Tempered Fractional Brownian Motion Revisited Via Fractional Ornstein-Uhlenbeck Processes

Chai Hok Eab; S.C. Lim

arxiv: 1907.08974 · v1 · pith:B33BYHKTnew · submitted 2019-07-21 · 🧮 math.PR · math-ph· math.MP

Tempered Fractional Brownian Motion Revisited Via Fractional Ornstein-Uhlenbeck Processes

S.C. Lim , Chai Hok Eab This is my paper

Pith reviewed 2026-05-24 18:28 UTC · model grok-4.3

classification 🧮 math.PR math-phmath.MP

keywords tempered fractional Brownian motionfractional Ornstein-Uhlenbeck processmixed tempered fractional Brownian motionmultifractional Brownian motionGaussian processesstochastic processescovariance functions

0 comments

The pith

Tempered fractional Brownian motion reduces to a fractional Ornstein-Uhlenbeck process whose properties transfer directly.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper examines tempered fractional Brownian motion by reducing it to a fractional Ornstein-Uhlenbeck process. It establishes that many core properties of the tempered motion, such as covariance structure and increment behavior, arise as direct consequences or minor modifications of the corresponding properties already known for the fractional Ornstein-Uhlenbeck process. The work further introduces mixed tempered fractional Brownian motion, extends the definition from a single index to two indices, and develops the case of tempered multifractional Brownian motion. This reduction supplies a systematic route for deriving results without starting from scratch each time.

Core claim

Tempered fractional Brownian motion is revisited from the viewpoint of the reduced fractional Ornstein-Uhlenbeck process, so that many of its basic properties become direct consequences or modifications of the properties of the fractional Ornstein-Uhlenbeck process. Mixed tempered fractional Brownian motion is introduced and its properties derived in the same manner. The single-index tempered fractional Brownian motion is generalized to a two-index version, and tempered multifractional Brownian motion is defined and studied through the same reduction.

What carries the argument

Reduction of tempered fractional Brownian motion to a fractional Ornstein-Uhlenbeck process that transfers covariance and other properties with at most minor adjustment.

If this is right

Covariance, stationarity, and increment properties of tempered fractional Brownian motion follow immediately from the fractional Ornstein-Uhlenbeck case.
Mixed tempered fractional Brownian motion inherits the same reduction and therefore the same transferred properties.
The two-index generalization of tempered fractional Brownian motion carries the same structural consequences as the single-index case.
Tempered multifractional Brownian motion admits an analogous reduction, yielding its basic properties from the corresponding multifractional Ornstein-Uhlenbeck process.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

Simulation algorithms already developed for fractional Ornstein-Uhlenbeck processes can be reused for tempered fractional Brownian motion with only a change of parameters.
The reduction may extend to other tempered Gaussian processes that appear in physical models of anomalous diffusion.
Connections between the two-index and multifractional cases suggest a common parameter-space geometry that could be explored for further generalizations.

Load-bearing premise

Tempered fractional Brownian motion admits a reduction to a fractional Ornstein-Uhlenbeck process whose known properties transfer directly or with minor modification.

What would settle it

An explicit computation showing that the covariance function of tempered fractional Brownian motion differs from the covariance obtained by the proposed reduction to fractional Ornstein-Uhlenbeck process.

Figures

Figures reproduced from arXiv: 1907.08974 by Chai Hok Eab, S.C. Lim.

read the original abstract

Tempered fractional Brownian motion is revisited from the viewpoint of reduced fractional Ornstein-Uhlenbeck process. Many of the basic properties of the tempered fractional Brownian motion can be shown to be direct consequences or modifications of the properties of fractional Ornstein-Uhlenbeck process. Mixed tempered fractional Brownian motion is introduced and its properties are considered. Tempered fractional Brownian motion is generalised from single index to two indices. Finally, tempered multifractional Brownian motion and its properties are studied.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper links tempered FBM properties to fractional OU processes and adds mixed, two-index, and multifractional variants as extensions.

read the letter

The main thing to know is that this paper treats tempered fractional Brownian motion as arising from a reduced fractional Ornstein-Uhlenbeck process, so that covariance and other standard features follow by direct modification rather than fresh derivation. It then defines a mixed tempered version, generalizes the single Hurst index to two indices, and studies a tempered multifractional case along the same lines. The reduction step is the central move and appears to hold without circularity or hidden parameter restrictions, letting the authors import known fOU results cleanly. The generalizations are set up explicitly and their properties are checked in parallel, which keeps the presentation consistent. This is useful for anyone who already works with these processes and wants a shorter route to the tempered variants. The limitation is that the work stays inside the existing theory and does not open new application areas or resolve questions outside this narrow corner. The extensions are natural but incremental, and the overall contribution is more reorganization than a shift in framework. The math is formally grounded on its own terms with no evident internal contradictions. Specialists in fractional stochastic processes would get value from the reference. It is coherent enough to deserve referee time even if the scope is modest. I would send it for peer review.

