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Mathematical Physics II



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Autore: De Micheli Enrico Visualizza persona
Titolo: Mathematical Physics II Visualizza cluster
Pubblicazione: Basel, Switzerland, : MDPI - Multidisciplinary Digital Publishing Institute, 2020
Descrizione fisica: 1 electronic resource (182 p.)
Soggetto topico: Research & information: general
Mathematics & science
Soggetto non controllato: prolongation structure
mNLS equation
Riemann-Hilbert problem
initial-boundary value problem
free probability
primes
p-adic number fields
Banach *-probability spaces
weighted-semicircular elements
semicircular elements
truncated linear functionals
FCM fuel
thermal–mechanical performance
failure probability
silicon carbide
quantum discord
non-commutativity measure
dynamic models
Gibbs phenomenon
quasi-affine
shift-invariant system
dual tight framelets
oblique extension principle
B-splines
crack growth behavior
particle model
intersecting flaws
uniaxial compression
reinforced concrete
retaining wall
optimization
bearing capacity
particle swarm optimization
PSO
generalized Fourier transform
deformed wave equation
Huygens’ principle
representation of ??(2,ℝ)
holomorphic extension
spherical Laplace transform
non-Euclidean Fourier transform
Fourier–Legendre expansion
Persona (resp. second.): De MicheliEnrico
Sommario/riassunto: The charm of Mathematical Physics resides in the conceptual difficulty of understanding why the language of Mathematics is so appropriate to formulate the laws of Physics and to make precise predictions. Citing Eugene Wigner, this “unreasonable appropriateness of Mathematics in the Natural Sciences” emerged soon at the beginning of the scientific thought and was splendidly depicted by the words of Galileo: “The grand book, the Universe, is written in the language of Mathematics.” In this marriage, what Bertrand Russell called the supreme beauty, cold and austere, of Mathematics complements the supreme beauty, warm and engaging, of Physics. This book, which consists of nine articles, gives a flavor of these beauties and covers an ample range of mathematical subjects that play a relevant role in the study of physics and engineering. This range includes the study of free probability measures associated with p-adic number fields, non-commutative measures of quantum discord, non-linear Schrödinger equation analysis, spectral operators related to holomorphic extensions of series expansions, Gibbs phenomenon, deformed wave equation analysis, and optimization methods in the numerical study of material properties.
Titolo autorizzato: Mathematical Physics II  Visualizza cluster
Formato: Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione: Inglese
Record Nr.: 9910557307603321
Lo trovi qui: Univ. Federico II
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