A coherence theorem for Martin-Löf's type theory
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[1] Bengt Nordström,et al. Programming in Martin-Lo¨f's type theory: an introduction , 1990 .
[2] P. Dybjer. Inductive sets and families in Martin-Lo¨f's type theory and their set-theoretic semantics , 1991 .
[3] Martin Hofmann,et al. The groupoid model refutes uniqueness of identity proofs , 1994, Proceedings Ninth Annual IEEE Symposium on Logic in Computer Science.
[4] M. Hofmann. Extensional concepts in intensional type theory , 1995 .
[5] Martin Hofmann,et al. Conservativity of Equality Reflection over Intensional Type Theory , 1995, TYPES.
[6] Peter Dybjer,et al. Extracting a proof of coherence for monoidal categories from a formal proof of normalization for monoids , 1996 .
[7] Peter Dybjer,et al. Extracting a Proof of Coherence for Monoidal Categories from a Proof of Normalization for Monoids , 1995, TYPES.
[8] M. Beeson. Formalizing constructive mathematics: Why and how? , 1981 .
[9] Thorsten Altenkirch,et al. A user's guide to {ALF , 1994 .
[10] Per Martin-Löf,et al. An intuitionistic theory of types , 1972 .
[11] Bengt Nordström,et al. The ALF Proof Editor and Its Proof Engine , 1994, TYPES.
[12] John Cartmell,et al. Generalised algebraic theories and contextual categories , 1986, Ann. Pure Appl. Log..
[13] Peter Dybjer,et al. A general formulation of simultaneous inductive-recursive definitions in type theory , 2000, Journal of Symbolic Logic.