Double sequences appear in a natural way in cases of iteratively given sequences if the iteration allows to determine besides the successors from the predecessors also the predecessors from their followers. A particular pair of double sequences is considered which appears in a parqueting-reflection process of the complex plane. While one end of each sequence is a natural number sequence, the other consists of rational numbers. The natural numbers sequences are not yet listed in OEIS Wiki. Complex versions from the double sequences are provided
AbstractWe prove that certain classes of sequences of positive real numbers satisfy some selection p...
In this paper I make the following conjecture: for any arithmetic progression a + b*k, where at leas...
summary:In this paper, we study the properties of the sequence of polynomials given by $g_0=0,~g_1=1...
Double sequences are important extension of the ordinary notion of a sequence. In this article we fo...
We deal with formal inverse (in terms of formal series) of the period-doubling sequence. The sequenc...
This research considers two traditional important questions, which are interesting, at least to most...
AbstractBy means of series rearrangement, we prove an algebraic identity on the symmetric difference...
AbstractIn this article we introduce the convergence of extended realvalued double sequences [16], [...
We consider a family of integer sequences generated by nonlinear recurrences of the second order, wh...
In this paper the author constructs several properties for double series and its convergence. The no...
This paper is a continuation of the research on selection properties of certain classes of double se...
AbstractBy means of the modified Abel lemma on summation by parts, a recurrence relation for Dougall...
AbstractBeatty sequences ⌊nα+γ⌋ are nearly linear, also called balanced, namely, the absolute value ...
AbstractLet {μk}−∞+∞ be a given double infinite sequence of complex numbers. By defining a linear fu...
AbstractWe examine a pair of Rogers–Ramanujan type identities of Lebesgue, and give polynomial ident...
AbstractWe prove that certain classes of sequences of positive real numbers satisfy some selection p...
In this paper I make the following conjecture: for any arithmetic progression a + b*k, where at leas...
summary:In this paper, we study the properties of the sequence of polynomials given by $g_0=0,~g_1=1...
Double sequences are important extension of the ordinary notion of a sequence. In this article we fo...
We deal with formal inverse (in terms of formal series) of the period-doubling sequence. The sequenc...
This research considers two traditional important questions, which are interesting, at least to most...
AbstractBy means of series rearrangement, we prove an algebraic identity on the symmetric difference...
AbstractIn this article we introduce the convergence of extended realvalued double sequences [16], [...
We consider a family of integer sequences generated by nonlinear recurrences of the second order, wh...
In this paper the author constructs several properties for double series and its convergence. The no...
This paper is a continuation of the research on selection properties of certain classes of double se...
AbstractBy means of the modified Abel lemma on summation by parts, a recurrence relation for Dougall...
AbstractBeatty sequences ⌊nα+γ⌋ are nearly linear, also called balanced, namely, the absolute value ...
AbstractLet {μk}−∞+∞ be a given double infinite sequence of complex numbers. By defining a linear fu...
AbstractWe examine a pair of Rogers–Ramanujan type identities of Lebesgue, and give polynomial ident...
AbstractWe prove that certain classes of sequences of positive real numbers satisfy some selection p...
In this paper I make the following conjecture: for any arithmetic progression a + b*k, where at leas...
summary:In this paper, we study the properties of the sequence of polynomials given by $g_0=0,~g_1=1...