberg: Springer Berlin Heidelberg, 1992. http://dx.doi.org/10.1007/978-3-642-84774-5.

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Bishop, Alan R., David K. Campbell, and Stephanos Pnevmatikos, eds. Disorder and Nonlinearity. Berlin, Heidelberg: Springer Berlin Heidelberg, 1989. http://dx.doi.org/10.1007/978-3-642-74893-6.

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Control and nonlinearity. Providence, R.I: American Mathematical Society, 2007.

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Bishop, Alan R., David K. Campbell, Pradeep Kumar, and Steven E. Trullinger, eds. Nonlinearity in Condensed Matter. Berlin, Heidelberg: Springer Berlin Heidelberg, 1987. http://dx.doi.org/10.1007/978-3-642-83033-4.

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Delsanto, Pier Paolo, ed. Universality of Nonclassical Nonlinearity. New York, NY: Springer New York, 2006. http://dx.doi.org/10.1007/978-0-387-35851-2.

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Shao, Yang, and National Institute of Standards and Technology (U.S.), eds. Optical detector nonlinearity: Simulation. Boulder, Colo: U.S. Dept. of Commerce, Technology Administration, National Institute of Standards and Technology, 1995.

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Shao, Yang, and National Institute of Standards and Technology (U.S.), eds. Optical detector nonlinearity: Simulation. Boulder, Colo: U.S. Dept. of Commerce, Technology Administration, National Institute of Standards and Technology, 1995.

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Book chapters on the topic "Nonlinearità"

1

Frank, Steven A. "Nonlinearity." In Control Theory Tutorial, 79–84. Cham: Springer International Publishing, 2018. http://dx.doi.org/10.1007/978-3-319-91707-8_10.

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Weik, Martin H. "nonlinearity." In Computer Science and Communications Dictionary, 1108. Boston, MA: Springer US, 2000. http://dx.doi.org/10.1007/1-4020-0613-6_12432.

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Wang, Wenlei, Jie Zhao, and Qiuming Cheng. "Nonlinearity." In Encyclopedia of Mathematical Geosciences, 1–6. Cham: Springer International Publishing, 2021. http://dx.doi.org/10.1007/978-3-030-26050-7_227-1.

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Gu, Qizheng. "Nonlinearity Analysis." In RF Tunable Devices and Subsystems: Methods of Modeling, Analysis, and Applications, 67–81. Cham: Springer International Publishing, 2014. http://dx.doi.org/10.1007/978-3-319-09924-8_4.

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Yu, Cheng-Ching. "Process Nonlinearity." In Advances in Industrial Control, 129–52. London: Springer London, 1999. http://dx.doi.org/10.1007/978-1-4471-3636-1_7.

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Weik, Martin H. "phase nonlinearity." In Computer Science and Communications Dictionary, 1261. Boston, MA: Springer US, 2000. http://dx.doi.org/10.1007/1-4020-0613-6_13928.

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Semmlow, John L., and Benjamin Griffel. "Nonlinearity Detection." In BIOSIGNAL and MEDICAL IMAGE PROCESSING, 357–91. 3rd ed. Boca Raton: CRC Press, 2021. http://dx.doi.org/10.1201/b16584-11.

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Niazi, Sarfaraz K. "Understanding Nonlinearity." In The Future of Pharmaceuticals, 1–22. Boca Raton: CRC Press, 2022. http://dx.doi.org/10.1201/9781003146933-1.

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Pariseau, William G. "Material nonlinearity." In Notes on Numerical Modeling in Geomechanics, 53–56. London: CRC Press, 2022. http://dx.doi.org/10.1201/9781003166283-10.

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Wang, Jing, Jinglin Zhou, and Xiaolu Chen. "New Robust Projection to Latent Structure." In Intelligent Control and Learning Systems, 211–32. Singapore: Springer Singapore, 2022. http://dx.doi.org/10.1007/978-981-16-8044-1_12.

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AbstractIn many actual nonlinear systems, especially near the equilibrium point, linearity is the primary feature and nonlinearity is the secondary feature. For the system that deviates from the equilibrium point, the secondary nonlinearity or local structure feature can also be regarded as the small uncertainty part, just as the nonlinearity can be used to represent the uncertainty of a system (Wang et al. 2019). So this chapter also focuses on how to deal with the nonlinearity in PLS series method, but starts from an different view, i.e., robust PLS. Here the system nonlinearity is considered as uncertainty and a new robust $$\mathrm{L}_1$$ L 1 -PLS is proposed.
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Conference papers on the topic "Nonlinearità"

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AERTS, DIEDERIK. "BEING AND CHANGE: FOUNDATIONS OF A REALISTIC OPERATIONAL FORMALISM." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0004.

