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Full-Text Articles in Physical Sciences and Mathematics
A Combinatorial Approach To Hyperharmonic Numbers, Arthur T. Benjamin, David Gaebler '04, Robert Gaebler '04
A Combinatorial Approach To Hyperharmonic Numbers, Arthur T. Benjamin, David Gaebler '04, Robert Gaebler '04
All HMC Faculty Publications and Research
Hyperharmonic numbers arise by taking repeated partial sums of harmonic numbers. These numbers can be expressed in terms of r-Stirling numbers, leading to combinatorial interpretations of many interesting identities.
A Probabilistic View Of Certain Weighted Fibonacci Sums, Arthur T. Benjamin, Judson D. Neer, Daniel T. Otero, James A. Sellers
A Probabilistic View Of Certain Weighted Fibonacci Sums, Arthur T. Benjamin, Judson D. Neer, Daniel T. Otero, James A. Sellers
All HMC Faculty Publications and Research
In this article, we pursue the reverse strategy of using probability to derive an and develop an exponential generating function for an in Section 3. In Section 4, we present a method for finding an exact, non-recursive, formula for an.
Sandwich Theorem And Calculation Of The Theta Function For Several Graphs, Marcia Ling Riddle
Sandwich Theorem And Calculation Of The Theta Function For Several Graphs, Marcia Ling Riddle
Theses and Dissertations
This paper includes some basic ideas about the computation of a function theta(G), the theta number of a graph G, which is known as the Lovasz number of G. theta(G^c) lies between two hard-to-compute graph numbers omega(G), the size of the largest lique in a graph G, and chi(G), the minimum number of colors need to properly color the vertices of G. Lovasz and Grotschel called this the "Sandwich Theorem". Donald E. Knuth gives four additional definitions of theta, theta_1, theta_2, theta_3, theta_4 and proves that they are all equal.
First I am going to describe the proof of the …
Bounding The Number Of Graphs Containing Very Long Induced Paths, Steven Kay Butler
Bounding The Number Of Graphs Containing Very Long Induced Paths, Steven Kay Butler
Theses and Dissertations
Induced graphs are used to describe the structure of a graph, one such type of induced graph that has been studied are long paths.
In this thesis we show a way to represent such graphs in terms of an array with two colors and a labeled graph. Using this representation and the techniques of Polya counting we will then be able to get upper and lower bounds for graphs containing a long path as an induced subgraph.
In particular, if we let P(n,k) be the number of graphs on n+k vertices which contains P_n, a path on n vertices, as …