Martin Odersky, Vincent Cremet, Christine Rockl, and Matthias Zenger. A Nominal Theory of Objects with Dependent Types. In Proc. ECOOP'03, Springer LNCS, 2003.  Home/Search   Document Details and Download   Summary   Related Articles   Check

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M. Odersky, V. Cremet, C. Rockl, and M. Zenger. A nominal theory of objects with dependent types. In Proc. FOOL 10, Jan. 2003. http://www.cis.upenn.edu/~bcpierce/FOOL/FOOL10.html.

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M. Odersky, V. Cremet, C. Rockl, and M. Zenger. A nominal theory of objects with dependent types. Technical report IC/2002/70, EPFL, Switzerland, September 2002. http://lamp.epfl.ch/papers/technto.pdf.

....are Confluence of the reduction relation. Undecidability of type checking by reduction to the problem in F : Type soundness a well typed program that does not diverge reduces to an answer of the same type. Other related work This paper extends a previous workshop contribution [35]. Nominal type systems have also been formalized in the Java context, examples are [21,27,32] A di#erence between these approaches and ours is that they rely on a global class graph that describes membership and inheritance. Another di#erence is that these systems are almost completely nominal, ....

M. Odersky, V. Cremet, C. Rockl, and M. Zenger. A nominal theory of objects with dependent types. In Proc. FOOL 10, Jan. 2003. http://www.cis.upenn.edu/~bcpierce/FOOL/FOOL10.html.

....of judgments on types, specifically the well formedness judgment # T wf, the membership judgment D, the expansion judgment # T # , and the subtyping judgment T # . Deduction rules for these judgments are motivated in Section 4 and given in full in an accompanying technical report [34]. As usual, we assume that terms can be alpha renamed in type assignments in order to prevent failed type derivations due to duplicate variables in environments. That is, if # t # then also # t # : T . The type assignment judgment is extended to a judgment relating definitions and ....

....to names and labels which are defined and if it does not contain any illegal cyclic dependencies. These requirements are formalized in the four rules given below. The remaining rules propagate these requirements over all forms of types; they are given in full in the accompanying technical report [34]. Single wf) p : R p.type wf (L = U) U wf U) U R (L : U) U : R Rule (Single wf) states that p.type is well formed if p is a path referring to some object. The next three rules cover well formedness of a type selection T.L. They distinguish between ....

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M. Odersky, V. Cremet, C. Rockl, and M. Zenger. A nominal theory of objects with dependent types. Technical report IC/2002/70, EPFL, Switzerland, September 2002. http://lamp.epfl.ch/papers/technto.pdf.

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Martin Odersky, Vincent Cremet, Christine Rockl, and Matthias Zenger. A Nominal Theory of Objects with Dependent Types. In Proc. ECOOP'03, Springer LNCS, 2003.

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Martin Odersky, Vincent Cremet, Christine R ockl, and Matthias Zenger. A nominal theory of objects with dependent types. In Proceedings of 17th European Conference on Object-Oriented Programming (ECOOP 2003.

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Martin Odersky, Vincent Cremet, Christine Rockl, and Matthias Zenger. A nominal theory of objects with dependent types. In Informal proceedings of FOOL 10, 2003.

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M. Odersky, V. Cremet, C. R ockl, and M. Zenger. A nominal theory of objects with dependent types. In Proc. ECOOP'03, Springer LNCS, 2003.

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M. Odersky, V. Cremet, C. Rockl, M. Zenger. A nominal theory of objects with dependent types. Fool'03.

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