A parameterized characterization of height-based total extensions of principal filtral opportunity rankings is provided and shown to include, as a special case, a version of the well-known Pattanaik-Xu characterization of the cardinality-based rankin
AbstractThe average height of an element x in a finite poset P is the expect below x in a random lin...
We get an estimate from below for the height of the powers of a polynomial using Holder inequality a...
We compare opportunity sets in the evaluative space of individual functionings. A microeconomic moti...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
Abstract: A parameterized characterization of height-based total extensions of Principal filtral opp...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
In this talk, I will introduce the notion of height, and how Diophantine inequalities help in Diopha...
We consider the concept of rank as a measure of the vertical levels and positions of elements of par...
We consider the problem of ranking distributions of opportunity sets on the basis of equality. First...
Abstract. Height restricted resolution (proofs or refutations) is a nat-ural restriction of resoluti...
Let a, b ∈ $\bar{\mathbb{Q}}$ be such that exactly one of a and b is an algebraic integer, and let f...
We introduce A-ranked preferential structures and combine them with an accessibility relation. A-ran...
When agents face incomplete information and their knowledge about the objects of choice is vague and...
We develop the notions of “generalized lowness” for sets in PH (the union of the polynomial-time hie...
AbstractThe average height of an element x in a finite poset P is the expect below x in a random lin...
We get an estimate from below for the height of the powers of a polynomial using Holder inequality a...
We compare opportunity sets in the evaluative space of individual functionings. A microeconomic moti...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
Abstract: A parameterized characterization of height-based total extensions of Principal filtral opp...
A parameterized characterization of height-based total extensions of principal filtral opportunity r...
In this talk, I will introduce the notion of height, and how Diophantine inequalities help in Diopha...
We consider the concept of rank as a measure of the vertical levels and positions of elements of par...
We consider the problem of ranking distributions of opportunity sets on the basis of equality. First...
Abstract. Height restricted resolution (proofs or refutations) is a nat-ural restriction of resoluti...
Let a, b ∈ $\bar{\mathbb{Q}}$ be such that exactly one of a and b is an algebraic integer, and let f...
We introduce A-ranked preferential structures and combine them with an accessibility relation. A-ran...
When agents face incomplete information and their knowledge about the objects of choice is vague and...
We develop the notions of “generalized lowness” for sets in PH (the union of the polynomial-time hie...
AbstractThe average height of an element x in a finite poset P is the expect below x in a random lin...
We get an estimate from below for the height of the powers of a polynomial using Holder inequality a...
We compare opportunity sets in the evaluative space of individual functionings. A microeconomic moti...