We consider two families of Pascal-like triangles that have all ones on the left side and ones separated by $m-1$ zeros on the right side. The $m=1$ cases are Pascal's triangle and the two families also coincide when $m=2$. Members of the first family obey Pascal's recurrence everywhere inside the triangle. We show that the $m$-th triangle can also be obtained by reversing the elements up to and including the main diagonal in each row of the $(1/(1-x^m),x/(1-x))$ Riordan array. Properties of this family of triangles can be obtained quickly as a result. The $(n,k)$-th entry in the $m$-th member of the second family of triangles is the number of tilings of an $(n+k)\times1$ board that use $k$ $(1,m-1)$-fences and $n-k$ unit squares. A $(1,g)$...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
We pursue the investigation of generalizations of the Pascal triangle based on binomial coefficients...
Pascal’s triangle is one of the most famous and interesting patterns in mathematics. In fact, while ...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
This paper is about counting the number of distinct (scattered) subwords occurring in a given word. ...
We introduce an integer sequence based construction of invertible centrally symmetric number triangl...
One of the most interesting properties of Pascal's triangle is that the sequence of the sums of the ...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We introduce a family of number triangles defined by exponential Riordan arrays, which generalize Pa...
The study presents some of the patterns observed in Pascal\u27s triangle in relation to combinatoric...
. In this paper we shall first introduce the Pascal-like triangle, using a generalization of the re...
This paper gives a relationship between geometry and Pascal\u27s Triangle. It present three geometri...
The Pascal triangle is well known. Starting with a single 1 at the top, successive rows are obtaine...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
We pursue the investigation of generalizations of the Pascal triangle based on binomial coefficients...
Pascal’s triangle is one of the most famous and interesting patterns in mathematics. In fact, while ...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
This paper is about counting the number of distinct (scattered) subwords occurring in a given word. ...
We introduce an integer sequence based construction of invertible centrally symmetric number triangl...
One of the most interesting properties of Pascal's triangle is that the sequence of the sums of the ...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We introduce a family of number triangles defined by exponential Riordan arrays, which generalize Pa...
The study presents some of the patterns observed in Pascal\u27s triangle in relation to combinatoric...
. In this paper we shall first introduce the Pascal-like triangle, using a generalization of the re...
This paper gives a relationship between geometry and Pascal\u27s Triangle. It present three geometri...
The Pascal triangle is well known. Starting with a single 1 at the top, successive rows are obtaine...
We introduce a generalization of Pascal triangle based on binomial coefficients of finite words. The...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
We pursue the investigation of generalizations of the Pascal triangle based on binomial coefficients...
Pascal’s triangle is one of the most famous and interesting patterns in mathematics. In fact, while ...