Contractibility transport ⇔ J Carlo Angiuli December 1, 2014 In MLTT, we usually define the identity type as a reflexive relation satisfying J: Γ`M :A Γ`N :A - Logic in computer science - Document - PDFSEARCH.IO

First Page		Document Content
Date: 2015-05-08 13:33:44 Proof theory Riemann surfaces Mathematics CurryHoward correspondence Logic in computer science Philosophy of computer science Type theory Generalised Whitehead product		Contractibility + transport ⇔ J Carlo Angiuli December 1, 2014 In MLTT, we usually define the identity type as a reflexive relation satisfying J: Γ`M :A Γ`N :A Add to Reading List Source URL: www.carloangiuli.com Download Document from Source Website File Size: 107,77 KB Share Document on Facebook

	Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–1472) HITCHIN TYPE MODULI STACKS IN AUTOMORPHIC REPRESENTATION THEORY Zhiwei Yun (恽之玮) DocID: 1xVTT - View Document
	An adequacy theorem for partial type theory j.w.w. Simon Huber G¨ oteborg, May 11, 2017 An adequacy theorem for partial type theory DocID: 1v8ox - View Document
	E6(6) Exceptional Field Theory: Applications to Type IIB Supergravity on AdS5 ×S5 Arnaud Baguet ´ Ecole Normale Sup´ DocID: 1v5Rr - View Document
	Univalent Type Theory Thierry Coquand Tutorial for the Logic Colloquium 2016, Leeds Univalent Type Theory DocID: 1uZ9e - View Document
	Collection Principles in Dependent Type Theory? Peter Aczel1 and Nicola Gambino2 1 Departments of Mathematics and Computer Science, University of Manchester, DocID: 1uXqs - View Document