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200 1 $a*Bounds on the Effective Theory of Gravity in Models of Particle Physics and Cosmology$eDoctoral Thesis accepted by University of Sussex, Brighton, UK$fMichael Atkins
205   $aCham : Springer, 2014
210   $axii$d100 p.$cill. ; 24 cm
215   $aPubblicazione in formato elettronico
410  1$1001SUN0104193$12001 $a*Springer theses$erecognizing outstanding Ph.D. research$1210  $aBerlin$aHeidelberg$cSpringer.
606   $a85A40$xCosmology [MSC 2020]$2MF$3SUNC023267
606   $a83Fxx$xCosmology [MSC 2020]$2MF$3SUNC023580
606   $a83C45$xQuantization of the gravitational field [MSC 2020]$2MF$3SUNC023588
606   $a81T20$xQuantum field theory on curved space or space-time backgrounds [MSC 2020]$2MF$3SUNC034033
620   $aCH$dCham$3SUNL001889
700  1$aAtkins$b, Michael$3SUNV106777$0791832
712   $aSpringer$3SUNV000178$4650
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856 4 $uhttp://doi.org/10.1007/978-3-319-06367-6
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200 10$aNilspace Factors for General Uniformity Seminorms, Cubic Exchangeability and Limits
205   $a1st ed.
210  1$aProvidence :$cAmerican Mathematical Society,$d2023.
210  4$d©2023.
215   $a1 online resource (114 pages)
225 1 $aMemoirs of the American Mathematical Society Series ;$vv.287
311 08$aPrint version: Candela, Pablo Nilspace Factors for General Uniformity Seminorms, Cubic Exchangeability and Limits Providence : American Mathematical Society,c2023 9781470465483 
327   $aCover -- Title page -- Chapter 1. Introduction -- Acknowledgments -- Chapter 2. Measure-theoretic preliminaries -- 2.1. Some basic notions -- 2.2. Couplings -- 2.3. Closed properties in a coupling space -- 2.4. Localization -- 2.5. Conditional independence in set lattices -- 2.6. Idempotent couplings -- Chapter 3. Cubic couplings -- 3.1. Conditional independence of simplicial sets -- 3.2. Tricubes -- 3.3.  ^{ }-convolutions and  ^{ }-seminorms associated with a cubic coupling -- 3.4. Fourier  -algebras -- 3.5. Properties of  ^{ }-convolutions -- 3.6. Topologization of cubic couplings -- 3.7. Continuous  ?-convolutions -- 3.8. Topological nilspace factors of \ns -- Chapter 4. The structure theorem for cubic couplings -- 4.1. Verifying the ergodicity and composition axioms -- 4.2. Complete dependence of corner couplings -- 4.3. Convolution neighbourhoods -- 4.4. Construction of the coupling ?. -- 4.5. Verifying the corner-completion axiom -- Chapter 5. On characteristic factors associated with nilpotent group actions -- Chapter 6. On cubic exchangeability -- Chapter 7. Limits of functions on compact nilspaces -- Appendix A. Background results from measure theory -- Bibliography -- Back Cover.
330   $a"We study a class of measure-theoretic objects that we call cubic couplings, on which there is a common generalization of the Gowers norms and the Host- Kra seminorms. Our main result yields a complete structural description of cubic couplings, using nilspaces. We give three applications. Firstly, we describe the characteristic factors of Host-Kra type seminorms for measure-preserving actions of countable nilpotent groups. This yields an extension of the structure theorem of Host and Kra. Secondly, we characterize sequences of random variables with a property that we call cubic exchangeability. These are sequences indexed by the infinite discrete cube, such that for every integer k [geq] 0 the joint distribution's marginals on affine subcubes of dimension k are all equal. In particular, our result gives a description, in terms of compact nilspaces, of a related exchangeability property considered by Austin, inspired by a problem of Aldous. Finally, using nilspaces we obtain limit objects for sequences of functions on compact abelian groups (more generally on compact nilspaces) such that the densities of certain patterns in these functions converge. The paper thus proposes a measure-theoretic framework on which the area of higher-order Fourier analysis can be based, and which yields new applications of this area in a unified way in ergodic theory and arithmetic combinatorics"--$cProvided by publisher.
410  0$aMemoirs of the American Mathematical Society Series
606   $aNilpotent groups
606   $aCurves, Cubic
606   $aErgodic theory
606   $aMeasure-preserving transformations
606   $aDynamical systems and ergodic theory -- Ergodic theory$2msc
606   $aDynamical systems and ergodic theory -- Ergodic theory -- General groups of measure-preserving transformations$2msc
606   $aProbability theory and stochastic processes$2msc
606   $aProbability theory and stochastic processes -- Probability theory on algebraic and topological structures$2msc
606   $aNumber theory -- Sequences and sets -- Arithmetic combinatorics; higher degree uniformity$2msc
615  0$aNilpotent groups.
615  0$aCurves, Cubic.
615  0$aErgodic theory.
615  0$aMeasure-preserving transformations.
615  7$aDynamical systems and ergodic theory -- Ergodic theory.
615  7$aDynamical systems and ergodic theory -- Ergodic theory -- General groups of measure-preserving transformations.
615  7$aProbability theory and stochastic processes.
615  7$aProbability theory and stochastic processes -- Probability theory on algebraic and topological structures.
615  7$aNumber theory -- Sequences and sets -- Arithmetic combinatorics; higher degree uniformity.
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701   $aSzegedy$b Balázs$01779784
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