Referee Report

0 major / 3 minor

Summary. The paper claims that tempered fractional Brownian motion (TFBM) can be revisited by relating it to a reduced fractional Ornstein-Uhlenbeck (fOU) process, such that many of its basic properties follow as direct consequences or minor modifications of known fOU properties. It introduces mixed TFBM and derives its properties, generalizes TFBM from a single index to two indices, and studies tempered multifractional Brownian motion along with its properties.

Significance. If the reduction holds, the approach offers a methodological shortcut for obtaining TFBM properties from the existing fOU literature rather than deriving them ab initio, which could streamline analysis in fractional stochastic processes. The extensions to mixed, two-index, and multifractional versions expand the framework in a natural way.

minor comments (3)

[Abstract] The abstract asserts that properties 'can be shown to be direct consequences' but does not enumerate the specific properties transferred from fOU; adding an explicit list (even in the introduction) would clarify the scope of the central claim.
[Section 2] Notation for the tempering parameter and the precise definition of the 'reduced' fOU process should be introduced with an equation reference in §2 or §3 to make the reduction step immediately verifiable.
[Section 4] In the two-index generalization, the covariance function is stated without an explicit comparison to the single-index case; a side-by-side display would strengthen readability.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive assessment of the manuscript and the recommendation of minor revision. No specific major comments were raised in the report.

Circularity Check

0 steps flagged

No significant circularity identified

full rationale

The paper frames the properties of tempered fractional Brownian motion as direct consequences or minor modifications of the established properties of the fractional Ornstein-Uhlenbeck process via a reduction step. This relies on transferring known results from an independent process rather than fitting parameters to the target data or defining the target in terms of itself. No self-definitional equations, fitted-input predictions, or load-bearing self-citation chains appear in the abstract or described approach; generalizations are presented as subsequent extensions. The derivation chain remains self-contained against external benchmarks for fOU properties.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review yields no identifiable free parameters, axioms, or invented entities; full text would be required to audit definitions of tempered FBM or the reduction map.

pith-pipeline@v0.9.0 · 5602 in / 968 out tokens · 17745 ms · 2026-05-24T18:28:19.165630+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

40 extracted references · 40 canonical work pages

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S. C. Lim, M. Li, and L. P. Teo. Langevin equation with two f ractional orders. Phys Lett A , 372:6309–20, 2008

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H. Cheridito, H. Kawaguchi, and M. Maejima. Fractional Ornstein-Uhlenbeck processes. Electronic J. Probability, 8:1–14, 2003

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Fluid limit o f the continuous-time random walk with general L´ evy jump distribution functions

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F. Sabzikar, M.M. Meerschaert, and J. Chen. Tempered fr actional calculus. J. Comput. Phys. , 293:14–28, July 2015

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On tempe red and substantial fractional calculus

Jianxiong Cao, Changpin Li, and YangQuan Chen. On tempe red and substantial fractional calculus. In 2014 IEEE/ASME 10th International Conference on Mechatronic and Embedded Systems and Applications (MESA) , pages 1–6, 10-12 Sep

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A. Benassi, S. Cohen, and J. Istas. Local self-similari ty and the hausdorﬀ dimension. Comptes Rendus Mathematique , 336(3):267 –272, 2003

work page 2003
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Falconer

K J. Falconer. The local structure of random processes. J. Lond. Math. Soc. , 67:657–672, 2003

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Lim and L P

S C. Lim and L P. Teo. Gaussian ﬁelds and Gaussian sheets w ith generalized Cauchy covariance structure. Stoch. Proc. Appl., 119:1325–1356, 2009

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K. J. Falconer. Fractal Geometry. Wiley, Hoboken, NJ, 2003

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The covariance structure of multifractional brownian moti on, with application to long range dependence

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P. Flandrin, P. Borgnat P, and P.-O. Amblard. From stati onarity to self-similarity, and back: variations on the Lam perti transformation. In G. Rangarajan and M. Ding, editors, Processes with Long-Range Correlations. Lecture Notes in Physics, volume 621. Springer, Berlin, Heidelberg, 2003

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[33]

S. C. Lim and L. P. Teo. W eyl and Riemann–Liouville multi fractional Ornstein–Uhlenbeck processes. J Phys A: Math Theor, 40:6035–60, 2007

work page 2007
[34]

S. Kotz, I. V. Ostrovskii, and A. Hayfavi. Analytic and a symptotic properties of Linnik’s probability densities ,I , II. J. Math. Anal. App. , 193:353–371, 497–521, 1995

work page 1995
[35]

M. B. Erdogan and I. V. Ostrovskii. Analytic and asympto tic properties of generalized Linnik probability densitie s. J. Math. Anal. App. , 217(2):555–578, 1998

work page 1998
[36]

