Advanced search
Publication Cover
Stochastic Analysis and Applications Volume 31, 2013 - Issue 3
Submit an article Journal homepage
116
Views
11
CrossRef citations to date
0
Altmetric
Original Articles

Macroscaling Limit Theorems for Filtered Spatiotemporal Random Fields

V. V. Anh School of Mathematical Sciences, Queensland University of Technology, Brisbane, Queensland, AustraliaCorrespondence[email protected]
,
N. N. Leonenko School of Mathematics, Cardiff University, Cardiff, UK
&
M. D. Ruiz-Medina Department of Statistics and Operations Research, University of Granada, Granada, Spain
Pages 460-508 | Received 11 Sep 2012, Accepted 20 Sep 2012, Published online: 18 Apr 2013

References

  • Albeverio , S. , Molchanov , S.A. , and Surgailis , D. 1994 . Stratified structure of the Universe and Burgers’ equation: A probabilistic approach . Prob. Theor. Rel. Fields 100 : 457 – 484 .
  • Anderson , T.W. 1971 . The Statistical Analysis of Time Series . Wiley , New York .
  • Anh , V.V. , and Leonenko , N.N. 1999 . Non-Gaussian scenarios for the heat equation with singular initial conditions . Stoch. Proc. Appl. 84 : 91 – 114 .
  • Anh , V.V. , and Leonenko , N.N. 2001 . Spectral analysis of fractional kinetic equations with random data . J. Statist. Phys. 104 : 1349 – 1387 .
  • Anh , V.V. , and Leonenko , N.N. 2002 . Renormalization and homogenization of fractional diffusion equations with random data . Prob. Theor. Rel. Fields 124 : 381 – 408 .
  • Anh , V.V. , and Leonenko , N.N. 2003 . Spectral theory of renormalized fractional random fields . Theory Probab. Math. Statist. 66 : 1 – 13 .
  • Anh , V.V. , Leonenko , N.N. , and Sakhno , L.M. 2006 . Spectral properties of Burgers and KPZ turbulence . J. Statist. Phys. 122 : 949 – 974 .
  • Avram , F. , Leonenko , N.N. , and Sakhno , L. 2010. On Szëgo type limit theorem, the Hölder—Young-Brascamp-Lieb inequality, and asymptotic theory of integrals and quadratic forms of stationary fields. ESAIM: Probablity and Statistics 14:210–255.
  • Bateman , H. , and Erdelyi , A. 1953 . Higher Transcendental Functions . Vol. II . McGraw-Hill , New York .
  • Berk , K.N. 1973 . A central limit theorems for m-dependent random variables with unbounded m . Ann. Probab. 1 : 352 – 354 .
  • Berman , S. 1984 . Sojourns of vector Gaussian processes inside and outside spheres . Z. Wahrsch. Verw. Gebiete 66 : 529 – 542 .
  • Berman , S. 1992 . A central limit theorem for the renormalized self-intersection local time of a stationary vector Gaussian process . Ann. Probab. 20 : 61 – 81 .
  • Bertini , L. , and Cancrini , N. 1995 . The stochastic heat equation: Feynman-Kac formula and intermittence . J. Stat. Physics. 78 : 1377 – 1401 .
  • Bertoin , J. 1998 . The inviscid Burgers equation with Brownian initial velocity . Commun. Math. Phys. 193 : 397 – 406 .
  • Breuer , P. , and Major , P. 1983 . Central limit theorem for non-linear functionals of Gaussian fields . J. Multiv. Anal. 13 : 425 – 441 .
  • Bulinski , A.V. , and Molchanov , S.A. 1991 . Asymptotic Gausianness of solutions of the Burgers equation with random initial conditions . Theor. Prob. Appl. 36 : 217 – 235 .
  • Burgers , J. 1974 . The Nonlinear Diffusion Equation . Kluwer , Dordrecht .
  • Chorin , A.J. 1975 . Lecture Notes in Turbulence . Berkeley , CA .
  • Davydov , Y. , and Paulauskas , V. 2009 . On estimation of parameter for spatial autoregressive model . Statistical Inference for Stochastic Processes 11 : 237 – 247 .
  • Deriev , I. , and Leonenko , N. 1997 . Limit Gaussian behavior of the solutions of the multidimensional Burgers’ equation with weak-dependent initial conditions . Acta Applicandae Math. 47 : 1 – 18 .
