Kaethe Minden scite author profile

Kaethe Minden

5Publications

27Citation Statements Received

93Citation Statements Given

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Marlboro College

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Subcomplete Forcing, Trees, and Generic Absoluteness

Fuchs¹,

Minden²

2018

J. symb. log.

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We investigate properties of trees of height ω 1 and their preservation under subcomplete forcing. We show that subcomplete forcing cannot add a new branch to an ω 1 -tree. We introduce fragments of subcompleteness which are preserved by subcomplete forcing, and use these in order to show that certain strong forms of rigidity of Suslin trees are preserved by subcomplete forcings. Finally, we explore under what circumstances subcomplete forcing preserves Aronszajn trees of height and width ω 1 . We show that this is the case if CH fails, and if CH holds, then this is the case iff the bounded subcomplete forcing axiom holds. Finally, we explore the relationships between bounded forcing axioms, preservation of Aronszajn trees of height and width ω 1 and generic absoluteness of Σ 1 1 -statements over first order structures of size ω 1 , also for other canonical classes of forcing.

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Infinite Latin Squares: Neighbor Balance and Orthogonality

Evans

Martin

Minden

et al. 2020

Electron. J. Combin.

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Regarding neighbor balance, we consider natural generalizations of $D$-complete Latin squares and Vatican squares from the finite to the infinite. We show that if $G$ is an infinite abelian group with $|G|$-many square elements, then it is possible to permute the rows and columns of the Cayley table to create an infinite Vatican square. We also construct a Vatican square of any given infinite order that is not obtainable by permuting the rows and columns of a Cayley table. Regarding orthogonality, we show that every infinite group $G$ has a set of $|G|$ mutually orthogonal orthomorphisms and hence there is a set of $|G|$ mutually orthogonal Latin squares based on $G$. We show that an infinite group $G$ with $|G|$-many square elements has a strong complete mapping; and, with some possible exceptions, infinite abelian groups have a strong complete mapping.

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Metacognitive Assessments for Undergraduate Mathematics Courses in the Time of COVID-19

Landi¹,

Minden²

2022

PRIMUS

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Subcomplete forcing, trees and generic absoluteness

Fuchs¹,

Minden²

2017

Preprint

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The subcompleteness of diagonal Prikry forcing

Minden¹

2018

Preprint

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Kaethe Minden

Subcomplete Forcing, Trees, and Generic Absoluteness

Infinite Latin Squares: Neighbor Balance and Orthogonality

Metacognitive Assessments for Undergraduate Mathematics Courses in the Time of COVID-19

Subcomplete forcing, trees and generic absoluteness

The subcompleteness of diagonal Prikry forcing

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