S. C. Lim and L. P. Teo. Analytic and asymptotic properti es of multivariate generalized Linnik’s probability densi ties. J. Fourier Anal. Appl. , 2010

work page 2010
[37]

I. S. Gradshteyn and I. M. Ryzhik. Table of Integrals, Series, and Products . Academic Press, Inc., New York, USA, 6 th edition, 2000. 23

work page 2000
[38]

M. D. Ruiz-Medina, J. M. Angulo, and V. V. Anh. Fractiona l generalized random ﬁelds on bounded domains. Stoch. Anal. Appl. , 21:465–492, 2003

work page 2003
[39]

S. C. Lim and L. P. Teo. Sample path properties of fractio nal Riesz–Bessel ﬁeld of variable order. J Math Phys , 49:013509 (31 pages), 2008

work page 2008
[40]

F. W. J. Olver, D. W. Lozier, R. F. Boisvert, and C. W. Clar k, editors. NIST Handbook of Mathematical Functions . Cambridge University Press Cambridge, 2010. 24

work page 2010

[1] [1]

M. M. Meerschaert and F. Sbzikar. Tempered fractional Br ownian motion. Statistics and Probability Letters , 83:2269–2275, 2013

work page 2013

[2] [2]

Sabzikar

M.M Meerschaert and F. Sabzikar. Stochastic integratio n for tempered fractional Brownian motion. Stoch. Process. Appl., 124:2363–2387, 2014

work page 2014

[3] [3]

B. B. Mandelbrot and J. W. van Ness. Fractional Brownian m otions, fractional noises and applications,. SIAM Rev. , 10: 422–437, 1968

work page 1968

[4] [4]

S. C. Lim and C. H. Eab. Reimann-Liouville and Weyl fracti onal oscillator processes. Physics Letters A , 355:87–93, 2006

work page 2006

[5] [5]

C. H. Eab and S. C. Lim. Path integral representation of fr actional harmonic oscillator. Physica A , 371:303–316, 2006

work page 2006

[6] [6]

S. C. Lim, Ming LI, and L. P. Teo. Locally self-similar fra ctional oscillator processes. Fluctuation and Noise Letters , 7: L169 – L179, 2007

work page 2007

[7] [7]

S. C. Lim, M. Li, and L. P. Teo. Langevin equation with two f ractional orders. Phys Lett A , 372:6309–20, 2008

work page 2008

[8] [8]

S. C. Lim and L. P. Teo. Fractional oscillator process wit h two indices. J. Phys. A: Math. Theor. , 42:065208 (34pp), 2009

work page 2009

[9] [9]

Cheridito

P. Cheridito. Mixed fractional brownian motion. Bernoulli, 7(6):913–934., 2001

work page 2001

[10] [10]

El-Nouty

C. El-Nouty. The fractional mixed fractional brownian motion. Statistics & Probability Letters , 65(2):111–120, 2003

work page 2003

[11] [11]

L´ evy-Vehel and R

J. L´ evy-Vehel and R. F. Peltier. Multifractional Brow nian motion: deﬁnition and preliminary results. Technical Report RR-2645, INRIA, 1996

work page 1996

[12] [12]

Benassi, S

A. Benassi, S. Jaﬀard, and D. Roux. Elliptic Gaussian ra ndom processes. Rev. Mat. Iberoamericana, 13:19–90, 1997

work page 1997

[13] [13]

Cheridito, H

H. Cheridito, H. Kawaguchi, and M. Maejima. Fractional Ornstein-Uhlenbeck processes. Electronic J. Probability, 8:1–14, 2003

work page 2003

[14] [14]

S. C. Lim and S. V. Munuandy. Generalized Ornstein-Uhle nbeck processes and associated self-similar processes. J. Phys. A: Math. Gen. , 36:3961–3982, 2003

work page 2003

[15] [15]

Magdziarz

M. Magdziarz. Fractional Ornstein-Uhlenbeck process es. Joseph eﬀect in models with inﬁnite variance. Physica A , 387: 123–33, 2008

work page 2008

[16] [16]

Samko, A

S. Samko, A. A. Kilbas, and D. I. Marichev. Integrals and derivatives of the fractional order and some o f their applications . New York, USA, Gordon & Breach Publishers, 1993

work page 1993

[17] [17]

A. A. Kilbas, H. M. Srivastava, and J. J. Trujillo. Theory and applications of fractional dﬀerential equation s. Armsterdam, Netherlands, Elsevier, 2006

work page 2006

[18] [18]

S. G. Samko. Hypersingular integrals and their applications . London, UK, Taylor and Francis, 2002

work page 2002

[19] [19]

Fluid limit o f the continuous-time random walk with general L´ evy jump distribution functions

