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Setoid
Towards a Proof-Irrelevant Calculus of Inductive Constructions Philipp Haselwarter
Homotopy Type-Theoretic Interpretations of Constructive Set Theories
Arxiv:1710.10685V3
An Implementation of Effective Homotopy of Fibrations
Two Set-Based Implementations of Quotients in Type Theory
Finitary Higher Inductive Types in the Groupoid Model
Advanced Features: Type Classes and Relations
Setoid Type Theory (Draft)
A Gentle Introduction to Type Classes and Relations in Coq
About the Setoid Model
Constructing a Universe for the Setoid Model
Groupoid Model of Type Theory Based on Joint Work with Ondrej Rypacek
Modures: a Coq Library for Modular Reasoning About Concurrent Higher-Order Imperative Programming Languages
Quotient Types in Type Theory
Impredicative Encodings in Hott (Or: Toward a Realizability ∞-Topos)
Pragmatic Quotient Types in Coq
A Construction of the Discrete Field of Real Algebraic Numbers In
Setoids Are Not an LCCC
Top View
Constructing a Small Category of Setoids
Quotients Over Minimal Type Theory
W-Types in Setoids
A Syntactical Approach to Weak Ω-Groupoids
Arxiv:1708.01924V1 [Math.CT] 6 Aug 2017 I a Hspicpei O Sue Nbsctp Hoy U a Be Can but Theory, Type Basic in Assumed Not Is Principle This Eain,I.E
Constructive Mathematics in Univalent Type Theory
Mathematical Logic
Setoid Type Theory - a Syntactic Translation Thorsten Altenkirch, Simon Boulier, Ambrus Kaposi, Nicolas Tabareau
A Tactic for Setoid Congruence
On Setoid Models of Type Theory (Work in Progress)
Classical Mathematics for a Constructive World
Formalizing Category Theory in Agda CPP ’21, January 18–19, 2021, Virtual, Denmark
Setoids in Type Theory
On Constructive Sets and Partial Structures
History of Interactive Theorem Proving
Group Theory in Lean Contents
Arxiv:1809.02375V5
Exact Completion and Constructive Theories of Sets
From Setoid Hell to Homotopy Heaven? the Role of Extensionality in Type Theory
Proof-Relevance of Families of Setoids and Identity in Type Theory
A New Look at Generalized Rewriting in Type Theory