  • Dermone , A. , Hamadene , S. , and Ouknine , Y. 1999 . Limit theorems for statistical solution of Burgers equation . Stoch. Proc. Appl. 81 : 217 – 230 .
  • Diananda , P.H. 1955 . The central limit theorem for m-dependent random variables . Proc. Cambridge Phil. Soc. 51 : 92 – 95 .
  • Djrbashian , M.M. 1993 . Harmonic Analysis and Boundary Value Problems in Complex Domain . Birkhäuser , Boston .
  • Dobrushin , R.L. , and Major , P. 1979 . Non-central limit theorems for nonlinear fuctionals of Gaussian fields . Z. Wahrsch. verw. Gebiete 50 : 1 – 28 .
  • Dozzi , M. , and Leonenko , N.N. 2011 . Stochastic processes and fields with given marginals and correlation structure, preprint.
  • Frisch , U. 1995 . Turbulence . Cambridge University Press , Cambridge , UK .
  • Fyodorov , Y.V. , Le Doussal , P. , and Rosso , A. 2010 . Freezing transition in decaying Burgers turbulence and random matrix dualities . Europhysics Letters 90 : 60004 (6pages) .
  • Gajek , L. , and Mielniczuk , J. 1999 . Long- and short-range dependent sequences under exponential subordination . Statist. Probab. Letters 43 : 113 – 121 .
  • Gurbatov , S. , Malakhov , A. , and Saichev , A. 1991 . Non-linear Waves and Turbulence in Nondispersive Media: Waves, Rays and Particles . Manchester University Press , Manchester , UK .
  • Hoeffding , K.J. , and Robbins , H. 1948 . The central limit theorem for dependent random variables . Duke Math. J. 3 : 201 – 230 .
  • Hopf , E. 1950 . The partial differential equation u x  + uu x  = μu xx . Commun. Pure Appl. Math. 3 : 201 – 230 .
  • Ivanov , A.V. , and Leonenko , N.N. 1989 . Statistical Analysis of Random Fields . Kluwer , Dordrecht .
  • Iribarren , I. , and León , J.R. 2006 . Central limit theorem for solutions of random initialized differential equations: A simple proof . J. Appl. Math. Stoch. Anal. 2006 : 1 – 20 .
  • Joe , H. 1997 . Multivariate Models and Dependent Concepts . Chapman and Hall , London .
  • Kampé de Ferier . 1955. Random solutions of the partial differential equations. In Proceedings of the 3rd Berkeley Symposium on Mathematical Statistics and Probability , University of California Press , Berkley , California , Vol. 3, pp. 199–208.
  • Lancaster , H. O. 1969 . The Chi-squared Distribution . Wiley , New York .
  • Leonenko , N. 1999 . Limit Theorems for Random Fields with Singular Spectrum . Kluwer , Dordrecht .
  • Leonenko , N. , Orsingher , E. , and Parkhomenko , N. 1995 . On the rate of convergence to the normal law for solutions of the Burgers equation with singular initial data . J. Statist. Phys. 82 : 915 – 930 .
  • Leonenko , N.N. , and Ruiz-Medina , M.D. 2006 . Scaling laws for the multidimensional Burgers equation with quadratic external potential . J. Stat. Physics 124 : 191 – 205 .
  • Leonenko , N.N. , and Ruiz-Medina , M.D. 2006 . Strongly dependent Gaussian scenarios for the Burgers turbulence problem with quadratic external potential . Random Operators and Stochastic Equations 14 : 259 – 274 .
  • Leonenko , N.N. , and Ruiz-Medina , M.D. 2008 . Gaussian scenario for the heat and Burgers equations with quadratic external potential and weakly dependent data with applications . Methodology and Computing in Applied Probability 10 : 595 – 620 .
  • Leonenko , N.N. , and Ruiz-Medina , M.D. 2010 . Spatial scaling for randomly initialized heat and Burgers equation with quadratic potential . Stoch. Anal. Appl. 28 : 1 – 19 .
  • Leonenko , N.N. , and Woyczynski , W.A. 1998 . Exact parabolic asymptotics for singularn–𝒟 Burgers random fields: Gaussian approximation . Stoch. Proc. Appl. 76 : 141 – 165 .