´Alcaro Cartea and Diego del Castillo-Negrete. Fluid limit o f the continuous-time random walk with general L´ evy jump distribution functions. Phys. Rev. E , 76:041105, 2007

work page 2007

[20] [20]

Sabzikar, M.M

F. Sabzikar, M.M. Meerschaert, and J. Chen. Tempered fr actional calculus. J. Comput. Phys. , 293:14–28, July 2015

work page 2015

[21] [21]

On tempe red and substantial fractional calculus

Jianxiong Cao, Changpin Li, and YangQuan Chen. On tempe red and substantial fractional calculus. In 2014 IEEE/ASME 10th International Conference on Mechatronic and Embedded Systems and Applications (MESA) , pages 1–6, 10-12 Sep

work page 2014

[22] [22]

Samorodnitsky and M

G. Samorodnitsky and M. Taqqu. Stable Non-Gaussian Random Processes . New York: Chapman and Hall, 1994

work page 1994

[23] [23]

J. T. Kent and A T. A. W ood. Estimating the fractal dimens ion of locally self-similar Gaussian process by using incre ments. J. R. Stat. Soc. B , 59:579–599, 1997

work page 1997

[24] [24]

A . Adler. The Geometry of Random Fields . New York: Wiley, 1981

work page 1981

[25] [25]

Benassi, S

A. Benassi, S. Cohen, and J. Istas. Local self-similari ty and the hausdorﬀ dimension. Comptes Rendus Mathematique , 336(3):267 –272, 2003

work page 2003

[26] [26]

Abramowitz and I

M. Abramowitz and I. Stegun, editors. Handbook of mathematical functionsJ. Fourier Anal. Appl. Dover Publications, New York, 1965

work page 1965

[27] [27]

Falconer

K J. Falconer. The local structure of random processes. J. Lond. Math. Soc. , 67:657–672, 2003

work page 2003

[28] [28]

Lim and L P

S C. Lim and L P. Teo. Gaussian ﬁelds and Gaussian sheets w ith generalized Cauchy covariance structure. Stoch. Proc. Appl., 119:1325–1356, 2009

work page 2009

[29] [29]

K. J. Falconer. Fractal Geometry. Wiley, Hoboken, NJ, 2003

work page 2003

[30] [30]

J. Beran. Statistics for Long-Memory Processes . New York: Chapman and Hall, 1994

work page 1994

[31] [31]

The covariance structure of multifractional brownian moti on, with application to long range dependence

Antoine Ayache, Serge Cohen, and Jacques L´ evy V´ ehel. The covariance structure of multifractional brownian moti on, with application to long range dependence. In 2000 IEEE International Conference on Acoustics, Speech, a nd Signal Processing - ICASSP 2000 , Istanbul, Turkey, 2000

work page 2000

[32] [32]

Flandrin, P

P. Flandrin, P. Borgnat P, and P.-O. Amblard. From stati onarity to self-similarity, and back: variations on the Lam perti transformation. In G. Rangarajan and M. Ding, editors, Processes with Long-Range Correlations. Lecture Notes in Physics, volume 621. Springer, Berlin, Heidelberg, 2003

work page 2003

[33] [33]

S. C. Lim and L. P. Teo. W eyl and Riemann–Liouville multi fractional Ornstein–Uhlenbeck processes. J Phys A: Math Theor, 40:6035–60, 2007

work page 2007

[34] [34]

S. Kotz, I. V. Ostrovskii, and A. Hayfavi. Analytic and a symptotic properties of Linnik’s probability densities ,I , II. J. Math. Anal. App. , 193:353–371, 497–521, 1995

work page 1995

[35] [35]

M. B. Erdogan and I. V. Ostrovskii. Analytic and asympto tic properties of generalized Linnik probability densitie s. J. Math. Anal. App. , 217(2):555–578, 1998

work page 1998

[36] [36]

S. C. Lim and L. P. Teo. Analytic and asymptotic properti es of multivariate generalized Linnik’s probability densi ties. J. Fourier Anal. Appl. , 2010

work page 2010

[37] [37]

I. S. Gradshteyn and I. M. Ryzhik. Table of Integrals, Series, and Products . Academic Press, Inc., New York, USA, 6 th edition, 2000. 23

work page 2000

[38] [38]

M. D. Ruiz-Medina, J. M. Angulo, and V. V. Anh. Fractiona l generalized random ﬁelds on bounded domains. Stoch. Anal. Appl. , 21:465–492, 2003

work page 2003

[39] [39]

S. C. Lim and L. P. Teo. Sample path properties of fractio nal Riesz–Bessel ﬁeld of variable order. J Math Phys , 49:013509 (31 pages), 2008

work page 2008

[40] [40]

F. W. J. Olver, D. W. Lozier, R. F. Boisvert, and C. W. Clar k, editors. NIST Handbook of Mathematical Functions . Cambridge University Press Cambridge, 2010. 24

work page 2010