Multi-Criteria Sorting with Category Size Restrictions

We consider the multi-criteria sorting problem where alternatives that are evaluated on multiple criteria are assigned into ordered categories. We focus on the sorting problem with category size restrictions, where the decision maker (DM) may have some concerns or constraints on the number of alternatives that should be assigned to some of the categories. We develop an approach based on the UTADIS method that fits an additive utility function to represent the decision maker’s preferences. We introduce additional variables and constraints to enforce the restrictions on the sizes of categories. The new formulation reduces the number of binary variables and hence decreases the computational effort compared to the existing approaches in the literature. We further improve the computational efficiency by developing lower and upper bounds on the rank of each alternative in order to narrow down the set of categories that each alternative can be assigned to. We demonstrate our approach on two applications from practice.

Download Full-text

Ranking DMUs by Calculating the Interval Efficiency with a Common Set of Weights in DEA

Journal of Applied Mathematics ◽

10.1155/2014/346763 ◽

2014 ◽

Vol 2014 ◽

pp. 1-9 ◽

Cited By ~ 4

Author(s):

Vahideh Rezaie ◽

Tahir Ahmad ◽

Siti-Rahmah Awang ◽

Masumeh Khanmohammadi ◽

Normah Maan

Keyword(s):

Decision Maker ◽

Relative Efficiency ◽

Efficiency Score ◽

Upper Bounds ◽

Data Envelopment ◽

Lower And Upper Bounds ◽

Common Set Of Weights ◽

Overall Performance ◽

Interval Efficiency ◽

Decision Making Units

To evaluate the performance of decision making units (DMUs), data envelopment analysis (DEA) was introduced. Basically, the traditional DEA scheme calculates the best relative efficiency score (i.e., the “optimistic” efficiency) of each DMU with the most favorable weights. A decision maker may be unable to compare and fully rank the efficiencies of different DMUs that are calculated using these potentially distinct sets of weights on the same basis. Based on the literature, the assignable worst relative efficiency score (i.e., the “pessimistic” efficiency) for each DMU can also be determined. In this paper, the best and the worst relative efficiencies are considered simultaneously. To measure the overall performance of the DMUs, an integration of both the best and the worst relative efficiencies is considered in the form of an interval. The advantage of this efficiency interval is that it provides all of the possible efficiency values and an expanded overview to the decision maker. The proposed method determines the lower- and upper-bounds of the interval efficiency over a common set of weights. To demonstrate the implementation of the introduced method, a numerical example is provided.

Download Full-text

Methods For Combining Experts' Probability Assessments

Neural Computation ◽

10.1162/neco.1995.7.5.867 ◽

1995 ◽

Vol 7 (5) ◽

pp. 867-888 ◽

Cited By ~ 218

Author(s):

Robert A. Jacobs

Keyword(s):

Decision Maker ◽

Probability Distributions ◽

Upper Bounds ◽

Bayes Rule ◽

Bayesian Procedure ◽

Lower And Upper Bounds ◽

Aggregation Methods ◽

Expert Opinions ◽

Linear Opinion Pool ◽

Opinion Pool

This article reviews statistical techniques for combining multiple probability distributions. The framework is that of a decision maker who consults several experts regarding some events. The experts express their opinions in the form of probability distributions. The decision maker must aggregate the experts' distributions into a single distribution that can be used for decision making. Two classes of aggregation methods are reviewed. When using a supra Bayesian procedure, the decision maker treats the expert opinions as data that may be combined with its own prior distribution via Bayes' rule. When using a linear opinion pool, the decision maker forms a linear combination of the expert opinions. The major feature that makes the aggregation of expert opinions difficult is the high correlation or dependence that typically occurs among these opinions. A theme of this paper is the need for training procedures that result in experts with relatively independent opinions or for aggregation methods that implicitly or explicitly model the dependence among the experts. Analyses are presented that show that m dependent experts are worth the same as k independent experts where k ≤ m. In some cases, an exact value for k can be given; in other cases, lower and upper bounds can be placed on k.

