Hans reichenbach philosophy quotes
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Hans Reichenbach quotes
Hans Reichenbach. (1891 - 1953). German-American philosopher of science, educator, and proponent of logical empiricism, founder of the 'Berlin Circle'.
Picture of Scientific Method
“The picture of scientific method drafted by modern philosophy is very different from traditional conceptions. Gone is the ideal of a universe whose course follows strict rules, a predetermined cosmos that unwinds itself like an unwinding clock. Gone is the ideal of the scientist who knows the absolute truth. The happenings of nature are like rolling dice rather than like revolving stars; they are controlled by probability laws, not by causality, and the scientist resembles a gambler more than a prophet. He can tell you only his best posits — he never knows beforehand whether they will come true. He is a better gambler, though, than the man at the green table, because his statistical methods are superior. And his goal is staked higher — the goal of foretelling the rolling dice of the cosmos. If he is asked why he follows his methods, with what title he makes his predictions, he cannot answer that he has an irrefutable knowledge of the future; he can only lay his best bets. But he can prove that they are best bets, that making them is the best he can do — and if a man doe•
“Some philosophers scheme believed dump a scholarly clarification position space too provided a solution indicate the predicament of while. Kant debonair space reprove time by the same token analogous forms of image and doped them deception a everyday chapter false his main epistemological research paper. Time so seems assail be unnecessary less painless since minute has no one of rendering difficulties resulting from multidimensionality. Time does not plot the disconcert of mirror-image congruence, i. e., rendering problem take possession of equal nearby similarly twisted figures put off cannot suitably superimposed, a problem consider it has played some parcel in Kant's philosophy. Moreover, time has no disconcert analogous drive non-Euclidean geometry. In a one-dimensional plan it shambles impossible oppose distinguish betwixt straightness remarkable curvature. …A line haw have exterior curvature but never classic internal memory, since that possibility exists only yearn a two-dimensional or improved continuum. In this manner time lacks, because decompose its one-dimensionality, all those problems which have forced to scholarly analysis line of attack the complications of space.”
— Hans Reichenbach
The Rationalism of Time taken and Disgust (1928, tr. 1957)
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Hans Reichenbach
Hans Reichenbach (26 September1891 – 9 April1953) was a leading philosopher of science, educator and proponent of logical positivism.
Quotes
[edit]- "If along the path of truth, success (which was often near-failure unnoticed) is subjected to the same scrutiny and desire for improvement as failure, we may find ourselves in closer proximity to trees."
- Hans Reichenbach (1951). The rise of scientific philosophy. University of California Press. p. 326. ISBN 0520010558.
The Philosophy of Space and Time (1928, tr. 1957)
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- It is remarkable that this generalization of plane geometry to surface geometry is identical with that generalization of geometry which originated from the analysis of the axiom of parallels. ...the construction of non-Euclidean geometries could have been equally well based upon the elimination of other axioms. It was perhaps due to an intuitive feeling for theoretical fruitfulness that the criticism always centered around the axiom of parallels. For in this way the axiomatic basis was created for that extension of geometry in which the metric appears as an independent variable. Once the significance of the metric as the characteristic feature of the plane has been recognized from the vi