  • Leonenko , N.N. , and Woyczynski , W.A. 1999 . Scaling limits of solutions of the heat equation for singular non-Gaussian data . J. Stat. Phys. 91 : 423 – 438 .
  • Liu , G.-R. , and Shieh , N.-R. 2010 . Scaling limit for some P.D.E. systems with random initial conditions . Stoch. Anal. Appl. 28 : 505 – 522 .
  • Liu , G.-R. , and Shieh , N.-R. 2010 . Scaling limit for some P.D.E. systems with random initial conditions . Stoch. Dyn. 10 : 1 – 35 .
  • Liu , G.-R. , and Shieh , N.-R. 2011 . Homogenization of fractional kinetic systems with random initial data . Elect. J. Probab. 16 : 965 – 980 .
  • Malevich , T.L. 1969 . Asymptotic normality of the number of the crossings of level zero by a Gaussian processes . Theor. Prob. Appl. 14 : 287 – 295 .
  • Mielniczuk , J. 2000 . Some properties of random stationary sequences with bivariate densities having diogonal expansions and parametric estimations based on them . Nonparametric Statistics 12 : 223 – 243 .
  • Molchanov , S.A. , Surgailis , D. , and Woyczynski , W.A. 1995 . Hyperbolic asymptotics in Burgers turbulence . Commun. Math. Phys. 168 : 209 – 226 .
  • Molchanov , S.A. , Surgailis , D. , and Woyczynski , W.A. 1997 . The large-scale structure of the Universe and quasi-Voronoi tessellation of shock fronts in forced Burgers turbulence in ℝ d . Ann. Appl. Prob. 7 : 220 – 223 .
  • Paulauskas , V. 2010 . On Beveridge-Nelson decomposition. Nelson and limit theorems for linear random fields . J. Multivariate Anal. 101 : 621 – 639 .
  • Peccati , G. , and Taqqu , M.S. 2010 . Wiener Chaos: Moments, Cumulants and Diagrams . Springer , Berlin .
  • Peccati , G. , and Tudor , C.A. 2005 . Gaussian limits for vector-valued multiple stochastic integrals . Lectures Notes in Math. Sé minaire de Probabilités XXXVIII : 247 – 262 .
  • Romano , J.P. , and Wolf , M. 2000 . A more general central limit theorem for m-dependent random variables with unbounded m . Statist. Probab. Lett. 47 : 115 – 124 .
  • Rosenblatt , M. 1968 . Some remark on the Burgers equation . J. Math. Phys. 9 : 1129 – 1136 .
  • Rosenblatt , M. 1987 . Scale renormalization and random solutions of Burgers equation . J. Appl. Prob. 24 : 328 – 338 .
  • Ruiz-Medina , M.D. 2011 . Spatial autoregressive and moving average Hilbertian processes . J. Multivariate Anal. 102 : 292 – 305 .
  • Ruiz-Medina , M.D. , Angulo , J.M. , and Anh , V.V. 2003. Fractional generalized random fields on bounded domains. Stoch. Anal. Appl. 21:465–492.
  • Ryan , R. 1998 . The statistics of Burgers turbulence initiated with fractional Brownian-noise data . Commun. Math. Phys. 191 : 1008 – 1038 .
  • Sarmanov , O.V. 1961 . Investigation of stationary Markov processes by the method of eigenfunction expansion . Trudy Math. Inst. Steklov 60 : 238 – 261 . (English translation: Selected Transl. Math. Stat. and Prob. I, Amercian Mathematical Society, Providence, RI, 1963, 245–269.
  • Sinai , Ya. G. 1992 . Statistics of shocks in solutions of inviscid Burgers equation . Commun. Math. Phys. 148 : 601 – 621 .
  • Stein , E.M. 1970 . Singular Integrals and Differential Properties of Functions . Princeton University Press , Princeton , NJ .
  • Taqqu , M.S. 1975 . Weak convergence to fractional Brownian motion and to the Rosenblatt process . Z. Wahrsch. verw. Gebiete 31 : 287 – 302 .
  • Taqqu , M.S. 1979 . Convergence of integrated processes of arbitrary Hermite rank . Z. Wahrsch. verw. Gebiete 40 : 203 – 238 .
  • Woyczynski , W.A. 1998 . Burgers-KPZ Turbulence . Göttingen Lectures. Lecture Notes in Mathematics 1706 , Springer-Verlag , Berlin .

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.