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Marcel Riesz (en húngaro: Riesz Marcell [ˈriːs ˈmɒrt͡sɛll]; 16 de noviembre de 1886 - 4 de septiembre de 1969) fue un matemático húngaro. Graduado por la Universidad Eötvös Loránd, es conocido por su trabajo en series divergentes, teoría del potencial y otras aplicaciones del análisis, así como en la teoría de ...
- Húngara y sueca
- Cementerio del Norte, Lund
Marcel Riesz (Hungarian: Riesz Marcell [ˈriːs ˈmɒrt͡sɛll]; 16 November 1886 – 4 September 1969) was a Hungarian mathematician, known for work on summation methods, potential theory, and other parts of analysis, as well as number theory, partial differential equations, and Clifford algebras.
Quick Info. Born. 16 November 1886. Györ, Hungary. Died. 4 September 1969. Lund, Sweden. Summary. Marcel Riesz was a Hungarian-born mathematician who worked on summation methods, potential theory and other parts of analysis, as well as number theory and partial differential equations. View two larger pictures. Biography.
Marcel Riesz fue un matemático húngaro. Graduado por la Universidad Eötvös Loránd, es conocido por su trabajo en series divergentes, teoría del potencial y otras aplicaciones del análisis, así como en la teoría de números, ecuaciones diferenciales en derivadas parciales y álgebras de Clifford.
This article reviews Marcel Riesz’s lecture notes on Clifford Numbers and Spinors, 1958, and evaluates its effect on present research on Clifford algebras. The article begins with a critical survey of the history of Clifford algebras. Inaccuracies in citations are pointed out and mistaken priorities are rectified.
This article reviews Marcel Riesz's lecture notes on Clifford Number, and Spinor" 1958, and evaluates its effect on present research on Clifford algebras. The article begins with a critical survey of the history of Clifford algebras.
MOMENT INDETERMINATENESS: THE MARCEL RIESZ VARIATIONAL PRINCIPLE. DAVID P. KIMSEY AND MIHAI PUTINAR. Abstract. The discrete data encoded in the power moments of a pos-itive measure, fast decaying at infinity on euclidean space, is incom-plete for recovery, leading to the concept of moment indeterminateness.
