We describe two uses of meta-level inference: to control the search for aproof, and to derive new control information, and illustrate them in the domain of algebraic equation solving. The derivation of control information is the main focus of the paper. It involves the proving of theorems in the Meta-Theory of Algebra. These proofs are guided by meta-meta-level inference. We are developing a meta-meta-language to describe formulae, and proof plans, and have built a program, IMPRESS, which uses these plans to build a proof. IMPRESS will form part of a self improving algebra system
The aim of algebraic logic is to compact series of small steps of general logical inference into lar...
International audienceIn a previous paper, we proposed a characterization of algebraic reasoning in ...
Meta-explaining is useful to a human or an artificial researcher in order to learn how to use its kn...
We describe two uses of meta-level inference: to control the search for a proof; and to derive new c...
In [Bundy and Sterling 81] we described how meta-level inference was useful for controlling search a...
To appear in Proceedings of the Capri-85 Conference on A.I., pub. by North HollandAvailable from Bri...
In this thesis we will be concerned with a particular type of architecture for reasoning systems, k...
Abstract. Formal verification is increasingly used in industry. A pop-ular technique is interactive ...
this paper: 1. To clarify the concept of meta-level reasoning (MLR). This concept has been discussed...
A compiler-based meta-level system for MetaProlog language is presented. Since MetaProlog is a meta-...
Meta-interpretive learning (MIL) is a form of inductive logic programming. MIL uses second-order Hor...
In the first section, five major attempts to solve the problem of induction and their failures are d...
A theory system is a collection of interdependent theories, some if which stand in a meta/object rel...
Algebraic logic compacts many small steps of general logical derivation into large steps of equation...
Algebraic logic compacts many small steps of general logical derivation into large steps of equation...
The aim of algebraic logic is to compact series of small steps of general logical inference into lar...
International audienceIn a previous paper, we proposed a characterization of algebraic reasoning in ...
Meta-explaining is useful to a human or an artificial researcher in order to learn how to use its kn...
We describe two uses of meta-level inference: to control the search for a proof; and to derive new c...
In [Bundy and Sterling 81] we described how meta-level inference was useful for controlling search a...
To appear in Proceedings of the Capri-85 Conference on A.I., pub. by North HollandAvailable from Bri...
In this thesis we will be concerned with a particular type of architecture for reasoning systems, k...
Abstract. Formal verification is increasingly used in industry. A pop-ular technique is interactive ...
this paper: 1. To clarify the concept of meta-level reasoning (MLR). This concept has been discussed...
A compiler-based meta-level system for MetaProlog language is presented. Since MetaProlog is a meta-...
Meta-interpretive learning (MIL) is a form of inductive logic programming. MIL uses second-order Hor...
In the first section, five major attempts to solve the problem of induction and their failures are d...
A theory system is a collection of interdependent theories, some if which stand in a meta/object rel...
Algebraic logic compacts many small steps of general logical derivation into large steps of equation...
Algebraic logic compacts many small steps of general logical derivation into large steps of equation...
The aim of algebraic logic is to compact series of small steps of general logical inference into lar...
International audienceIn a previous paper, we proposed a characterization of algebraic reasoning in ...
Meta-explaining is useful to a human or an artificial researcher in order to learn how to use its kn...