Interpretation of frequency modulation atomic force microscopy in terms of fractional calculusSADER, John E; JARVIS, Suzanne P.Physical review B. Condensed matter and materials physics. 2004, Vol 70, Num 1, pp 012303.1-012303.3, issn 1098-0121Article

Two classes of self-similar stable processes with stationary incrementsCAMBANIS, S; MAEJIMA, M.Stochastic processes and their applications. 1989, Vol 32, Num 2, pp 305-329, issn 0304-4149, 25 p.Article

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Hamiltonian formalism of fractional systemsSTANISLAVSKY, A. A.The European physical journal. B, Condensed matter physics. 2006, Vol 49, Num 1, pp 93-101, issn 1434-6028, 9 p.Article

The fractional mixed fractional Brownian motionEL-NOUTY, Charles.Statistics & probability letters. 2003, Vol 65, Num 2, pp 111-120, issn 0167-7152, 10 p.Article

Fractional Tajimi-Kanai model for simulating earthquake ground motionALOTTA, G; DI PAOLA, M; PIRROTTA, A et al.Bulletin of earthquake engineering (Print). 2014, Vol 12, Num 6, pp 2495-2506, issn 1570-761X, 12 p.Article

Scaling limit for trap models on Z^dBEN AROUS, Gérard; CERNY, Jiri.Annals of probability. 2007, Vol 35, Num 6, pp 2356-2384, issn 0091-1798, 29 p.Article

Processus fractionnairesGoncalves Carvalho, Esmeralda; Gouriéroux, Christian.1988, 260 p.Thesis

Convergence to fractional kinetics for random walks associated with unbounded conductancesBARLOW, Martin T; CERNY, Jiří.Probability theory and related fields. 2011, Vol 149, Num 3-4, pp 639-673, issn 0178-8051, 35 p.Article

s^k-p Fractional factorial designs in s^b blocksHUANG, Mong-Na Lo; WONG, Kam-Fai.Metrika (Heidelberg). 2002, Vol 56, Num 2, pp 163-170, issn 0026-1335, 8 p.Article

Upper classes for the increments of the fractional Wiener processGRILL, K.Probability theory and related fields. 1991, Vol 87, Num 4, pp 411-416, issn 0178-8051, 6 p.Article

Memory properties and fractional integration in transportation time-seriesKARLAFTIS, Matthew G; VLAHOGIANNI, Eleni I.Transportation research. Part C, Emerging technologies. 2009, Vol 17, Num 4, pp 444-453, issn 0968-090X, 10 p.Article

Complex and higher order fractional curl operator in electromagneticsNAQVI, Q. A; ABBAS, M.Optics communications. 2004, Vol 241, Num 4-6, pp 349-355, issn 0030-4018, 7 p.Article

Parameter estimation for fractional Ornstein-Uhlenbeck processesYAOZHONG HU; NUALART, David.Statistics & probability letters. 2010, Vol 80, Num 11-12, pp 1030-1038, issn 0167-7152, 9 p.Article

Small deviations for fractional stable processesLIFSHITS, Mikhail; SIMON, Thomas.Annales de l'I.H.P. Probabilités et statistiques. 2005, Vol 41, Num 4, pp 725-752, issn 0246-0203, 28 p.Article

Estimation of the self-similarity parameter using the wavelet transformSOLTANI, S; SIMARD, P; BOICHU, D et al.Signal processing. 2004, Vol 84, Num 1, pp 117-123, issn 0165-1684, 7 p.Article

Limit theorems for continuous-time random walks with infinite mean waiting timesMEERSCHAERT, Mark M; SCHEFFLER, Hans-Peter.Journal of applied probability. 2004, Vol 41, Num 3, pp 623-638, issn 0021-9002, 16 p.Article

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Fractional-order system identification based on continuous order-distributionsHARTLEY, Tom T; LORENZO, Carl F.Signal processing. 2003, Vol 83, Num 11, pp 2287-2300, issn 0165-1684, 14 p.Article

Fully discrete random walks for space-time fractional diffusion equationsGORENFLO, Rudolf; VIVOLI, Alessandro.Signal processing. 2003, Vol 83, Num 11, pp 2411-2420, issn 0165-1684, 10 p.Article

A stochastic maximum principle for processes driven by fractional Brownian motionBIAGINI, Francesca; YAOZHONG HU; ØKSENDAL, Bernt et al.Stochastic processes and their applications. 2002, Vol 100, pp 233-253, issn 0304-4149Article