Ockham on Intuitive Cognition

NOTES AND DISCUSSIONS 95 OCKHAM ON INTUITIVE COGNITION t In the first part of what follows, I try to locate Ockham's theory of intuitive cognition in the context of one set of philosophical problems rather than another. The device I use is to emphasize the major error Ockham wants to avoid: "platonism" rather than scepticism. In the second part, I try to show how difficulties raised by some recent commentary result from the wrong orientation. This very limited project involves neither exposition nor assessment of Ockham's proposed solutions for the philosophical problems. But hopefully it will prove useful or at least suggestive for others working in this or related areas in Ockham. According to Ockham, 2 someone can be said to hold to or cognize a proposition evidently when he knows it to be true. The paradigm of knowing something to be true is seeing that it follows from the premisses in a demonstrative syllogism. However, first principles, or any proposition per se nota, can also be known to be true or cognized evidently. And, what is most important for our purposes, contingent propositions can be cognized evidently when, as one might say, they are known in experience. When someone is looking at a white wall, to ~se one of Ockham's examples, he can cognize evidently the proposition "The wall is white." 3 i Aside from a few quotations, I have given only the location of references in Ockham. Only very extensive quotations would make the article self-sufficient or, for that matter, even be helpful to the reader. My effort is both tentative and parasitic on earlier commentary and can, perhaps, be excused from providing logistic support that would far exceed its own weight. Moreover, I have tried to direct the reader to the most convenient materials, using fairly common or obvious abbreviations for Ockham's writings and the symbols given in the brackets for each of these sources. [Baudry] L Baudry, Lexique philosophique de Guillaume d'Ockham (Paris, 1958). [McKeon] R. McKeon, Selections /tom Medieval Philosophers, Vol. II (New York, 1929). This almost literal translation of selected Quodlibeta is sufficient for my present purposes. The Strasbourg edition of 1491, of course, is not more readily available m the reimpression from Louvain, Editions de la Biblioth~que Sd., 1962. [OPW] P. Boehner, Ockham: Philosophical Writings (New York, 1957). The page numbers given are from the Nelson edition, containing both Latin and English. The Library of Liberal Arts (Bobbs-Merrill) edition which consists only of the English text runs from one to sixteen pages ahead as a result of numbering the blank pages at the beginning of each section. [Ordinatio] Opera Philosophica et Theologica (St. Bonaventure, N.Y., 1967). Vol. I: Scripture in Librum Primum Sententiarum Ordinatio, Prologus et Distinctio Prima, edited by G. Gal and S. Brown. The lines referred to are given as superscripts to the page numbers. a Expos. Physicorum, Prologue ([OPW] pp. 4-5). See also [Baudry] under scire and evidens. a The issue of translation raises a host of problems of varying degrees of philosophical importance. I am not settled in my own mind about the best English equivalents for many important terms, and in my translations and commentary I have not tried for consistency. In principle, I prefer odd or quaint terms, since they bear their faults on their 96 HISTORY OF PHILOSOPHY At one point, Ockham gives this description: Whoever knows some proposition evidently cannot dissent from that proposition by the power of the will alone, but it is necessary that he be persuaded by an argument more strongly moving his intellect to dissent, or it is necessary that he have forgotten something evidently known.4 Let me call your attention to the un-Cartesian way in which Ockham removes the judgement of some contingent (and all necessary) propositions from the (total) dominion of the will. I may remain silent or talk of something else, or I may avail myself of questions and conditionals, but if I intend to deal head-on with equals added to equals or (while looking at the white wall) with walls and whiteness, I cannot but assert that equals added to equals are equal or...