[[1] Černý, M., Rada, M. (2011). On the possibilistic approach to linear regression with rounded or interval-censored data. MeasurementScience Review 11 (2), 34-40.10.2478/v10048-011-0007-0]Search in Google Scholar
[[2] Domotor, Z., Batitsky, V. (2008). The analytic versus representational theory of measurement. Measurement Science Review 8, 129-146.10.2478/v10048-008-0031-x]Search in Google Scholar
[[3] Domotor, Z., Batitsky, V. (2009). Measurement, information channels,and discretization: Exploring the links. MeasurementScience Review 9 (6), 134-161.10.2478/v10048-009-0026-2]Search in Google Scholar
[[4] Domotor, Z., Batitsky, V. (2010). An algebraic-analytic framework for measurement theory. Measurement Journal 43 (9), 1142-1164.10.1016/j.measurement.2010.05.006]Search in Google Scholar
[[5] Hegeduš, H., Mostarac, P., Malaric, R. (2011). Comparison of RMS value measurement algorithms of non-coherent sampled signals. Measurement Science Review 11 (3), 79-84.10.2478/v10048-011-0019-9]Search in Google Scholar
[[6] Kakihara, Y. (1999). Abstract methods in information theory. World Scientific, Singapore.10.1142/3978]Search in Google Scholar
[[7] Kosarevsky, S.V., Latypov, V.N. (2012). Practical procedure for position tolerance uncertainty determination via Monte-Carlo error propagation. Measurement Science Review 12 (1), 1-7.10.2478/v10048-012-0001-1]Search in Google Scholar
[[8] Krantz, D.H., Luce, R.D., Suppes, P., Tversky, A. (1971). Foundations of measurement. Volume I: Additive and polynomialrepresentations. Academic Press, New York.]Search in Google Scholar
[[9] Morawski, R.Z., (1994). Unified approach to measurand reconstruction. IEEE Transaction on Instrumentation and Measurement 43, 226-231.10.1109/19.293425]Search in Google Scholar
[[10] Pratt, V.R. (1999). Chu spaces: Notes for school on category theory and applications. Technical report,University of Coimbra, Coimbra, Portugal. Available at http://boole.stanford.edu/pub/coimbra.pdf]Search in Google Scholar
[[11] Sinha, V.P. (2010). Symmetries and groups in signal processing:An introduction. Springer, New York.]Search in Google Scholar
[[12] Takesaki, M. (2002). Theory of operator algebra. Volume I. Springer, New York.]Search in Google Scholar