| Management number | 231718340 | Release Date | 2026/06/18 | List Price | US$18.88 | Model Number | 231718340 | ||
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Classicalexamples of moreand more oscillatingreal-valued functions on a domain N ?of R are the functions u (x)=sin(nx)with x=(x, ..., x ) or the so-called n 1 1 n n+1 Rademacherfunctionson]0,1[, u (x)=r (x) = sgn(sin(2 x))(seelater3.1.4). n n They may appear as the gradients?v of minimizing sequences (v ) in some n n n?N variationalproblems. Intheseexamples, thefunctionu convergesinsomesenseto n ameasure µ on ? ×R, called Young measure. In Functional Analysis formulation, this is the narrow convergence to µ of the image of the Lebesgue measure on ? by ? ? (?, u (?)). In the disintegrated form (µ ), the parametrized measure µ n ? ? captures the possible scattering of the u around ?. n Curiously if (X ) is a sequence of random variables deriving from indep- n n?N dent ones, the n-th one may appear more and more far from the k ?rst ones as 2 if it was oscillating (think of orthonormal vectors in L which converge weakly to 0). More precisely when the laws L(X ) narrowly converge to some probability n measure, it often happens that for any k and any A in the algebra generated by X, ..., X, the conditional law L(XA) still converges to (see Chapter 9) 1 k n which means 1 C (R) ?(X (?))dP(?) d b n P(A) A R or equivalently, ? denoting the image of P by ? ? (?, X (?)), n X n (1l )d? (1l )d[P? ]. Read more
| ISBN10 | 9048165520 |
|---|---|
| ISBN13 | 978-9048165520 |
| Edition | Softcover reprint of the original 1st ed. 2004 |
| Language | English |
| Publisher | Springer |
| Dimensions | 6.1 x 0.76 x 9.25 inches |
| Item Weight | 1.04 pounds |
| Print length | 332 pages |
| Publication date | December 4, 2010 |
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