DOIAbstract
AbstractThe Lucas theorem for binomial coefficients implies some interesting tensor product properties of certain matrices regarded for every prime p in the field Lp
AbstractThe Lucas theorem for binomial coefficients implies some interesting tensor product properties of certain matrices regarded for every prime p in the field Lp
AbstractWe study congruence and divisibility properties of a class of combinatorial sums that involv...
AbstractIn this study, some new properties of Lucas numbers with binomial coefficients have been obt...
In this paper, we shall study the Diophantine equation un = R(m)P(m)Q(m), where un is a Lucas sequen...
AbstractThe Lucas theorem for binomial coefficients implies some interesting tensor product properti...
Lucas' theorem on binomial coefficients states that (AB)≡(arbr)⋯(a1b1)(a0b0)(mod p) where p is a pri...
AbstractIn 1878 Lucas established a method of computing binomial coefficients modulo a prime. We est...
The main purpose of this paper is to use the mathematical induction and the properties of Lucas poly...
In this note we present several unusual problems involving divisibility of the binomial coefficients...
Lucas' theorem (u_m, u_n) = u_(m,n) (m,n>0) on the greatest common divisors of the sequence u_n defi...
AbstractWe prove that Apéry numbers satisfy an analog mod p, p2 and p3 of the congruence of Lucas fo...
This paper studies the relationship between the bidual of the (projective) tensor product of Banach ...
Abstract. This paper will look at the binomial coefficients di-visible by the prime number 2. The pa...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
AbstractWe study congruence and divisibility properties of a class of combinatorial sums that involv...
AbstractIn this study, some new properties of Lucas numbers with binomial coefficients have been obt...
In this paper, we shall study the Diophantine equation un = R(m)P(m)Q(m), where un is a Lucas sequen...
AbstractThe Lucas theorem for binomial coefficients implies some interesting tensor product properti...
Lucas' theorem on binomial coefficients states that (AB)≡(arbr)⋯(a1b1)(a0b0)(mod p) where p is a pri...
AbstractIn 1878 Lucas established a method of computing binomial coefficients modulo a prime. We est...
The main purpose of this paper is to use the mathematical induction and the properties of Lucas poly...
In this note we present several unusual problems involving divisibility of the binomial coefficients...
Lucas' theorem (u_m, u_n) = u_(m,n) (m,n>0) on the greatest common divisors of the sequence u_n defi...
AbstractWe prove that Apéry numbers satisfy an analog mod p, p2 and p3 of the congruence of Lucas fo...
This paper studies the relationship between the bidual of the (projective) tensor product of Banach ...
Abstract. This paper will look at the binomial coefficients di-visible by the prime number 2. The pa...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
summary:A Banach space $X$ has the reciprocal Dunford-Pettis property ($RDPP$) if every completely c...
AbstractWe study congruence and divisibility properties of a class of combinatorial sums that involv...
AbstractIn this study, some new properties of Lucas numbers with binomial coefficients have been obt...
In this paper, we shall study the Diophantine equation un = R(m)P(m)Q(m), where un is a Lucas sequen...
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