AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci series. Connections to classical and quantum mechanical statistics are outlined
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
AbstractA simple renormalization group method is used to drive the Hausdorff dimension for a critica...
I investigate two discrete models of random geometries, namely simplicial quantum gravity and quantu...
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci se...
WOS: 000271434200005In this study, a physical quantity belonging to a physical system in its stages ...
WOS: 000253756700002In this study, physical quantities of a nonequilibrium system in the stages of i...
We develop the basis of the two dimensional generalized quantum statistical systems by using results...
The Fibonacci sequence is a famously well-known integer sequence from the thirteenth century which h...
We show that under natural technical conditions, the sum of a $C^2$ dynamically defined Cantor set w...
We investigate some relations between number theory and spectral measures related to the harmonic an...
10 pages, 2 figuresInternational audienceEmploying five commuting sets of five-qubit observables, we...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
We explain how questions on sums of two Cantor sets, products of two Cantor sets, ratios of two Cant...
Abstract. The Cantor distribution is a probability distribution whose cumu-lative distribution funct...
A straightforward explanation of the Young's two-slit experiment of a quantum particle is obtained w...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
AbstractA simple renormalization group method is used to drive the Hausdorff dimension for a critica...
I investigate two discrete models of random geometries, namely simplicial quantum gravity and quantu...
AbstractFour and five dimensional Cantor sets are analysed in relation to two different Fibonacci se...
WOS: 000271434200005In this study, a physical quantity belonging to a physical system in its stages ...
WOS: 000253756700002In this study, physical quantities of a nonequilibrium system in the stages of i...
We develop the basis of the two dimensional generalized quantum statistical systems by using results...
The Fibonacci sequence is a famously well-known integer sequence from the thirteenth century which h...
We show that under natural technical conditions, the sum of a $C^2$ dynamically defined Cantor set w...
We investigate some relations between number theory and spectral measures related to the harmonic an...
10 pages, 2 figuresInternational audienceEmploying five commuting sets of five-qubit observables, we...
The Fibonacci Numbers are one of the most intriguing sequences in mathematics. I present generalizat...
We explain how questions on sums of two Cantor sets, products of two Cantor sets, ratios of two Cant...
Abstract. The Cantor distribution is a probability distribution whose cumu-lative distribution funct...
A straightforward explanation of the Young's two-slit experiment of a quantum particle is obtained w...
Let 1, 2, 3, 5, 8, … denote the Fibonacci sequence beginning with 1 and 2, and then setting each sub...
AbstractA simple renormalization group method is used to drive the Hausdorff dimension for a critica...
I investigate two discrete models of random geometries, namely simplicial quantum gravity and quantu...
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