AbstractAs part of a project on automatic generation of proofs involving both logic and computation, we have automatically generated a proof of the irrationality of e. The proof involves inequalities, bounds on infinite series, type distinctions (between real numbers and natural numbers), a subproof by mathematical induction, and significant mathematical steps, including correct simplification of expressions involving factorials and summing an infinite geometrical series. Metavariables are instantiated by inference rules embodying mathematical knowledge, rather than only by unification. The proof is generated completely automatically, without any interactive component
This paper deals with a sufficient condition for the infinite product of rational numbers to be an ...
This is a preprint of an article published in Manuscripta Mathmatica (2005), Volume 117, Number 2, 1...
We prove that if q is an integer greater than one and r is a non-zero rational (r≠−qm) then Σn=1∞ (1...
AbstractAs part of a project on automatic generation of proofs involving both logic and computation,...
The irrationality exponent a of a real number x is the supremum of the set of real numbers z for whi...
Abstract. Freek Wiedijk proposed the well-known theorem about the irrationality of 2 as a case study...
AbstractIn this paper we give irrationality results for numbers of the form ∑n=1∞ann! where the numb...
This paper is centered around proving the irrationality of some common known real numbers. For sever...
Contains fulltext : 233397.pdf (Author’s version preprint ) (Open Access
summary:This survey paper presents some old and new results in Diophantine approximations. Some of t...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
For positive integers $k$ and $n$ let $\sigma_k(n)$ denote the sum of the $k$th powers of the diviso...
International audienceThis paper is devoted to the rational approximation of automatic real numbers,...
This paper presents new upper bounds for irrationality measures of some fast converging series of ra...
This paper presents proofs of the irrationality of y , using elementary criteria of the maths....
This paper deals with a sufficient condition for the infinite product of rational numbers to be an ...
This is a preprint of an article published in Manuscripta Mathmatica (2005), Volume 117, Number 2, 1...
We prove that if q is an integer greater than one and r is a non-zero rational (r≠−qm) then Σn=1∞ (1...
AbstractAs part of a project on automatic generation of proofs involving both logic and computation,...
The irrationality exponent a of a real number x is the supremum of the set of real numbers z for whi...
Abstract. Freek Wiedijk proposed the well-known theorem about the irrationality of 2 as a case study...
AbstractIn this paper we give irrationality results for numbers of the form ∑n=1∞ann! where the numb...
This paper is centered around proving the irrationality of some common known real numbers. For sever...
Contains fulltext : 233397.pdf (Author’s version preprint ) (Open Access
summary:This survey paper presents some old and new results in Diophantine approximations. Some of t...
We give an overview of our formalizations in the proof assistant Isabelle/HOL of certain irrationali...
For positive integers $k$ and $n$ let $\sigma_k(n)$ denote the sum of the $k$th powers of the diviso...
International audienceThis paper is devoted to the rational approximation of automatic real numbers,...
This paper presents new upper bounds for irrationality measures of some fast converging series of ra...
This paper presents proofs of the irrationality of y , using elementary criteria of the maths....
This paper deals with a sufficient condition for the infinite product of rational numbers to be an ...
This is a preprint of an article published in Manuscripta Mathmatica (2005), Volume 117, Number 2, 1...
We prove that if q is an integer greater than one and r is a non-zero rational (r≠−qm) then Σn=1∞ (1...