The representation holds exactly or asymptotically in tails for Gaussian and non-Gaussian vectors with special characteristic functions or Gaussian, translation, and non-Gaussian vectors with independent tails.
The analogous representation holds for ω 2 j.
Mansbridge's rethinking of the meaning of representation holds an important insight for contemporary discussions of democratic representation.
It can be checked by direct calculations based on formula (4.2) that the following integral representation holds: (418).
Lemma 6 The following representation holds M = ∑ n = 0 ∞ α 1 α 2 μ n ( λ n − λ ).
Theorem 1 The following representation holds M = N + a, a = lim τ → + ∞ ( i τ − N ( − τ 2 ) ). (25).
Descriptive racial representation holds that members of a given racial group are best represented in the government by other members of the same racial group.
Then the following representation holds (see [3]): varphi (x,lambda )=exp (-ilambda x)+int_{0}^{x} K x,t exp (-ilambda t),dt, (2) where (K x,t)) is a continuous function, and (K x,0)=0).
Then the following representation holds: begin{aligned} (mathfrak {D}f)(s,t)=mathrm{i}int _{{mathbb R}_+}big (f*mu _u)(s)e^{-mathrm{i}su}e^{mathrm{i}tu},du +mathrm{i}int _{{mathbb R}_+}big (f*mu _u)(t)e^{-mathrm{i}tu}e^{mathrm{i}su},du.
The following representation holds: {mathcal {M}} x,lambda)= - biggl xexp (-ilambda x)+ int_{0}^{x} K x,t) exp (-ilambda t),dt biggr), quad 0 le xle pi, (27) where (vert K x,t vert le f x-t)) with some (f x-tn L_{2}(0,pi)).
