- Józef Maria Hoene-Wroński
Józef Maria Hoëne-Wroński (
August 23 ,1778 –August 8 ,1853 ) was a Polish Messianist philosopher who worked in many fields of knowledge, not only as a philosopher but as mathematician, physicist, inventor, lawyer, economist.Life
Hoene-Wroński came from a Czech family settled in western Poland, where he was born at
Wolsztyn . In 1794 he served in Poland'sKościuszko Uprising as a second lieutenant of artillery, was taken prisoner, and remained until 1797 in the Russian Army. Resigning in the rank of lieutenant colonel, he studied briefly in Germany and in 1800 enlisted in thePolish Legion atMarseille . There he began his scientific and scholarly work and conceived the idea of a great philosophical system. Ten years later he moved toParis and lived there until his death, working indefatigably to the last in the most difficult material circumstances.He wrote exclusively in French, desirous that his ideas, of whose immortality he was convinced, should be accessible to all; he worked, he said, "through France for Poland." He published over a hundred works, and left many more in manuscript. When dying in the seventy-fifth year of his life, he exclaimed: "God Almighty, there's still so much more I wanted to say!"
In science, Hoene-Wroński set himself maximal tasks: the complete reform of philosophy and of mathematics, astronomy, technology. He not only elaborated a system of philosophy, but applications to politics, history, economics, law, psychology, music, pedagogy. It was his aspiration to reform human knowledge in an "absolute, that is, ultimate" manner.
In 1803 Wroński joined the
observatory inMarseille , and began developing an enormously complex theory of the structure and origin of theuniverse . During this period, he took up a correspondence with nearly all the major scientists and mathematicians of his day, and was well-respected at the observatory. In 1810 he published the results of his research in a massive tome, which he advocated as a new foundation for all of science and mathematics. His theories were stronglyPythagorean , holding numbers and their properties to be the fundamental underpinning of essentially everything in the universe. His claims met with little acceptance, and his research and theories were generally dismissed as grandiose rubbish. His earlier correspondence with major figures led to his writings gaining more attention than a typical theory, even earning a review from the great mathematicianJoseph Louis Lagrange (which turned out to be exceedingly unfavorable). In the ensuing controversy, he was forced to leave the observatory.He immediately turned his focus towards applying philosophy to mathematics (his critics charged that this meant dispensing with mathematical rigor in favor of generalities). In 1812 he published a paper purporting to show that every
equation has analgebra ic solution, directly contradicting results that had just been published byPaolo Ruffini ; however, Ruffini turned out to be correct.Thereafter he turned his attention to disparate and largely unsuccessful pursuits. He developed a fantastical design for
caterpillar -like vehicles which he intended to replacerailroad transportation, but did not manage to persuade anyone to give the design serious attention. In 1819 he went toEngland to try to gain a grant from theBoard of Longitude to build a device to determinelongitude at sea. After initial difficulties, he was given an opportunity to address the Board, but his grandiose address, "On the Longitude", contained much philosophizing and generalities, but no specific plans for a working device, and thus failed to gain him support from the Board. He remained for several years in England, in 1821 publishing inLondon an introductory text on mathematics, which moderately improved his financial situation.In 1822 he returned to France, and again took up a combination of mathematics and fantastical pursuits, largely in poverty and scorned by intellectual society. Along with his continuing Pythagorean obsession, he spent much time working on several notoriously futile endeavors, including attempts to build a
perpetual motion machine , to square the circle, and to build a machine to predict the future (which he dubbed the "prognometre"). In 1852, shortly before his death, he did find a willing audience for his ideas: theoccultist Eliphas Levi met Wroński and was greatly impressed and influenced by his work and dedication.Wroński died in 1853 in
Neuilly-sur-Seine , France, on the outskirts of Paris.Legacy
Though during his lifetime nearly all his work was dismissed as nonsense, some of it has come in later years to be seen in a more favorable light. Although nearly all his grandiose claims were in fact unfounded, his mathematical work contains flashes of deep insight and many important intermediary results. Most significant was his work on series. He had strongly criticized Lagrange's use of infinite series, introducing instead a novel series expansion for a function. His criticisms of Lagrange were for the most part unfounded, but the coefficients in Wroński's new series were after his death found to be important, forming the
determinant s now known as theWronskian s (the name was given them by Thomas Muir in 1882).The level of Wroński's scientific and scholarly accomplishments, and the amplitude of his objectives, placed Wroński in the first rank of European
metaphysician s in the early 19th century. But the abstractness, formalism and obscurity of his thought, the difficulty of his language, his boundless self-assurance, his uncompromising judgments of others—alienated. He was perhaps the most original of the Polish metaphysicians, but others were more representative of the Polish outlook.ee also
* History of philosophy in Poland
References
*
Władysław Tatarkiewicz , "Historia filozofii" (History of Philosophy}, 3 vols., Warsaw, Państwowe Wydawnictwo Naukowe, 1978.External links
*MacTutor Biography|id=Wronski
* Piotr Pragacz, [http://www.impan.gov.pl/~pragacz/download/hwa.pdf Notes on the life and work of Jozef Maria Hoene-Wronski] , preprint (March 2007)
Wikimedia Foundation. 2010.