Frasi di Ruggero Giuseppe Boscovich

Ruggero Giuseppe Boscovich è stato un gesuita, astronomo, matematico, fisico, filosofo, diplomatico, poeta e accademico dalmata della Repubblica di Ragusa.

La sua appartenenza nazionale è fonte di discussione: di madrelingua croata, padre originario dell'Erzegovina e madre di ascendenze italiane, Boscovich fu una tipica figura settecentesca di intellettuale cosmopolita: studiò, visse e operò in prevalenza in Italia, ma trascorse 10 anni della sua esistenza in Francia, e soggiornò in varie capitali, tra cui Varsavia, Londra, Vienna e Costantinopoli. I suoi testi pubblicati sono scritti in latino, italiano e francese. Nella sua corrispondenza privata usò anche il croato. Wikipedia  

✵ 18. Maggio 1711 – 13. Febbraio 1787
Ruggero Giuseppe Boscovich photo
Ruggero Giuseppe Boscovich: 5   frasi 0   Mi piace

Ruggero Giuseppe Boscovich: Frasi in inglese

“Boscovich said these particles had no size; that is, they were geometrical points … a point is just a place; it has no dimensions. And here's Boscovich putting forth the proposition that matter is composed of particles that have no dimensions!”

Leon M. Lederman, p.103 The God Particle: If the Universe is the Answer, what is the Question? (1993) https://books.google.hr/books?id=-v84Bp-LNNIC
Contesto: The phrase "ahead of his time" is overused. I'm going to use it anyway. I'm not referring to Galileo or Newton. Both were definitely right on time, neither late or early. Gravity, experimentation, measurement, mathematical proofs … all these things were in the air. Galileo, Kepler, Brahe, and Newton were accepted - heralded! - in their own time, because they came up with ideas that scientific community was ready to accept. Not everyone is so fortunate. Roger Jospeh Boscovich … speculated that this classical law must break down altogether at the atomic scale, where the forces of attraction are replaced by an oscillation between attractive and repulsive forces. An amazing thought for a scientist in the eighteenth century. Boscovich also struggled with the old action-at-a-distance problem. Being a geometer more than anything else, he came up with the idea of "fields of force" to explain how forces exert control over objects at a distance. But wait, there's more! Boscovich had this other idea, one that was real crazy for the eighteenth century (or perhaps any century). Matter is composed of invisible, indivisible a-toms, he said. Nothing particularly new there. Leucippus, Democritus, Galileo, Newton, and other would have agreed with him. Here's the good part: Boscovich said these particles had no size; that is, they were geometrical points … a point is just a place; it has no dimensions. And here's Boscovich putting forth the proposition that matter is composed of particles that have no dimensions! We found a particle just a couple of decades ago that fits a description. It's called a quark.

“But if some mind very different from ours were to look upon some property of some curved line as we do on the evenness of a straight line, he would not recognize as such the evenness of a straight line; nor would he arrange the elements of his geometry according to that very different system, and would investigate quite other relationships as I have suggested in my notes.
We fashion our geometry on the properties of a straight line because that seems to us to be the simplest of all. But really all lines that are continuous and of a uniform nature are just as simple as one another. Another kind of mind which might form an equally clear mental perception of some property of any one of these curves, as we do of the congruence of a straight line, might believe these curves to be the simplest of all, and from that property of these curves build up the elements of a very different geometry, referring all other curves to that one, just as we compare them to a straight line. Indeed, these minds, if they noticed and formed an extremely clear perception of some property of, say, the parabola, would not seek, as our geometers do, to rectify the parabola, they would endeavor, if one may coin the expression, to parabolify the straight line.”

"Boscovich's mathematics", an article by J. F. Scott, in the book Roger Joseph Boscovich (1961) edited by Lancelot Law Whyte.
"Transient pressure analysis in composite reservoirs" (1982) by Raymond W. K. Tang and William E. Brigham.
"Non-Newtonian Calculus" (1972) by Michael Grossman and Robert Katz.

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