Minimality, Rigidity, and Flows

@inproceedings{Pipiras2017MinimalityRA,
  title={Minimality, Rigidity, and Flows},
  author={Vladas Pipiras and Murad S. Taqqu},
  year={2017}
}
A symmetric stable random process has many integral representations. Among these, the so-called minimal representations play a fundamental role, as described in the chapter. Minimal representations are characterized by a rigidity property that allows relating stable processes with an invariance property to nonsingular flows and their functionals. Various types of nonsingular flows (dissipative, conservative, periodic, fixed and others) are also discussed. They underlie the decompositions of… 
View via Publisher

References

SHOWING 1-10 OF 17 REFERENCES
MINIMAL INTEGRAL REPRESENTATIONS OF STABLE PROCESSES
Abstract: Minimal integral representations are defined for general st ochastic processes and completely characterized for stable processes ( symmetric and asymmetric). In the stable case, minimal
SEMI-ADDITIVE FUNCTIONALS AND COCYCLES IN THE CONTEXT OF SELF-SIMILARITY
Kernel functions of stable, self-similar mixed moving averages are known to be related to nonsingular flows. We identify and examine here a new functional occuring in this relation and study its
Structure of stationary stable processes
A connection between structural studies of stationary non-Gaussian stable processes and the ergodic theory of nonsingular flows is established and exploited. Using this connection, a unique
Decomposition of self-similar stable mixed moving averages
Abstract. Let α? (1,2) and Xα be a symmetric α-stable (S α S) process with stationary increments given by the mixed moving average where is a standard Lebesgue space, is some measurable function
Stable stationary processes related to cyclic flows
We study stationary stable processes related to periodic and cyclic flows in the sense of Rosinski [Ann. Probab. 23 (1995) 1163–1187]. These processes are not ergodic. We provide their canonical
On uniqueness of the spectral representation of stable processes
In this paper we show that any two spectral representations of a symmetric stable process may differ only by a change of variable and a parameter-independent multiplier. Our result can immediately be
Ergodic Theory and Semisimple Groups
1. Introduction.- 2. Moore's Ergodicity Theorem.- 3. Algebraic Groups and Measure Theory.- 4. Amenability.- 5. Rigidity.- 6. Margulis' Arithmeticity Theorems.- 7. Kazhdan's Property (T).- 8. Normal
On the spectral representation of symmetric stable processes
On compactness in functional analysis
The theorem of Arzel& and Ascoli, characterizing conditionally compact subsets of the Banach space C(X) of continuous functions defined on a compact topological space X, is fundamental for much of
Long-Range Dependence and Self-Similarity
This modern and comprehensive guide to long-range dependence and self-similarity starts with rigorous coverage of the basics, then moves on to cover more specialized, up-to-date topics central to
...
1
2
...