References
- Bhattacharya, B. (2006). An iterative procedure for general probability meastures to obtain I-projections onto intersections of convex sets. Ann. Stat. 34:878–902.
- Csiszar, I. (1975). I-divergence geometry of probability distributions and minimization problems. Ann. Probab. 3:146–158.
- Deming, W.E., Stephan, F.F. (1940). On a least squares adjustment of a sampled frequency table when the expected marginals are known. Ann. Math. Stat. 11:427–444.
- Garvey, P.R. (2000). Probability Methods for Cost Uncertainty Analysis. New York: Marcel Dekker.
- GUM (1995). Guide to the Expression of Uncertainty in Measurement (GUM), 2nd ed, (BIPM, IEC, IFCC, ILAC, ISO, IUPAC, IUPAP, OIML) ISBN 92-67-10188-9 (2008 electronic version from the BIPM/JCGM Available at http://www.bipm.org/utils/common/documents/jcgm/JCGM_100_2008_E.pdf).
- GUM-S1 (2008). Supplement 1 to GUM—Propagation of distributions using the Monte Carlo method. (GUM-S1) (electronic version available at http://www.bipm.org/utils/common/documents/jcgm/JCGM_101_2008_E.pdf).
- Hobby, C., Pyke, R. (1965). Doubly stochastic operators obtained from positive operators. Pacific J. Math. 15:153–157.
- Ireland, C.T., Kullback, S. (1968). Contingency tables with given marginals. Biometrika 55:179–188.
- Johnson, C.R., Reams, R. (2009). Scaling of symmetric matrices by positive diagonal congruence. Linear Multilinear Algebra 57:123–140.
- Kacker, R.N., Lawrence, J.F. (2007). Trapezoidal and triangular distributions for Type B evaluation of standard uncertainty. Metrologia 44:117–127.
- Kacker, R.N., Lawrence, J.F. (2009). Rectangular distribution whose width is not exactly known: isocurvilinear trapezoidal distribution. Metrologia 46:254–260.
- Kacker, R.N., Lawrence, J.F. (2010). Rectangular distribution whose end points are not exactly known: curvilinear trapezoidal distribution. Metrologia 47:120–126.
- Kacker, R.N., Lawrence, J.F. (2011). Derivation of isosceles trapezoidal distributions. Measurement Sci. Technol. 22:015106 (5 pages).
- Kerzner, H. (2003). Project Management: A Systems Approach to Planning, Scheduling, and Controlling, 8th ed. New York: Wiley.
- Knopp, P., Sinkhorn, R. (1968). A note concerning simultaneous integral equations. Can. J. Math. 20:856–861.
- Kotz, S., van Dorp, J.R. (2004). Beyond Beta: Other Continuous Families of Distributions with Bounded Support and Applications. Singapore: World Scientific.
- Kruithof, R. (1937). Telefoonverkeersrekening. De Ingenieur 52:E15–E25.
- Kullback, S. (1968). Probability densities with given marginals. Ann. Math. Stat. 39:1236–1243.
- Lash, T.L., Fox, M.P., Fink, A.K. (2009). Applying Quantitative Bias Analysis to Epidemiologic Data. New York: Springer.
- Sinkhorn, R. (1964). A relationship between arbitrary positive matrices and doubly stochastic matrices. Ann. Math. Stat. 35:876–879.
- Van Dorp, J.R., Kotz, S. (2003). Generalized trapezoidal distributions. Metrika 58:85–97.
- Veerappan, S. (2009). Management of temporal events for fuzzy XML databases, Masters project, Department of Computer Science, California State University, Sacramento.