Now showing items 30-49 of 59

    • General Correctness: A Unification of Partial and Total Correctness 

      Jacobs, Dean; Gries, David (Cornell University, 1984-10)
      General correctness, which subsumes partial and total correctness, is defined for both weakest preconditions and strongest postconditions. Healthiness properties for general-correctness predicate transformers are more ...
    • Generating a Random Cyclic Permutation 

      Gries, David; Xue, Jinyun (Cornell University, 1986-09)
    • The Hopcroft-Tarjan Planarity Algorithm, Presentation and Improvements 

      Gries, David; Xue, Jinyun (Cornell University, 1988-04)
      We give a rigorous, yet, we hope, readable, presentation of the Hopcroft-Tarjan linear algorithm for testing the planarity of a graph, using more modern principles and techniques for developing and presenting algorithms ...
    • In-situ Inversion of a Cyclic Permutation 

      Feijen, W. H. J.; Van Gasteren, A. J. M.; Gries, David (Cornell University, 1985-09)
      An algorithm is developed for the in-situ inversion of a cyclic permutation represented in an array. The emphasis is on the quo modo rather than the quod; we are interested in finding concepts and notations for dealing ...
    • Inorder Traversal of a Binary Tree and its Inversion 

      Gries, David; Van de Snepscheut, Jan L.A. (Cornell University, 1987-11)
    • An Introduction to Proofs of Program Correctness for Teachers of College-Level Introductory Programming Courses 

      Gries, David; Wadkins, Jeff (Cornell University, 1990-03)
      No abstract is available.
    • Is Sometimes Ever Better Than Always? 

      Gries, David (Cornell University, 1978-06)
      The "intermittent assertion" method for proving programs correct is explained and compared to the conventional axiomatic method. Simple axiomatic proofs of iterative algorithms that compute recursively defined functions, ...
    • A Linear Sieve Algorithm for Finding Prime Numbers 

      Gries, David; Misra, Jayadev (Cornell University, 1977-06)
    • McLaren's Masterpiece 

      Gries, David; Prins, Jan F. (Cornell University, 1986-01)
      Abstract not available
    • A Model and Temporal proof system for Networks of Processes 

      Nguyen, Van Long; Demers, Alan J.; Gries, David; Owicki, Susan S. (Cornell University, 1985-06)
      An approach is presented for modeling networks of processes that communicate exclusively through message passing. A process (or a network) is defined by its set of possible behaviors, where each behavior is an abstraction ...
    • A Model and Temporal Proof System for Networks of Processes 

      Nguyen, Van Long; Gries, David; Owicki, Susan S. (Cornell University, 1984-11)
      A model and a sound and complete proof system for networks of processes in which component processes communicate exclusively through messages is given. The model, an extension of the trace model, can desribe both synchronous ...
    • A New Approach to Teaching Mathematics 

      Gries, David; Schneider, Fred B. (Cornell University, 1994-02)
      We propose a new approach to teaching discrete math: First, teach logic as a powerful and versatile tool for discovering and communicating truths; then use this tool in all other topics of the course. We spend 6 weeks ...
    • A Note on Iteration 

      Gries, David (Cornell University, 1977-09)
    • A Note on Program Development 

      Gries, David (Cornell University, 1974-03)
    • A Note on the Standard Strategy for Developing Loop Invariants and Loops 

      Gries, David (Cornell University, 1982-10)
      The by-now-standard strategy for developing a loop invariant and loop was developed in [1] and explained [2]. Nevertheless, its use still poses problems for some. The purpose of this note is to provide further explanation. ...
    • On Presenting Monotonicity and On EA=>AE 

      Gries, David (Cornell University, 1995-04)
      Two independent topics are treated. First, the problem of weakening/strengthening steps in calculational proofs is discussed and a form of substantiating such steps is proposed. Second, a simple proof of (Ex| R.x: (Ay| ...
    • Presenting an Algorithm to Find the Minimum Edit Distance 

      Gries, David; Burkhardt, Bill (Cornell University, 1988-03)
    • A Procedure Call Proof Rule (With a Simple Explanation) 

      Gries, David; Levin, Gary Marc (Cornell University, 1979-05)
    • Program Schemes with Pushdown Stores 

      Brown, Steven; Gries, David; Szymanski, Thomas G. (Cornell University, 1972-04)
      We attempt to characterize classes of schemes allowing pushdown stores, building on an earlier work by Constable and Gries [1]. We study the effect (on the computational power) of aloowing one, two, or more pushdown stores, ...
    • Programming by Induction 

      Gries, David (Cornell University, 1971-09)
      A technique for creating programs, called programming by induction, is described. The term is used because of the similarity between programming by induction and proving a theorem by induction.