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KUNA, MACIEJ, and JAN NAUDTS. "COVARIANCE APPROACH TO THE FREE PHOTON FIELD." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0018.

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"FRONT MATTER." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_fmatter.

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AERTS, DIEDERIK, MAREK CZACHOR, and THOMAS DURT. "PROBING THE STRUCTURE OF QUANTUM MECHANICS." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0001.

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AERTS, DIEDERIK, and FRANK VALCKENBORGH. "THE LINEARITY OF QUANTUM MECHANICS AT STAKE: THE DESCRIPTION OF SEPARATED QUANTUM ENTITIES." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0002.

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AERTS, DIEDERIK, and FRANK VALCKENBORGH. "LINEARITY AND COMPOUND PHYSICAL SYSTEMS: THE CASE OF TWO SEPARATED SPIN 1/2 ENTITIES." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0003.

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DURT, THOMAS, and BART D'HOOGHE. "THE CLASSICAL LIMIT OF THE LATTICE-THEORETICAL ORTHOCOMPLEMENTATION IN THE FRAMEWORK OF THE HIDDEN-MEASUREMENT APPROACH." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0005.

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AERTS, DIEDERIK, and DIDIER DESES. "STATE PROPERTY SYSTEMS AND CLOSURE SPACES: EXTRACTING THE CLASSICAL EN NONCLASSICAL PARTS." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0006.

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AERTS, SVEN. "HIDDEN MEASUREMENTS FROM CONTEXTUAL AXIOMATICS." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0007.

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DURT, THOMAS, JACQUES BAUDON, RENAUD MATHEVET, JACQUES ROBERT, and BRUNO VIARIS DE LESEGNO. "MEMORY EFFECTS IN ATOMIC INTERFEROMETRY: A NEGATIVE RESULT." In Nonlinearity, Nonlocality, Computation and Axiomatics. WORLD SCIENTIFIC, 2002. http://dx.doi.org/10.1142/9789812778024_0008.

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Reports on the topic "Nonlinearità"

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Yang, Shao. Optical detector nonlinearity :. Gaithersburg, MD: National Bureau of Standards, 1995. http://dx.doi.org/10.6028/nist.tn.1376.

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Fleischer, Jason. Dynamical Imaging using Spatial Nonlinearity. Fort Belvoir, VA: Defense Technical Information Center, January 2014. http://dx.doi.org/10.21236/ada597107.

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Savit, R. [Growth and nonlinearity]. Progress report. Office of Scientific and Technical Information (OSTI), December 1993. http://dx.doi.org/10.2172/10128447.

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Bishop, A. R., K. M. Beardmore, and E. Ben-Naim. Nonlinearity in structural and electronic materials. Office of Scientific and Technical Information (OSTI), November 1997. http://dx.doi.org/10.2172/548715.

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Whitehead, Stuart A. Balancing Tyche: Nonlinearity and Joint Operations. Fort Belvoir, VA: Defense Technical Information Center, April 2003. http://dx.doi.org/10.21236/ada415739.

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Pinkston, Bobby R. Logistics and Nonlinearity: A Philosophical Dilemma. Fort Belvoir, VA: Defense Technical Information Center, January 1996. http://dx.doi.org/10.21236/ada309951.

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Kim, Chang-Jin, James Morley, and Jeremy M. Piger. Nonlinearity and the Permanent Effects of Recessions. Federal Reserve Bank of St. Louis, 2002. http://dx.doi.org/10.20955/wp.2002.014.

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Vayshenker, Igor, Shao Yang, Xiaoyu Li, Thomas R. Scott, and Christopher L. Cromer. Optical fiber power meter nonlinearity calibrations at NIST. Gaithersburg, MD: National Institute of Standards and Technology, 2000. http://dx.doi.org/10.6028/nist.sp.250-56.

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Kovalchuk, Vasyl. On New Ideas of Nonlinearity in Quantum Mechanics. GIQ, 2015. http://dx.doi.org/10.7546/giq-16-2015-195-206.

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Morley, James, and Jeremy M. Piger. The Importance of Nonlinearity in Reproducing Business Cycle Features. Federal Reserve Bank of St. Louis, 2004. http://dx.doi.org/10.20955/wp.2004.032.

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