D-Index & Metrics Best Publications

D-Index & Metrics

Discipline name D-index D-index (Discipline H-index) only includes papers and citation values for an examined discipline in contrast to General H-index which accounts for publications across all disciplines. Citations Publications World Ranking National Ranking
Economics and Finance D-index 31 Citations 8,332 103 World Ranking 1871 National Ranking 18

Overview

What is he best known for?

The fields of study he is best known for:

  • Statistics
  • Real number
  • Game theory

Bezalel Peleg focuses on Mathematical economics, Core, Game theory, Discrete mathematics and Axiom. Bezalel Peleg interconnects Simple and Cardinal voting systems in the investigation of issues within Mathematical economics. He has included themes like Outcome, Combinatorics and Bondareva–Shapley theorem in his Core study.

His work on Combinatorial game theory as part of general Game theory study is frequently linked to Class, Interval and Kernel, therefore connecting diverse disciplines of science. The Combinatorial game theory study combines topics in areas such as Shapley value and Bargaining set. The various areas that he examines in his Discrete mathematics study include Social choice theory, Power set, Existence theorem and Extension.

His most cited work include:

  • Coalition-Proof Nash Equilibria I. Concepts (822 citations)
  • Introduction to the Theory of Cooperative Games (416 citations)
  • Geometric Properties of the Kernel, Nucleolus, and Related Solution Concepts (402 citations)

What are the main themes of his work throughout his whole career to date?

The scientist’s investigation covers issues in Mathematical economics, Nash equilibrium, Social choice theory, Combinatorics and Function. His Mathematical economics study combines topics in areas such as Characterization and Axiom. His studies in Nash equilibrium integrate themes in fields like Normal-form game, Strategy, Rationality and Complete information.

The study incorporates disciplines such as Strong Nash equilibrium and Power in addition to Social choice theory. His Function research includes elements of Representation, Order, Outcome function and Lexicographical order. His Core research integrates issues from Kernel and Bondareva–Shapley theorem.

He most often published in these fields:

  • Mathematical economics (65.14%)
  • Nash equilibrium (17.43%)
  • Social choice theory (15.60%)

What were the highlights of his more recent work (between 2004-2018)?

  • Mathematical economics (65.14%)
  • Social choice theory (15.60%)
  • Function (13.76%)

In recent papers he was focusing on the following fields of study:

Mathematical economics, Social choice theory, Function, Nash equilibrium and Monotonic function are his primary areas of study. Mathematical economics is closely attributed to Characterization in his research. Bezalel Peleg has researched Characterization in several fields, including Implementation theory and Axiom.

His work deals with themes such as Strategic financial management, Marketing, Strategic planning and Representation, which intersect with Social choice theory. His Function research incorporates themes from State, Constitution and Power. His study in the field of Epsilon-equilibrium also crosses realms of Stability and Meaning.

Between 2004 and 2018, his most popular works were:

  • Strategic Social Choice: Stable Representations of Constitutions (15 citations)
  • Extending the Condorcet Jury Theorem to a general dependent jury (14 citations)
  • Strategic Social Choice (13 citations)

In his most recent research, the most cited papers focused on:

  • Statistics
  • Real number
  • Algebra

His scientific interests lie mostly in Mathematical economics, Social choice theory, Monotonic function, Class and Superadditivity. His Mathematical economics study combines topics from a wide range of disciplines, such as Function and Existential quantification. His work carried out in the field of Social choice theory brings together such families of science as Strategic financial management, Marketing, Strategic planning and Representation.

His Superadditivity research includes themes of Voting paradox, Bargaining problem and Hemicontinuity. His Strong Nash equilibrium research is multidisciplinary, incorporating elements of Normal-form game and Solution concept. His study in Outcome is interdisciplinary in nature, drawing from both Time complexity, Discrete mathematics, Core and Axiom.

This overview was generated by a machine learning system which analysed the scientist’s body of work. If you have any feedback, you can contact us here.

Best Publications

Coalition-Proof Nash Equilibria I. Concepts

B.Douglas Bernheim;Bezalel Peleg;Michael D Whinston.
Journal of Economic Theory (1987)

1495 Citations

Introduction to the Theory of Cooperative Games

Bezalel Peleg;Peter Sudhölter.
(1983)

888 Citations

Geometric Properties of the Kernel, Nucleolus, and Related Solution Concepts

M. Maschler;B. Peleg;L. S. Shapley.
Mathematics of Operations Research (1979)

618 Citations

On the Existence of a Consistent Course of Action when Tastes are Changing

Bezalel Peleg;Menahem E. Yaari.
The Review of Economic Studies (1973)

419 Citations

Von Neumann-Morgenstern solutions to cooperative games without side payments

R. J. Aumann;B. Peleg.
Bulletin of the American Mathematical Society (1960)

368 Citations

On the reduced game property and its converse

B. Peleg.
International Journal of Game Theory (1986)

366 Citations

Game Theoretic Analysis of Voting in Committees

Bezalel Peleg.
(1984)

364 Citations

The kernel and bargaining set for convex games

M. Maschler;B. Peleg;Lloyd S. Shapley.
International Journal of Game Theory (1971)

306 Citations

Cores of effectivity functions and implementation theory

Herve Moulin;Bezalel Peleg.
Journal of Mathematical Economics (1982)

236 Citations

A note on the extension of an order on a set to the power set

Yakar Kannai;Bezalel Peleg.
Journal of Economic Theory (1984)

222 Citations

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