Add to ORKGThe theorem written here was proved by using the limit function of the simple functions in "The introduction to the Lebesgue integral" written by Seizo Ito and published by Shokabo. I proved this theorem on the fact that the set of the rational numbers is countable and dense
Department of Mathematical SciencesThe universality asserts that some families of L-functions are de...
AbstractWe will prove that if A, B are subsets of the real line R with positive outer Lebesgue measu...
AbstractThe paper gives a condition for the expressible set of a sequence to have Lebesgue measure z...
While the rational numbers Q are dense in the real numbers R, it seems like there are many, many mor...
A decade ago, a Frenchman mathematician Henri Lebesgue identifies that the Riemann Integral doesn’t ...
Abstract. Given a density d de\u85ned on the Borel subsets of [0;1); the limit at in\u85nity in dens...
A certain modified version of Kolmogorov’s strong law of large numbers is used for an extension of t...
We give bounds for the Lebesgue constant for Berrut's rational interpolant at very general node sets
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
AbstractIn this paper the sum-level sets for Lüroth expansion are introduced. We prove that the Lebe...
AbstractA certain modified version of Kolmogorov’s strong law of large numbers is used for an extens...
We dene the eective integrability of Finecomputable functions and eectivize some fundamental limit t...
1. Preliminaries For simplicity, we follow the rules: X is a non empty set, S is a σ-field of subset...
Abstract. Given a density d de\u85ned on the Borel subsets of [0;1); the limit in density of a funct...
1. Preliminaries For simplicity, we follow the rules: X is a non empty set, S is a σ-field of subset...
Department of Mathematical SciencesThe universality asserts that some families of L-functions are de...
AbstractWe will prove that if A, B are subsets of the real line R with positive outer Lebesgue measu...
AbstractThe paper gives a condition for the expressible set of a sequence to have Lebesgue measure z...
While the rational numbers Q are dense in the real numbers R, it seems like there are many, many mor...
A decade ago, a Frenchman mathematician Henri Lebesgue identifies that the Riemann Integral doesn’t ...
Abstract. Given a density d de\u85ned on the Borel subsets of [0;1); the limit at in\u85nity in dens...
A certain modified version of Kolmogorov’s strong law of large numbers is used for an extension of t...
We give bounds for the Lebesgue constant for Berrut's rational interpolant at very general node sets
It has recently been shown that the Lebesgue constant for Berrut’s rational interpolant at equidista...
AbstractIn this paper the sum-level sets for Lüroth expansion are introduced. We prove that the Lebe...
AbstractA certain modified version of Kolmogorov’s strong law of large numbers is used for an extens...
We dene the eective integrability of Finecomputable functions and eectivize some fundamental limit t...
1. Preliminaries For simplicity, we follow the rules: X is a non empty set, S is a σ-field of subset...
Abstract. Given a density d de\u85ned on the Borel subsets of [0;1); the limit in density of a funct...
1. Preliminaries For simplicity, we follow the rules: X is a non empty set, S is a σ-field of subset...
Department of Mathematical SciencesThe universality asserts that some families of L-functions are de...
AbstractWe will prove that if A, B are subsets of the real line R with positive outer Lebesgue measu...
AbstractThe paper gives a condition for the expressible set of a sequence to have Lebesgue measure z...