AbstractIn this paper we study divisibility properties of certain multinomial coefficients introduced by Myerson. In particular we show that a recent conjecture of Myerson and Sander has an equivalent formulation of independent interest. We also give an upper bound for the number of exceptions to their conjecture
This thesis gives some order estimates and asymptotic formulae associated with general classes of no...
AbstractIt is known that for sufficiently large n and m and any r the binomial coefficient (nm) whic...
AbstractIn this paper, we prove two results. The first theorem uses a paper of Kim (J. Number Theory...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
AbstractIn this paper we study divisibility properties of certain multinomial coefficients introduce...
The purpose of this thesis is to try to answer some of the questions in Dr. Bachman\u27s paper On D...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
AbstractWe prove that for any integer d multinomial coefficients satisfying some conditions are exac...
We give an overview of two important families of divisibility sequences: the Lehmer--Pierce family (...
We give an elementary approach to proving divisibility results for a class of binomial sums that are...
AbstractWe study M(n), the number of distinct values taken by multinomial coefficients with upper en...
AbstractThis paper studies divisibility properties of sequences defined inductively by a1 = 1, an+1 ...
AbstractFor every positive integer N, we determine the maximum sizes of collections C and C' of divi...
AbstractWe study congruence and divisibility properties of a class of combinatorial sums that involv...
AbstractIn this article we discuss how close different powers of integers can be to each other. In a...
This thesis gives some order estimates and asymptotic formulae associated with general classes of no...
AbstractIt is known that for sufficiently large n and m and any r the binomial coefficient (nm) whic...
AbstractIn this paper, we prove two results. The first theorem uses a paper of Kim (J. Number Theory...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
AbstractIn this paper we study divisibility properties of certain multinomial coefficients introduce...
The purpose of this thesis is to try to answer some of the questions in Dr. Bachman\u27s paper On D...
AbstractA recent conjecture of Myerson and Sander concerns divisibility properties of certain multin...
AbstractWe prove that for any integer d multinomial coefficients satisfying some conditions are exac...
We give an overview of two important families of divisibility sequences: the Lehmer--Pierce family (...
We give an elementary approach to proving divisibility results for a class of binomial sums that are...
AbstractWe study M(n), the number of distinct values taken by multinomial coefficients with upper en...
AbstractThis paper studies divisibility properties of sequences defined inductively by a1 = 1, an+1 ...
AbstractFor every positive integer N, we determine the maximum sizes of collections C and C' of divi...
AbstractWe study congruence and divisibility properties of a class of combinatorial sums that involv...
AbstractIn this article we discuss how close different powers of integers can be to each other. In a...
This thesis gives some order estimates and asymptotic formulae associated with general classes of no...
AbstractIt is known that for sufficiently large n and m and any r the binomial coefficient (nm) whic...
AbstractIn this paper, we prove two results. The first theorem uses a paper of Kim (J. Number Theory...
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