Theory Learning and Logical Rule Induction with Neural Theorem Proving Andres Campero 1 Aldo Pareja 2 Tim Klinger 2 Josh Tenenbaum 1 Sebastian Riedel 3 1. Introduction A hallmark of human cognition is the ability to con

First Page		Document Content
Date: 2018-08-06 06:17:49 Logic Reasoning Inductive reasoning Predicate logic Mathematical logic Predicate Propositional calculus Inference Universal quantification Axiom		Theory Learning and Logical Rule Induction with Neural Theorem Proving Andres Campero 1 Aldo Pareja 2 Tim Klinger 2 Josh Tenenbaum 1 Sebastian Riedel 3 1. Introduction A hallmark of human cognition is the ability to con Add to Reading List Source URL: uclmr.github.io Download Document from Source Website File Size: 209,34 KB Share Document on Facebook

	MSC axioms MSC problems MSC001-1.p A Blind Hand Problem at(a, there, b) ⇒ ¬ at(a, here, b) cnf(clause1 , axiom) cnf(clause2 , axiom) DocID: 1vjZG - View Document
	PLA axioms PLA001-0.ax Blocks world axioms (holds(x, state) and holds(y, state)) ⇒ holds(and(x, y), state) cnf(and definition, axiom) (holds(empty, state) and holds(clear(x), state) and differ(x, table)) ⇒ holds(hol DocID: 1vjaE - View Document
	COM axioms COM001+1.ax Common axioms for progress/preservation proof ∀ve: valphaEquivalent(ve, ve) fof(’alpha-equiv-refl’, axiom) ∀ve2 , ve1 : (valphaEquivalent(ve1 , ve2 ) ⇒ valphaEquivalent(ve2 , ve1 )) DocID: 1vaFb - View Document
	PUZ axioms PUZ001-0.ax Mars and Venus axioms from mars(x) or from venus(x) cnf(from mars or venus, axiom) cnf(not from mars and venus, axiom) from mars(x) ⇒ ¬ from venus(x) DocID: 1v5ap - View Document
	MED axioms MED001+0.ax Physiology Diabetes Mellitus type 2 Physiological mechanisms of diabetes mellitus type 2 ∀x: ¬ gt(x, x) fof(irreflexivity gt, axiom) DocID: 1v2ha - View Document