Austen Z. Fan scite author profile

We study the properties of elections that have a given position matrix (in such elections each candidate is ranked on each position by a number of voters specified in the matrix). We show that counting elections that generate a given position matrix is #P-complete. Consequently, sampling such elections uniformly at random seems challenging and we propose a simpler algorithm, without hard guarantees. Next, we consider the problem of testing if a given matrix can be implemented by an election with a certain structure (such as single-peakedness or groupseparability). Finally, we consider the problem of checking if a given position matrix can be implemented by an election with a Condorcet winner. We complement our theoretical findings with experiments.

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Austen Z. Fan

Dichotomy result on 3-regular bipartite non-negative functions

Dichotomy Result on 3-Regular Bipartite Non-negative Functions

Bipartite 3-regular counting problems with mixed signs

Properties of Position Matrices and Their Elections

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