Eine Übersicht über alle wissenschaftlichen Veröffentlichungen des Max-Planck-Institutes für Plasmaphysik.
Buchkapitel (40)
321.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Integral equations. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 451 - 469 (Hg. Linden, W. v. d.; Dose, V.; 322.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Function estimation. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 431 - 450 (Hg. Linden, W. v. d.; Dose, V.; 323.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Change point problems. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 409 - 430 (Hg. Linden, W. v. d.; Dose, V.; 324.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Unrecognized signal contributions. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 396 - 408 (Hg. Linden, W. v. d.; Dose, V.; 325.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Consistent inference on inconsistent data. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 364 - 395 (Hg. Linden, W. v. d.; Dose, V.; 326.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Regression. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 333 - 363 (Hg. Linden, W. v. d.; Dose, V.; 327.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Comparison of Bayesian and frequentist hypothesis tests. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 324 - 330 (Hg. Linden, W. v. d.; Dose, V.; 328.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Sampling distributions and common hypothesis tests. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 284 - 323 (Hg. Linden, W. v. d.; Dose, V.; 329.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
The frequentist approach. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 276 - 283 (Hg. Linden, W. v. d.; Dose, V.; 330.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
The Bayesian way. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 255 - 275 (Hg. Linden, W. v. d.; Dose, V.; 331.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
The Cramer-Rao inequality. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 248 - 254 (Hg. Linden, W. v. d.; Dose, V.; 332.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Frequentist parameter estimation. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 236 - 247 (Hg. Linden, W. v. d.; Dose, V.; 333.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Bayesian parameter estimation. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 227 - 235 (Hg. Linden, W. v. d.; Dose, V.; 334.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Global smoothness. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 215 - 223 (Hg. Linden, W. v. d.; Dose, V.; 335.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Quantified maximum entropy. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 201 - 214 (Hg. Linden, W. v. d.; Dose, V.; 336.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Testable information and maximum entropy. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 178 - 200 (Hg. Linden, W. v. d.; Dose, V.; 337.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Prior probabilities by transformation invariance. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 165 - 177 (Hg. Linden, W. v. d.; Dose, V.; 338.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Poisson processes and waiting times. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 147 - 164 (Hg. Linden, W. v. d.; Dose, V.; 339.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
The central limit theorem. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 139 - 146 (Hg. Linden, W. v. d.; Dose, V.; 340.
Buchkapitel
Toussaint, U. v.). Cambridge University Press, Cambridge (2014)
Continuous distributions. In: Bayesian Probability Theory: Applications in the Physical Sciences, S. 92 - 138 (Hg. Linden, W. v. d.; Dose, V.;