Download Full-text

Extension of the Spatial PDI Model to Three Dimensions

Perceptual and Motor Skills ◽

10.2466/pms.1997.84.1.176 ◽

1997 ◽

Vol 84 (1) ◽

pp. 176-178

Author(s):

Frank O'Brien

Keyword(s):

Population Density ◽

Dimensional Space ◽

Finite Lattice ◽

Three Dimensional ◽

Upper Bounds ◽

Three Dimensions ◽

Lower And Upper Bounds ◽

Density Index ◽

Three Dimensional Space

The author's population density index ( PDI) model is extended to three-dimensional distributions. A derived formula is presented that allows for the calculation of the lower and upper bounds of density in three-dimensional space for any finite lattice.

Download Full-text

Energy of spherical fuzzy graphs

Advances in Mathematics: Scientific Journal ◽

10.37418/amsj.9.1.26 ◽

2020 ◽

pp. 321-332

Author(s):

S. Yahya Mohamed ◽

A. Mohamed Ali

Keyword(s):

Adjacency Matrix ◽

Upper Bounds ◽

Fuzzy Graph ◽

Lower And Upper Bounds ◽

Fuzzy Graphs

In this paper, the notion of energy extended to spherical fuzzy graph. The adjacency matrix of a spherical fuzzy graph is defined and we compute the energy of a spherical fuzzy graph as the sum of absolute values of eigenvalues of the adjacency matrix of the spherical fuzzy graph. Also, the lower and upper bounds for the energy of spherical fuzzy graphs are obtained.

Download Full-text

Lower and Upper Bounds in the Monte-Carlo Simulation of Bermudan Basket Options

SSRN Electronic Journal ◽

10.2139/ssrn.2262259 ◽

2013 ◽

Author(s):

Fabien Le Floc'h

Keyword(s):

Monte Carlo Simulation ◽

Monte Carlo ◽

Upper Bounds ◽

Lower And Upper Bounds ◽

Basket Options

Download Full-text

New lower and upper bounds on Armstrong codes

2020 Algebraic and Combinatorial Coding Theory (ACCT) ◽

10.1109/acct51235.2020.9383381 ◽

2020 ◽

Author(s):

Todorka Alexandrova ◽

Peter Boyvalenkov ◽

Attila Sali

Keyword(s):

Upper Bounds ◽

Lower And Upper Bounds

Download Full-text

Relationship between Age and Value of Information for a Noisy Ornstein–Uhlenbeck Process

Entropy ◽

10.3390/e23080940 ◽

2021 ◽

Vol 23 (8) ◽

pp. 940

Author(s):

Zijing Wang ◽

Mihai-Alin Badiu ◽

Justin P. Coon

Keyword(s):

Value Of Information ◽

Markov Models ◽

Upper Bounds ◽

Distribution Functions ◽

Lower And Upper Bounds ◽

Uhlenbeck Process ◽

Source Data ◽

Non Linear ◽

Queue Model ◽

Selection Of

The age of information (AoI) has been widely used to quantify the information freshness in real-time status update systems. As the AoI is independent of the inherent property of the source data and the context, we introduce a mutual information-based value of information (VoI) framework for hidden Markov models. In this paper, we investigate the VoI and its relationship to the AoI for a noisy Ornstein–Uhlenbeck (OU) process. We explore the effects of correlation and noise on their relationship, and find logarithmic, exponential and linear dependencies between the two in three different regimes. This gives the formal justification for the selection of non-linear AoI functions previously reported in other works. Moreover, we study the statistical properties of the VoI in the example of a queue model, deriving its distribution functions and moments. The lower and upper bounds of the average VoI are also analysed, which can be used for the design and optimisation of freshness-aware networks. Numerical results are presented and further show that, compared with the traditional linear age and some basic non-linear age functions, the proposed VoI framework is more general and suitable for various contexts.

Download Full-text