The core of this monograph is the development of tools to derive well-posedness results in very general geometric settings for elliptic differential operators.
This book is not for everyone, but a must for researchers in the field of number theory, topology, computer science and physics, or anyone (loves mathematics and science) with college level knowledge, curious spirit and an open mind.
« J’ai dû arrêter net cette prière-là aussi : ce monde des anges, des prophètes, du Diable, du soleil, de la lle de Imran, cette Vierge qui présente son Fils dans ses bras ; et surtout de ce Dieu qui m’observe !
In one of the most stunning expositions of mathematical publishing, Oliver Byrne combines Euclid's geometric theories with vibrant colour proofs, turning what was already a cornerstone academic text into a pedagogical work of art.
Addresses the rapidly growing field of fractional calculus and provides simpli fied solutions for linear commensurate-order fractional differential equations The Fractional Trigonometry: With Applications to Fractional Differential Equations and Science is the result of the authors work in fractional calculus, and more particularly, in functions for the solutions of fractional di fferential equations, which is fostered in the behavior of generalized exponential functions.
Addresses the rapidly growing field of fractional calculus and provides simpli fied solutions for linear commensurate-order fractional differential equations The Fractional Trigonometry: With Applications to Fractional Differential Equations and Science is the result of the authors work in fractional calculus, and more particularly, in functions for the solutions of fractional di fferential equations, which is fostered in the behavior of generalized exponential functions.
